math¶

In [ ]:
open testing
open rust_operators
()


In [ ]:
inl types () =
    global "[<Fable.Core.Erase; Fable.Core.Emit(\"num_complex::Complex<$0>\")>] type num_complex_Complex<'T> = class end"
    global "[<Fable.Core.Erase; Fable.Core.Emit(\"pyo3::types::PyModule\")>] type pyo3_types_PyModule = class end"
    global "[<Fable.Core.Erase; Fable.Core.Emit(\"pyo3::Bound<$0>\")>] type pyo3_Bound<'T> = class end"
    global "[<Fable.Core.Erase; Fable.Core.Emit(\"pyo3::Python\")>] type pyo3_Python = class end"
    global "[<Fable.Core.Erase; Fable.Core.Emit(\"pyo3::PyAny\")>] type pyo3_PyAny = class end"
    global "[<Fable.Core.Erase; Fable.Core.Emit(\"pyo3::PyErr\")>] type pyo3_PyErr = class end"
()


In [ ]:
inl types () =
    rust.types ()
    sm'.types ()
    types ()
()


complex¶

In [ ]:
nominal complex t = $"num_complex_Complex<`t>"
nominal bound t = $"pyo3_Bound<`t>"
nominal python = $"pyo3_Python"
nominal pymodule = $"pyo3_types_PyModule"
nominal pyany = $"pyo3_PyAny"
nominal pyerr = $"pyo3_PyErr"

inl complex forall t. ((re : t), (im : t)) : complex t =
    inl re = join re
    inl re = join re
    inl im = join im
    !\($'"num_complex::Complex::new(!re, !im)"')
()


In [ ]:
// // test
// // rust=

types ()

complex (0f64, 0f64)
|> sm'.format'
|> sm'.from_std_string
|> _assert_eq "0+0i"
.rs output:

.fsx:
[<Fable.Core.Erase; Fable.Core.Emit("Func0<$0>")>] type Func0<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Func1<$0, $1>")>] type Func0<'T, 'U> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Box<$0>")>] type Box<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("dyn $0")>] type Dyn<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Fn() -> $0")>] type Fn<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Fn()")>] type FnUnit = class end
[<Fable.Core.Erase; Fable.Core.Emit("FnOnce() -> $0")>] type FnOnce<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Fn($0, $1)")>] type ActionFn2<'T, 'U> = class end
[<Fable.Core.Erase; Fable.Core.Emit("impl $0")>] type Impl<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("mut $0")>] type Mut<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("&$0")>] type Ref<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("&'static $0")>] type StaticRef<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("MutCell<$0>")>] type MutCell<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::any::Any")>] type std_any_Any = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::cell::RefCell<$0>")>] type std_cell_RefCell<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::pin::Pin<$0>")>] type std_pin_Pin<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::rc::Rc<$0>")>] type std_rc_Rc<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::rc::Weak<$0>")>] type std_rc_Weak<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::sync::Arc<$0>")>] type std_sync_Arc<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("str")>] type Str = class end
[<Fable.Core.Erase; Fable.Core.Emit("base64::DecodeError")>] type base64_DecodeError = class end
[<Fable.Core.Erase; Fable.Core.Emit("borsh::io::Error")>] type borsh_io_Error = class end
[<Fable.Core.Erase; Fable.Core.Emit("js_sys::JsString")>] type js_sys_JsString = class end
[<Fable.Core.Erase; Fable.Core.Emit("serde_json::Error")>] type serde_json_Error = class end
[<Fable.Core.Erase; Fable.Core.Emit("serde_json::Value")>] type serde_json_Value = class end
[<Fable.Core.Erase; Fable.Core.Emit("serde_wasm_bindgen::Error")>] type serde_wasm_bindgen_Error = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::str::Utf8Error")>] type std_str_Utf8Error = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::string::String")>] type std_string_String = class end
[<Fable.Core.Erase; Fable.Core.Emit("num_complex::Complex<$0>")>] type num_complex_Complex<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::types::PyModule")>] type pyo3_types_PyModule = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::Bound<$0>")>] type pyo3_Bound<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::Python")>] type pyo3_Python = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::PyAny")>] type pyo3_PyAny = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::PyErr")>] type pyo3_PyErr = class end
let rec method1 () : float =
    0.0
and method2 (v0 : float) : float =
    v0
and method3 () : float =
    0.0
and method4 (v0 : std_string_String) : std_string_String =
    v0
and method5 (v0 : bool) : bool =
    v0
and method0 () : unit =
    let v0 : float = method1()
    let v1 : float = method2(v0)
    let v2 : float = method3()
    let v3 : string = "num_complex::Complex::new(v1, v2)"
    let v4 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v3
    let v5 : string = @$"format!(""{{}}"", $0)"
    let v6 : std_string_String = Fable.Core.RustInterop.emitRustExpr v4 v5
    let v7 : std_string_String = method4(v6)
    let v8 : string = "fable_library_rust::String_::fromString(v7)"
    let v9 : string = Fable.Core.RustInterop.emitRustExpr () v8
    let v11 : bool = v9 = "0+0i"
    let v13 : bool =
        if v11 then
            true
        else
            method5(v11)
    let v14 : string = "0+0i"
    let v15 : string = $"__expect / actual: %A{v9} / expected: %A{v14}"
    let v16 : bool = v13 = false
    if v16 then
        failwith<unit> v15
method0()



.rs:
#![allow(dead_code,)]
#![allow(non_camel_case_types,)]
#![allow(non_snake_case,)]
#![allow(non_upper_case_globals,)]
#![allow(unreachable_code,)]
#![allow(unused_attributes,)]
#![allow(unused_imports,)]
#![allow(unused_macros,)]
#![allow(unused_parens,)]
#![allow(unused_variables,)]
mod module_ccfa04bf {
    pub mod Spiral_eval {
        use super::*;
        use fable_library_rust::Native_::on_startup;
        use fable_library_rust::String_::sprintf;
        use fable_library_rust::String_::string;
        pub fn method1() -> f64 { 0.0_f64 }
        pub fn method2(v0: f64) -> f64 { v0 }
        pub fn method3() -> f64 { 0.0_f64 }
        pub fn method4(v0: std::string::String) -> std::string::String { v0 }
        pub fn method5(v0: bool) -> bool { v0 }
        pub fn method0() {
            let v1: f64 = Spiral_eval::method2(Spiral_eval::method1());
            let v2: f64 = Spiral_eval::method3();
            let v4: num_complex::Complex<f64> =
                num_complex::Complex::new(v1, v2);
            let v7: std::string::String =
                Spiral_eval::method4(format!("{}", v4));
            let v9: string = fable_library_rust::String_::fromString(v7);
            let v11: bool = v9.clone() == string("0+0i");
            if (if v11 { true } else { Spiral_eval::method5(v11) }) == false {
                panic!("{}",
                       sprintf!("__expect / actual: {:?} / expected: {:?}", v9, string("0+0i")));
            }
        }
        on_startup!(Spiral_eval::method0());
    }
}
pub use module_ccfa04bf::*;


complex_sin¶

In [ ]:
inl re forall t. (c : complex t) : t =
    inl c = join c
    !\($'"!c.re"')

inl im forall t. (c : complex t) : t =
    inl c = join c
    !\($'"!c.im"')

inl complex_unbox forall t. (c : complex t) =
    re c, im c

inl (~.^) c = complex c

inl complex_eq forall t. (a : complex t) (b : complex t) : bool =
    !\($'"!a == !b"')

inl (.=) a b = complex_eq a b

instance equable complex t = complex_eq

inl complex_add forall t. (a : complex t) (b : complex t) : complex t =
    !\($'"!a + !b"')

inl (.+) a b = complex_add a b

inl complex_sub forall t. (a : complex t) (b : complex t) : complex t =
    !\($'"!a - !b"')

inl (.-) a b = complex_sub a b

inl complex_mult forall t. (a : complex t) (b : complex t) : complex t =
    !\($'"!a * !b"')

inl (.*) a b = complex_mult a b

inl complex_div forall t. (a : complex t) (b : complex t) : complex t =
    !\($'"!a / !b"')

inl (./) a b = complex_div a b

inl powc forall t. (s : complex t) (c : complex t) : complex t =
    inl c = join c
    inl s = join s
    !\($'"num_complex::Complex::powc(!c, !s)"')

inl (.**) a b = powc b a

inl complex_sin forall t. (c : complex t) : complex t =
    !\($'"!c.sin()"')

inl conj forall t. (c : complex t) : complex t =
    !\($'"!c.conj()"')
()


zeta¶

In [ ]:
inl zeta log (gamma : complex f64 -> complex f64) (s : complex f64) : complex f64 =
    inl rec zeta count gamma s =
        inl s = join s
        if log then
            !\($'"println\!(\\\"zeta / count: {:?} / s: {:?}\\\", !count, !s)"')
        if re s > 1 then
            (.^(0, 0), (am.init 10000i32 id : a i32 _))
            ||> am.fold fun acc n =>
                acc .+ (.^(1, 0) ./ (.^(f64 n, 0) .** s))
        else
            inl gamma_term = gamma (.^(1, 0) .- s)
            inl sin_term = .^(pi, 0) .* s ./ .^(2, 0) |> complex_sin
            inl one_minus_s = .^(1 - re s, -(im s))
            inl mirror_term =
                if re one_minus_s <= 1
                then .^(0, 0)
                else
                    if count <= 3
                    then zeta (count + 1) gamma one_minus_s
                    else one_minus_s
            inl reflection_formula =
                .^(2, 0) .* (.^(pi, 0) .** s) .* sin_term .* gamma_term .* mirror_term
            reflection_formula
    join zeta 0i32 gamma s
()


eval¶

In [ ]:
inl module_from_code (py : python) (code : string) : resultm.result' (bound pymodule) pyerr =
    inl py = join py
    inl code = code |> sm'.as_str
    !\($'"pyo3::types::PyModule::from_code_bound(!py, !code, \\"\\", \\"\\")"')

inl use_pyanymethods () =
    global "Fable.Core.RustInterop.emitRustExpr () \");\nuse pyo3::prelude::PyAnyMethods;\n//\""

inl getattr (attr : string) (module : bound pymodule) : resultm.result' (bound pyany) pyerr =
    inl attr = attr |> sm'.as_str
    inl module = join module
    use_pyanymethods ()
    !\($'"!module.getattr(!attr)"')

inl call forall t. (args : t) (module : bound pyany) : resultm.result' (bound pyany) pyerr =
    inl args = join args
    inl module = join module
    !\($'"pyo3::prelude::PyAnyMethods::call(&!module, ((*!args).0, *(*!args).1), None)"')

inl extract forall t. (result : bound pyany) : resultm.result' t pyerr =
    inl result = join result
    use_pyanymethods ()
    !\($'"!result.extract()"')

inl eval py code (args : pair bool (pair f64 f64)) : _ (_ f64) _ =
    inl code =
        code
        |> module_from_code py
        |> resultm.unwrap'
    inl fn =
        code
        |> getattr "fn"
        |> fun x => x : _ _ pyerr
        |> resultm.unwrap'

    fn
    |> call args
    |> resultm.unwrap'
    |> extract
    |> fun x => x : _ _ pyerr
    |> resultm.unwrap'
    |> complex
    |> Ok
    |> fun x => x : _ _ pyerr
    |> resultm.box

inl call1_ log py s code =
    inl code = join (a code : _ i32 _) |> sm'.concat_array_trailing "\n"
    
    inl s = new_pair (re s) (im s)
    inl args = new_pair log s

    eval py code args

inl call1_ log name py s line =
    inl s = join s
    join
        ;[
            $'$"import sys"'
            $'$"import traceback"'
            $'$"import re"'
            $'$"count = 0"'
            $'$"memory_address_pattern = re.compile(r\' at 0x[0-9a-fA-F]+\')"'
            $'$"def trace_calls(frame, event, arg):"'
            $'$"  global count"'
            $'$"  count += 1"'
            $'$"  if count < 300:"'
            $'$"    try:"'
            $'$"      args = {{ k: v for k, v in frame.f_locals.items() if k not in [\'ctx\'] and not callable(v) }}"'
            $'$"      args_str = \', \'.join([ f\\\"{{k}}={{re.sub(memory_address_pattern, \' at 0x<?>\', repr(v))}}\\\" for k, v in args.items() ])"'
            $'$"      print(f\\\"{{event}}({!name}) / f_code.co_name: {{frame.f_code.co_name}} / f_locals: {{args_str}} / f_lineno: {{frame.f_lineno}} / f_code.co_filename: {{frame.f_code.co_filename.split(\'site-packages\')[-1]}} / f_back.f_lineno: {{ \'\' if frame.f_back is None else frame.f_back.f_lineno }} / f_back.f_code.co_filename: {{ \'\' if frame.f_back is None else frame.f_back.f_code.co_filename.split(\'site-packages\')[-1] }}\\\", flush=True)"'
            $'$"    except ValueError as e:"'
            $'$"      print(f\'{!name} / e: {{e}}\', flush=True)"'
            $'$"import mpmath"'
            $'$"def fn(log, s):"'
            $'$"  global count"'
            $'$"  if log:"'
            $'$"    print(f\'{!name} / s: {{s}} / count: {{count}}\', flush=True)"'
            $'$"  s = complex(*s)"'
            $'$"  try:"'
            $'$"    if log: sys.settrace(trace_calls)"'
            line
            $'$"    if log:"'
            $'$"      sys.settrace(None)"'
            $'$"      print(f\'{!name} / result: {{s}} / count: {{count}}\', flush=True)"'
            $'$"  except ValueError as e:"'
            $'$"    if s.real == 1:"'
            $'$"      s = complex(float(\'inf\'), 0)"'
            $'$"  return (s.real, s.imag)"'
        ]
        |> call1_ log py s

inl gamma_ log py s =
    call1_ log "gamma_" py s $'$"    s = mpmath.gamma(s)"'

inl zeta_ log py s =
    call1_ log "zeta_" py s $'$"    s = mpmath.zeta(s)"'
()


run_test¶

In [ ]:
inl run_test log closure_fix (fn : (complex f64 -> complex f64) * (complex f64 -> complex f64) -> ()) =
    inl fn_ (py : python) : resultm.result' () pyerr =
        inl gamma__ = fun (s : complex f64) =>
            inl result = gamma_ log py s |> resultm.unwrap'
            if log then
                inl s = join s
                !\($'"println\!(\\\"gamma__ / s: {:?} / result: {:?}\\\", !s, !result)"')
            result
        inl zeta__ = fun (s : complex f64) =>
            inl result = zeta_ log py s |> resultm.unwrap'

            inl z = zeta true gamma__ s

            if log then
                inl s = join s
                !\($'"println\!(\\\"zeta__ / s: {:?} / result: {:?} / z: {:?}\\\", !s, !result, !z)"')

    //             re result - re x |> abs
    //             |> _assert_lt 0.001

    //             im result - im x |> abs
    //             |> _assert_lt 0.001

            result
        join fn (zeta__, gamma__)

        Ok ()
        |> resultm.box
    
    join
        !\($'"pyo3::prepare_freethreaded_python()"') : ()

        !\($'"let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"')

        let x' = fn_ (!\($'"py"') : python)
        inl x' = join x'
        
        inl closure_fix = 2u8, 1u8
        x' |> rust.fix_closure closure_fix

        (!\($'"__result"') : _ () pyerr)
        |> resultm.unwrap'
()


test_zeta_at_known_values_¶

In [ ]:
inl test_zeta_at_known_values_ log = run_test log (3u8, 2u8) fun zeta, gamma =>
    ;[
        .^(2, 0), pi ** 2 / 6
        .^(-1, 0), -1 / 12
    ]
    |> fun x => a x : _ i32 _
    |> am.iter fun s, e =>
        inl result = zeta s

        result |> im |> _assert_eq 0
        re result - e |> abs |> _assert_lt 0.0001
()


In [ ]:
// // test
// // rust=
// // print_code=false


types ()
test_zeta_at_known_values_ true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (2.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(2+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(2+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(2+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 1, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 1, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2+0j) / result: (2.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2+0j) / result: (2.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 1, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 1, 1, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=2, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=146733021972660147120595982891276473012026808, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=146733021972660147120595982891276473012026808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=146733021972660147120595982891276473012026808, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=146733021972660147120595982891276473012026808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=146733021972660147120595982891276473012026808, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 146733021972660147120595982891276473012026808, -146, 147, 53, 'n') / result: (0, 7408124450506707, -52, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 146733021972660147120595982891276473012026808, -146, 147, 53, 'n') / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 2 / prec: 53 / rnd: n / result: (0, 7408124450506707, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 2 / prec: 53 / rnd: n / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 1, 1, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 7408124450506707, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 1, 1, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7408124450506707, -52, 53), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7408124450506707, -52, 53), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 7408124450506707, -52, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.64493406684823 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 2.0, im: 0.0 }
zeta__ / s: Complex { re: 2.0, im: 0.0 } / result: Complex { re: 1.6449340668482264, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-1.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-1+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-1+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-1+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -52, 53, 53, 'd') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -52, 53, 53, 'd') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, 0, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-1.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, 0, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 0, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-1+0j) / result: (-1.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-1+0j) / result: (-1.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 1, 0, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 1, 0, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-1, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=2, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: bernoulli_size / f_locals: n=2 / f_lineno: 394 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 466 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.bernoulli_size / n: 2 / result: -3\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 398 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.bernoulli_size / n: 2 / result: -3
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 398 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: mpf_rdiv_int / f_locals: n=5, t=(0, 3, 0, 2), prec=126, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 483 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=36296785804900102769426624792721942555307 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=36296785804900102769426624792721942555307, exp=-134, bc=135, prec=126, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 36296785804900102769426624792721942555307, -134, 135, 126, 'd') / result: (0, 70892159775195513221536376548285044053, -125, 126)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 36296785804900102769426624792721942555307, -134, 135, 126, 'd') / result: (0, 70892159775195513221536376548285044053, -125, 126)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-126, prec=126, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 485 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-126, bc=0, prec=126, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -126, 0, 126, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -126, 0, 126, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 70892159775195513221536376548285044053, -125, 126), t=(0, 0, 0, 0), prec=126, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 486 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 70892159775195513221536376548285044053, -125, 126), t=(0, 0, 0, 0), prec=126, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=70892159775195513221536376548285044053, exp=-125, bc=126, prec=126, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 70892159775195513221536376548285044053, -125, 126, 126, 'd') / result: (0, 70892159775195513221536376548285044053, -125, 126)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 70892159775195513221536376548285044053, -125, 126, 126, 'd') / result: (0, 70892159775195513221536376548285044053, -125, 126)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=10, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 486 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 70892159775195513221536376548285044053, -125, 126), t=(0, 5, 1, 3), prec=126, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 486 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7259357160980020553885324958544388511027 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=7259357160980020553885324958544388511027, exp=-135, bc=133, prec=126, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 7259357160980020553885324958544388511027, -135, 133, 126, 'd') / result: (0, 28356863910078205288614550619314017621, -127, 125)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 7259357160980020553885324958544388511027, -135, 133, 126, 'd') / result: (0, 28356863910078205288614550619314017621, -127, 125)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[11]gammazeta.bernoulli_size / n: 2 / prec: 73 / result: (0, 28356863910078205288614550619314017621, -127, 125)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 495 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[11]gammazeta.bernoulli_size / n: 2 / prec: 73 / result: (0, 28356863910078205288614550619314017621, -127, 125)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 495 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 28356863910078205288614550619314017621, -127, 125), t=(1, 1, 1, 1), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=28356863910078205288614550619314017621, exp=-128, bc=125, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 28356863910078205288614550619314017621, -128, 125, 53, 'n') / result: (1, 6004799503160661, -56, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 28356863910078205288614550619314017621, -128, 125, 53, 'n') / result: (1, 6004799503160661, -56, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -1 / prec: 53 / rnd: n / result: (1, 6004799503160661, -56, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -1 / prec: 53 / rnd: n / result: (1, 6004799503160661, -56, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 1, 0, 1) / prec: 53 / rnd: n / alt: 0 / result: (1, 6004799503160661, -56, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 1, 0, 1) / prec: 53 / rnd: n / alt: 0 / result: (1, 6004799503160661, -56, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 1, 0, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 6004799503160661, -56, 53), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 1, 0, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 6004799503160661, -56, 53), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 6004799503160661, -56, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (-0.0833333333333333 + 0.0j) / count: 71
zeta / count: 0 / s: Complex { re: -1.0, im: 0.0 }
gamma_ / s: (2.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(2+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(2+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 1, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 1, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2+0j) / result: (2.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2+0j) / result: (2.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 1, 1), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 1, 1, 1), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 1, 0, 1), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'n') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'n') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (1.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 2.0, im: 0.0 } / result: Complex { re: 1.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 2.0, im: -0.0 }
zeta__ / s: Complex { re: -1.0, im: 0.0 } / result: Complex { re: -0.08333333333333333, im: 0.0 } / z: Complex { re: NaN, im: NaN }

test_zeta_at_2_minus2¶

In [ ]:
inl test_zeta_at_2_minus2 log = run_test log (6u8, 5u8) fun zeta, gamma =>
    inl s = .^(2, -2)
    inl result = zeta s

    (re result - 0.8673) |> abs |> _assert_lt 0.001
    (im result - 0.2750) |> abs |> _assert_lt 0.001
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_zeta_at_2_minus2 true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (2.0, -2.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(2-2j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(2-2j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(2-2j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=-2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -51, 53, 53, 'd') / result: (1, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -51, 53, 53, 'd') / result: (1, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 1, 1), (1, 1, 1, 1)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.0', imag='-2.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 1, 1), (1, 1, 1, 1)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2-2j) / result: (2.0 - 2.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2-2j) / result: (2.0 - 2.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 1, 1), (1, 1, 1, 1)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 1, 1), (1, 1, 1, 1)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 1, 1), y=(1, 1, 1, 1), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 1, 1), t=(0, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 1, 1), t=(1, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 2, 1), t=(0, 1, 2, 1), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=2, exp=2, bc=2, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2, 2, 2, 14, 'd') / result: (0, 1, 3, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2, 2, 2, 14, 'd') / result: (0, 1, 3, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 1, 3, 1), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=8388608 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=8388608 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=8388608 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=2896, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2896 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=2896, exp=-10, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2896, -10, 12, 10, 'd') / result: (0, 181, -6, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2896, -10, 12, 10, 'd') / result: (0, 181, -6, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 181, -6, 8), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 181, -6, 8), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, 1, 1), (1, 1, 1, 1)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, 1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, 1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=0, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 0, 1, 73, 'd') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 0, 1, 73, 'd') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(1, 1, 1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(1, 1, 1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 1, 1, 73, 'd') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 1, 1, 73, 'd') / result: (0, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 1, 0, 1), (0, 1, 1, 1)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 1, 0, 1), y=(0, 1, 1, 1), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 0, 1), t=(1, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 1, 1), t=(0, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, 2, 1), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=0, bc=3, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 0, 3, 14, 'd') / result: (0, 5, 0, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 0, 3, 14, 'd') / result: (0, 5, 0, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 5, 0, 3), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=20971520 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=20971520 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=20971520 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4579, exp=-11, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4579 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4579, exp=-11, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4579, -11, 13, 10, 'd') / result: (0, 143, -6, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4579, -11, 13, 10, 'd') / result: (0, 143, -6, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, 1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, 1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, 1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 1, 1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=34 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 34 / result: [1, 2313, 892433, 137614865, 11339088401, 578880414225, 20030069490193, 498828569821713, 9332660900938257, 135431287117660689, 1562336794306888209, 14608330002894111249, 112453279067298284049, 721801515702233809425, 3903953418129119330833, 17949313539185717494289, 70676048509765124309521, 239852738254939691631121, 705491436696420167402001, 1807657573547947211047441, 4054380852514521569247761, 7999846122894847271453201, 13963921531609293100368401, 21708575975389211162264081, 30318324798527524326818321, 38471229806560539241824785, 45000932007564356617191953, 49381445014527085254754833, 51810638591115507499221521, 52903996135569098636476945, 53293157295459359888720401, 53398525097608388847550993, 53418908749809837902086673, 53421417507003862401106449, 53421565080956452077519377]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 34 / result: [1, 2313, 892433, 137614865, 11339088401, 578880414225, 20030069490193, 498828569821713, 9332660900938257, 135431287117660689, 1562336794306888209, 14608330002894111249, 112453279067298284049, 721801515702233809425, 3903953418129119330833, 17949313539185717494289, 70676048509765124309521, 239852738254939691631121, 705491436696420167402001, 1807657573547947211047441, 4054380852514521569247761, 7999846122894847271453201, 13963921531609293100368401, 21708575975389211162264081, 30318324798527524326818321, 38471229806560539241824785, 45000932007564356617191953, 49381445014527085254754833, 51810638591115507499221521, 52903996135569098636476945, 53293157295459359888720401, 53398525097608388847550993, 53418908749809837902086673, 53421417507003862401106449, 53421565080956452077519377]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(1, 1, 1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=86 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=86, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: pi_fixed / f_locals: prec=85, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=958288617897701126742203875414927711381592807340433735680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 0, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=0, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=0 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 1, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=108, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 689 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=123 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=123, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 224939120507729810846275465740351, -108, 108, 88, 'd') / result: (0, 214518661983232317777896371, -88, 88)

[2]libmpf._normalize. / x: (0, 356520070949948947528356728229971, -108, 109, 88, 'd') / result: (0, 85001008737075077898110563, -86, 87)

[2]libmpf._normalize. / x: (0, 449878241015459621692550931480702, -108, 109, 88, 'd') / result: (0, 214518661983232317777896371, -87, 88)

[2]libmpf._normalize. / x: (0, 522292463546151898066896762790005, -108, 109, 88, 'd') / result: (0, 124524227034128164784168425, -86, 87)

[2]libmpf._normalize. / x: (0, 581459191457678758374632193970322, -108, 109, 88, 'd') / result: (0, 8664417139555197333911541, -82, 83)

[2]libmpf._normalize. / x: (0, 631483947120683840791049765974625, -108, 109, 88, 'd') / result: (0, 301115010795919342418217547, -87, 88)

[2]libmpf._normalize. / x: (0, 674817361523189432538826397221053, -108, 110, 88, 'd') / result: (0, 80444498243712119166711139, -85, 87)

[2]libmpf._normalize. / x: (0, 713040141899897895056713456459942, -108, 110, 88, 'd') / result: (0, 85001008737075077898110563, -85, 87)

[2]libmpf._normalize. / x: (0, 747231584053881708913172228530356, -108, 110, 88, 'd') / result: (0, 89076946264968122114321259, -85, 87)

[2]libmpf._normalize. / x: (0, 778161505752905805354238767353817, -108, 110, 88, 'd') / result: (0, 92764080256570077580718847, -85, 87)

[2]libmpf._normalize. / x: (0, 806398311965408569220907659710673, -108, 110, 88, 'd') / result: (0, 192260339728691236787058749, -86, 88)

[2]libmpf._normalize. / x: (0, 832373655690528864538379510958074, -108, 110, 88, 'd') / result: (0, 198453344271309105047793271, -86, 88)

[2]libmpf._normalize. / x: (0, 856423067628413651637325231714976, -108, 110, 88, 'd') / result: (0, 102093585446883875326791433, -85, 87)

[2]libmpf._normalize. / x: (0, 878812534496100845595253491019976, -108, 110, 88, 'd') / result: (0, 52381308942800810670569747, -84, 86)

[2]libmpf._normalize. / x: (0, 899756482030919243385101862961404, -108, 110, 88, 'd') / result: (0, 214518661983232317777896371, -86, 88)

[2]libmpf._normalize. / x: (0, 919430296618877781423204854757461, -108, 110, 88, 'd') / result: (0, 219209264902800984721947873, -86, 88)

[2]libmpf._normalize. / x: (0, 937979262407627705902988922200293, -108, 110, 88, 'd') / result: (0, 223631682969958235240695219, -86, 88)

[2]libmpf._normalize. / x: (0, 955525078854587723508080664044832, -108, 110, 88, 'd') / result: (0, 28476866449552408561351319, -83, 85)

[2]libmpf._normalize. / x: (0, 972170704561611519759447694270707, -108, 110, 88, 'd') / result: (0, 231783558025744323673116611, -86, 88)

[2]libmpf._normalize. / x: (0, 988004018070632788319406494204596, -108, 110, 88, 'd') / result: (0, 235558514135034749107219337, -86, 88)

[2]libmpf._normalize. / x: (0, 1003100626260635616200514233094168, -108, 110, 88, 'd') / result: (0, 239157826008948234605911787, -86, 88)

[2]libmpf._normalize. / x: (0, 1017526047957690401622753083176439, -108, 110, 88, 'd') / result: (0, 242597114552900886922539015, -86, 88)

[2]libmpf._normalize. / x: (0, 1031337432473138380067183125451024, -108, 110, 88, 'd') / result: (0, 122945002612249658115766421, -85, 87)

[2]libmpf._normalize. / x: (0, 1044584927092303796133793525580010, -108, 110, 88, 'd') / result: (0, 124524227034128164784168425, -85, 87)

[2]libmpf._normalize. / x: (0, 1057312776198258675384654976698425, -108, 110, 88, 'd') / result: (0, 63020752441779296123066841, -84, 86)

[2]libmpf._normalize. / x: (0, 1069560212849846842585070184689914, -108, 110, 88, 'd') / result: (0, 255003026211225233694331689, -86, 88)

[2]libmpf._normalize. / x: (0, 1081362188136143462483600697455327, -108, 110, 88, 'd') / result: (0, 257816836389575830098056959, -86, 88)

[2]libmpf._normalize. / x: (0, 1092749972487262132322162826065000, -108, 110, 88, 'd') / result: (0, 260531895753684552269497591, -86, 88)

[2]libmpf._normalize. / x: (0, 1103751655003830656441528956760327, -108, 110, 88, 'd') / result: (0, 263154901267011322126753081, -86, 88)

[2]libmpf._normalize. / x: (0, 1114392560881063724586709659212406, -108, 110, 88, 'd') / result: (0, 265691890926614695688893713, -86, 88)

[2]libmpf._normalize. / x: (0, 1124695602538649054231377328701755, -108, 110, 88, 'd') / result: (0, 8379635233720012413199077, -81, 83)

[2]libmpf._normalize. / x: (0, 1134681576702854752882595495583788, -108, 110, 88, 'd') / result: (0, 270529169250215233059548257, -86, 88)

[2]libmpf._normalize. / x: (0, 1144369417126607592269480320497812, -108, 110, 88, 'd') / result: (0, 136419465199304532083210983, -85, 87)

[2]libmpf._normalize. / x: (0, 8717675648598095114979, -73, 73, 73, 'd') / result: (0, 8717675648598095114979, -73, 73)

[2]libmpf._normalize. / x: (1, 1666289103194216034071, -73, 71, 73, 'd') / result: (1, 1666289103194216034071, -73, 71)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (1, 6703708186976009930559261, -83, 83, 83, 'd') / result: (1, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -82, 83, 83, 'd') / result: (0, 6703708186976009930559261, -82, 83)

[2]libmpf._normalize. / x: (0, 1237940039285380274899124301, -91, 91, 77, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize. / x: (0, 29767596051123390998171815483556, -107, 105, 77, 'd') / result: (0, 110892936777783151709183, -79, 77)

[2]libmpf._normalize. / x: (0, 159505370262184087295487855672177, -107, 107, 77, 'd') / result: (0, 148550952097572467565059, -77, 77)

[3]libmpf._normalize1 / x: (0, 110892936777783151709183, -80, 77, 73, 'd') / result: (0, 6930808548611446981823, -76, 73)

[3]libmpf._normalize1 / x: (0, 148550952097572467565059, -78, 77, 73, 'd') / result: (0, 290138578315571225713, -69, 68)

[3]libmpf._normalize1 / x: (0, 68627055177302876437313, -76, 76, 73, 'd') / result: (0, 1072297737145357444333, -70, 70)

[2]libmpf._normalize1 / x: (1, 290138578315571225713, -69, 68, 73, 'd') / result: (1, 290138578315571225713, -69, 68)

[3]libmpf._normalize1 / x: (0, 1486544015594977516136923178369041963248365, -140, 141, 63, 'd') / result: (0, 4918561557627564105, -62, 63)

[3]libmpf._normalize1 / x: (0, 10314853374085919652381731359492205705499253, -143, 143, 63, 'd') / result: (0, 1066530841546381917, -60, 60)

[3]libmpf._normalize1 / x: (0, 3271910003015928349546767463838709978640411, -143, 142, 63, 'd') / result: (0, 2706460520513094239, -63, 62)

[3]libmpf._normalize1 / x: (0, 999988576447430733, -60, 60, 53, 'n') / result: (0, 7812410753495553, -53, 53)

[3]libmpf._normalize1 / x: (0, 634400220249365081, -61, 60, 53, 'n') / result: (0, 4956251720698165, -54, 53)

[7]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (1, 1, 1, 1)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7812410753495553, -53, 53), (0, 4956251720698165, -54, 53))

zeta_ / result: (0.867351829635993 + 0.275127238807858j) / count: 1428
zeta / count: 0 / s: Complex { re: 2.0, im: -2.0 }
zeta__ / s: Complex { re: 2.0, im: -2.0 } / result: Complex { re: 0.8673518296359931, im: 0.27512723880785767 } / z: Complex { re: NaN, im: NaN }

test_trivial_zero_at_negative_even___¶

In [ ]:
inl test_trivial_zero_at_negative_even___ log = run_test log (2u8, 1u8) fun zeta, gamma =>
    (join listm'.init_series -2f64 -40 -2)
    |> listm.iter fun n =>
        inl s = .^(n, 0)
        inl result = zeta s

        result |> re |> _assert_eq 0
        result |> im |> _assert_eq 0
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_trivial_zero_at_negative_even___ true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (-2.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-2+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-2+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-2+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -51, 53, 53, 'd') / result: (1, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -51, 53, 53, 'd') / result: (1, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, 1, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-2.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, 1, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-2+0j) / result: (-2.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-2+0j) / result: (-2.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 1, 1, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 1, 1, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 1, 1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-2, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=3, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 3 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 3 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-3, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 3, 0, 2), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -2 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -2 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 1, 1, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 1, 1, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 44
zeta / count: 0 / s: Complex { re: -2.0, im: 0.0 }
gamma_ / s: (3.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(3+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(3+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=3.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, 0, 2), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='3.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, 0, 2), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3, 0, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, 0, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 0, 2), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (3+0j) / result: (3.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (3+0j) / result: (3.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 3, 0, 2), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 3, 0, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 3, 0, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 3, 0, 2), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 1, 1, 1), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=1, bc=1, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 1, 1, 53, 'n') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 1, 1, 53, 'n') / result: (0, 1, 1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 1, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (2.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 3.0, im: 0.0 } / result: Complex { re: 2.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 3.0, im: -0.0 }
zeta__ / s: Complex { re: -2.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-4.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-4+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-4+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-4+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-4.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -50, 53, 53, 'd') / result: (1, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -50, 53, 53, 'd') / result: (1, 1, 2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, 2, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-4.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, 2, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 1, 2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, 2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 2, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-4+0j) / result: (-4.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-4+0j) / result: (-4.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 1, 2, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 1, 2, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 1, 2, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-4, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=5, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 5 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 5 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-5, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 5, 0, 3), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -4 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -4 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 1, 2, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 1, 2, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 1, 2, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 1, 2, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 44
zeta / count: 0 / s: Complex { re: -4.0, im: 0.0 }
gamma_ / s: (5.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(5+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(5+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=5.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -50, 53, 53, 'd') / result: (0, 5, 0, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -50, 53, 53, 'd') / result: (0, 5, 0, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, 0, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='5.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, 0, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, 0, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 0, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 0, 3), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (5+0j) / result: (5.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (5+0j) / result: (5.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 5, 0, 3), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 5, 0, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 5, 0, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 5, 0, 3), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 3, 3, 2), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3, exp=3, bc=2, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 3, 3, 2, 53, 'n') / result: (0, 3, 3, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 3, 3, 2, 53, 'n') / result: (0, 3, 3, 2)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, 3, 2), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (24.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 5.0, im: 0.0 } / result: Complex { re: 24.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 5.0, im: -0.0 }
zeta__ / s: Complex { re: -4.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-6.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-6+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-6+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-6+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-6.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-6755399441055744, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=6755399441055744, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 6755399441055744, -50, 53, 53, 'd') / result: (1, 3, 1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 6755399441055744, -50, 53, 53, 'd') / result: (1, 3, 1, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 3, 1, 2), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-6.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 3, 1, 2), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 3, 1, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 3, 1, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3, 1, 2), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 1, 2), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=600000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=600000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-6+0j) / result: (-6.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-6+0j) / result: (-6.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 3, 1, 2), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 3, 1, 2), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 3, 1, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-6, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=7, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 7 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 7 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-7, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 7, 0, 3), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -6 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -6 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 3, 1, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 3, 1, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 3, 1, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 3, 1, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 44
zeta / count: 0 / s: Complex { re: -6.0, im: 0.0 }
gamma_ / s: (7.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(7+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(7+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=7.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7881299347898368, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7881299347898368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7881299347898368, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7881299347898368, -50, 53, 53, 'd') / result: (0, 7, 0, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7881299347898368, -50, 53, 53, 'd') / result: (0, 7, 0, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 7, 0, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='7.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 7, 0, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 7, 0, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 7, 0, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, 0, 3), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=516508834063867445248, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=700000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=700000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (7+0j) / result: (7.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (7+0j) / result: (7.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 7, 0, 3), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 7, 0, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 7, 0, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 7, 0, 3), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 45, 4, 6), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=45, exp=4, bc=6, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 45, 4, 6, 53, 'n') / result: (0, 45, 4, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 45, 4, 6, 53, 'n') / result: (0, 45, 4, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 45, 4, 6), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (720.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 7.0, im: 0.0 } / result: Complex { re: 720.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 7.0, im: -0.0 }
zeta__ / s: Complex { re: -6.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-8.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-8+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-8+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-8+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-8.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -49, 53, 53, 'd') / result: (1, 1, 3, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -49, 53, 53, 'd') / result: (1, 1, 3, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, 3, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-8.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, 3, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 1, 3, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, 3, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 3, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 3, 1), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=800000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=800000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-8+0j) / result: (-8.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-8+0j) / result: (-8.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 1, 3, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 1, 3, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 1, 3, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-8, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=9, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 9 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 9 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-9, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 9, 0, 4), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -8 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -8 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 1, 3, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 1, 3, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 1, 3, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 1, 3, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 44
zeta / count: 0 / s: Complex { re: -8.0, im: 0.0 }
gamma_ / s: (9.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(9+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(9+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=9.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5066549580791808, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5066549580791808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5066549580791808, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5066549580791808, -49, 53, 53, 'd') / result: (0, 9, 0, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5066549580791808, -49, 53, 53, 'd') / result: (0, 9, 0, 4)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 9, 0, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='9.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 9, 0, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 9, 0, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 9, 0, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 9, 0, 4), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=332041393326771929088, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=900000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=900000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (9+0j) / result: (9.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (9+0j) / result: (9.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 9, 0, 4), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 9, 0, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 9, 0, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 9, 0, 4), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 315, 7, 9), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=315, exp=7, bc=9, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 315, 7, 9, 53, 'n') / result: (0, 315, 7, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 315, 7, 9, 53, 'n') / result: (0, 315, 7, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 315, 7, 9), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (40320.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 9.0, im: 0.0 } / result: Complex { re: 40320.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 9.0, im: -0.0 }
zeta__ / s: Complex { re: -8.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-10.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-10+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-10+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-10+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-10.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -49, 53, 53, 'd') / result: (1, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -49, 53, 53, 'd') / result: (1, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 5, 1, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-10.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 5, 1, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 5, 1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 5, 1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 1, 3), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-10+0j) / result: (-10.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-10+0j) / result: (-10.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 5, 1, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 5, 1, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 5, 1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-10, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=11, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 11 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 11 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-11, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-11, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 11, 0, 4), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -10 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -10 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 5, 1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 5, 1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 5, 1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 5, 1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -10.0, im: 0.0 }
gamma_ / s: (11.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(11+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(11+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=11.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=6192449487634432, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6192449487634432 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=6192449487634432, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6192449487634432, -49, 53, 53, 'd') / result: (0, 11, 0, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6192449487634432, -49, 53, 53, 'd') / result: (0, 11, 0, 4)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 11, 0, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='11.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 11, 0, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 11, 0, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 11, 0, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 11, 0, 4), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=405828369621610135552, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (11+0j) / result: (11.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (11+0j) / result: (11.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 11, 0, 4), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 11, 0, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 11, 0, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 11, 0, 4), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 14175, 8, 14), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=14175, exp=8, bc=14, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 14175, 8, 14, 53, 'n') / result: (0, 14175, 8, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 14175, 8, 14, 53, 'n') / result: (0, 14175, 8, 14)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 14175, 8, 14), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (3628800.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 11.0, im: 0.0 } / result: Complex { re: 3628800.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 11.0, im: -0.0 }
zeta__ / s: Complex { re: -10.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-12.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-12+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-12+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-12+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-12.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-6755399441055744, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=6755399441055744, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 6755399441055744, -49, 53, 53, 'd') / result: (1, 3, 2, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 6755399441055744, -49, 53, 53, 'd') / result: (1, 3, 2, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 3, 2, 2), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-12.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 3, 2, 2), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 3, 2, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 3, 2, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3, 2, 2), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 2, 2), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-12+0j) / result: (-12.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-12+0j) / result: (-12.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 3, 2, 2), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 3, 2, 2), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 3, 2, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-12, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=13, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 13 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 13 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-13, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-13, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 13, 0, 4), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -12 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -12 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 3, 2, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 3, 2, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 3, 2, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 3, 2, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -12.0, im: 0.0 }
gamma_ / s: (13.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(13+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(13+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=13.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7318349394477056, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7318349394477056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7318349394477056, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7318349394477056, -49, 53, 53, 'd') / result: (0, 13, 0, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7318349394477056, -49, 53, 53, 'd') / result: (0, 13, 0, 4)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 13, 0, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='13.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 13, 0, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 13, 0, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 13, 0, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 13, 0, 4), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=479615345916448342016, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (13+0j) / result: (13.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (13+0j) / result: (13.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 13, 0, 4), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 13, 0, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 13, 0, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 13, 0, 4), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 467775, 10, 19), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=467775, exp=10, bc=19, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 467775, 10, 19, 53, 'n') / result: (0, 467775, 10, 19)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 467775, 10, 19, 53, 'n') / result: (0, 467775, 10, 19)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 467775, 10, 19), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (479001600.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 13.0, im: 0.0 } / result: Complex { re: 479001600.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 13.0, im: -0.0 }
zeta__ / s: Complex { re: -12.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-14.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-14+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-14+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-14+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-14.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-7881299347898368, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7881299347898368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=7881299347898368, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7881299347898368, -49, 53, 53, 'd') / result: (1, 7, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7881299347898368, -49, 53, 53, 'd') / result: (1, 7, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 7, 1, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-14.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 7, 1, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 7, 1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 7, 1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 7, 1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, 1, 3), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=516508834063867445248, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-14+0j) / result: (-14.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-14+0j) / result: (-14.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 7, 1, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 7, 1, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 7, 1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-14, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=15, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 15 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 15 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-15, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-15, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 15, 0, 4), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -14 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -14 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 7, 1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 7, 1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 7, 1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 7, 1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -14.0, im: 0.0 }
gamma_ / s: (15.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(15+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(15+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=15.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8444249301319680, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8444249301319680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8444249301319680, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8444249301319680, -49, 53, 53, 'd') / result: (0, 15, 0, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8444249301319680, -49, 53, 53, 'd') / result: (0, 15, 0, 4)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 15, 0, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='15.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 15, 0, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 15, 0, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 15, 0, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 0, 4), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=553402322211286548480, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (15+0j) / result: (15.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (15+0j) / result: (15.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 15, 0, 4), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 15, 0, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 15, 0, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 15, 0, 4), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 42567525, 11, 26), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=42567525, exp=11, bc=26, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 42567525, 11, 26, 53, 'n') / result: (0, 42567525, 11, 26)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 42567525, 11, 26, 53, 'n') / result: (0, 42567525, 11, 26)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 42567525, 11, 26), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (87178291200.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 15.0, im: 0.0 } / result: Complex { re: 87178291200.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 15.0, im: -0.0 }
zeta__ / s: Complex { re: -14.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-16.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-16+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-16+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-16+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-16.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -48, 53, 53, 'd') / result: (1, 1, 4, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -48, 53, 53, 'd') / result: (1, 1, 4, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, 4, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-16.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, 4, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 1, 4, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, 4, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 4, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 4, 1), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=160000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=160000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-16+0j) / result: (-16.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-16+0j) / result: (-16.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 1, 4, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 1, 4, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 1, 4, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-16, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=17, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 17 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 17 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-17, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-17, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 17, 0, 5), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -16 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -16 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 1, 4, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 1, 4, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 1, 4, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 1, 4, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -16.0, im: 0.0 }
gamma_ / s: (17.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(17+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(17+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=17.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4785074604081152, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4785074604081152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4785074604081152, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4785074604081152, -48, 53, 53, 'd') / result: (0, 17, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4785074604081152, -48, 53, 53, 'd') / result: (0, 17, 0, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 17, 0, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='17.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 17, 0, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 17, 0, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 17, 0, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 17, 0, 5), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=313594649253062377472, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=170000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=170000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (17+0j) / result: (17.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (17+0j) / result: (17.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 17, 0, 5), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 17, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 17, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 17, 0, 5), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 638512875, 15, 30), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=638512875, exp=15, bc=30, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 638512875, 15, 30, 53, 'n') / result: (0, 638512875, 15, 30)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 638512875, 15, 30, 53, 'n') / result: (0, 638512875, 15, 30)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 638512875, 15, 30), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (20922789888000.0 + 0.0j) / count: 35
gamma__ / s: Complex { re: 17.0, im: 0.0 } / result: Complex { re: 20922789888000.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 17.0, im: -0.0 }
zeta__ / s: Complex { re: -16.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-18.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-18+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-18+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-18+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-18.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-5066549580791808, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5066549580791808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=5066549580791808, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5066549580791808, -48, 53, 53, 'd') / result: (1, 9, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5066549580791808, -48, 53, 53, 'd') / result: (1, 9, 1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 9, 1, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-18.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 9, 1, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 9, 1, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 9, 1, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 9, 1, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 9, 1, 4), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=332041393326771929088, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=180000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=180000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-18+0j) / result: (-18.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-18+0j) / result: (-18.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 9, 1, 4), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 9, 1, 4), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 9, 1, 4), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-18, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=19, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 19 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 19 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-19, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-19, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 19, 0, 5), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -18 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -18 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 9, 1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 9, 1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 9, 1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 9, 1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -18.0, im: 0.0 }
gamma_ / s: (19.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(19+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(19+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=19.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5348024557502464, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5348024557502464 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5348024557502464, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5348024557502464, -48, 53, 53, 'd') / result: (0, 19, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5348024557502464, -48, 53, 53, 'd') / result: (0, 19, 0, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 19, 0, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='19.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 19, 0, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 19, 0, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 19, 0, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 19, 0, 5), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=350488137400481480704, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=190000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=190000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (19+0j) / result: (19.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (19+0j) / result: (19.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 19, 0, 5), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 19, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 19, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 19, 0, 5), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 97692469875, 16, 37), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=97692469875, exp=16, bc=37, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 97692469875, 16, 37, 53, 'n') / result: (0, 97692469875, 16, 37)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 97692469875, 16, 37, 53, 'n') / result: (0, 97692469875, 16, 37)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 97692469875, 16, 37), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (6.402373705728e+15 + 0.0j) / count: 35
gamma__ / s: Complex { re: 19.0, im: 0.0 } / result: Complex { re: 6402373705728000.0, im: 0.0 }
zeta / count: 1 / s: Complex { re: 19.0, im: -0.0 }
zeta__ / s: Complex { re: -18.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-20.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-20+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-20+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-20+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-20.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -48, 53, 53, 'd') / result: (1, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -48, 53, 53, 'd') / result: (1, 5, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 5, 2, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-20.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 5, 2, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 5, 2, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 5, 2, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 2, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 2, 3), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-20+0j) / result: (-20.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-20+0j) / result: (-20.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 5, 2, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 5, 2, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 5, 2, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-20, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=21, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 21 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 21 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-21, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-21, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 21, 0, 5), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -20 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -20 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 5, 2, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 5, 2, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 5, 2, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 5, 2, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -20.0, im: 0.0 }
gamma_ / s: (21.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(21+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(21+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=21.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5910974510923776, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5910974510923776 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5910974510923776, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5910974510923776, -48, 53, 53, 'd') / result: (0, 21, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5910974510923776, -48, 53, 53, 'd') / result: (0, 21, 0, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 21, 0, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='21.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 21, 0, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 21, 0, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 21, 0, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 21, 0, 5), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=387381625547900583936, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=210000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=210000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (21+0j) / result: (21.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (21+0j) / result: (21.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 21, 0, 5), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 21, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 21, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 21, 0, 5), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 9280784638125, 18, 44), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=9280784638125, exp=18, bc=44, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 9280784638125, 18, 44, 53, 'n') / result: (0, 9280784638125, 18, 44)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 9280784638125, 18, 44, 53, 'n') / result: (0, 9280784638125, 18, 44)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 9280784638125, 18, 44), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (2.43290200817664e+18 + 0.0j) / count: 35
gamma__ / s: Complex { re: 21.0, im: 0.0 } / result: Complex { re: 2.43290200817664e18, im: 0.0 }
zeta / count: 1 / s: Complex { re: 21.0, im: -0.0 }
zeta__ / s: Complex { re: -20.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-22.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-22+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-22+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-22+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-22.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-6192449487634432, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6192449487634432 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=6192449487634432, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 6192449487634432, -48, 53, 53, 'd') / result: (1, 11, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 6192449487634432, -48, 53, 53, 'd') / result: (1, 11, 1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 11, 1, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-22.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 11, 1, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 11, 1, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 11, 1, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 11, 1, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 11, 1, 4), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=405828369621610135552, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=220000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=220000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-22+0j) / result: (-22.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-22+0j) / result: (-22.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 11, 1, 4), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 11, 1, 4), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 11, 1, 4), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-22, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=23, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 23 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 23 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-23, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-23, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 23, 0, 5), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -22 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -22 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 11, 1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 11, 1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 11, 1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 11, 1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -22.0, im: 0.0 }
gamma_ / s: (23.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(23+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(23+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=23.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=6473924464345088, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6473924464345088 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=6473924464345088, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6473924464345088, -48, 53, 53, 'd') / result: (0, 23, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6473924464345088, -48, 53, 53, 'd') / result: (0, 23, 0, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 23, 0, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='23.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 23, 0, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 23, 0, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 23, 0, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 23, 0, 5), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=424275113695319687168, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=230000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=230000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (23+0j) / result: (23.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (23+0j) / result: (23.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 23, 0, 5), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 23, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 23, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 23, 0, 5), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 2143861251406875, 19, 51), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2143861251406875, exp=19, bc=51, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 2143861251406875, 19, 51, 53, 'n') / result: (0, 2143861251406875, 19, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 2143861251406875, 19, 51, 53, 'n') / result: (0, 2143861251406875, 19, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 2143861251406875, 19, 51), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (1.12400072777761e+21 + 0.0j) / count: 35
gamma__ / s: Complex { re: 23.0, im: 0.0 } / result: Complex { re: 1.1240007277776077e21, im: 0.0 }
zeta / count: 1 / s: Complex { re: 23.0, im: -0.0 }
zeta__ / s: Complex { re: -22.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-24.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-24+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-24+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-24+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-24.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-6755399441055744, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=6755399441055744, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 6755399441055744, -48, 53, 53, 'd') / result: (1, 3, 3, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 6755399441055744, -48, 53, 53, 'd') / result: (1, 3, 3, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 3, 3, 2), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-24.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 3, 3, 2), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 3, 3, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 3, 3, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3, 3, 2), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 3, 2), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=240000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=240000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-24+0j) / result: (-24.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-24+0j) / result: (-24.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 3, 3, 2), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 3, 3, 2), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 3, 3, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-24, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=25, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 25 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 25 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-25, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-25, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 25, 0, 5), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -24 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -24 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 3, 3, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 3, 3, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 3, 3, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 3, 3, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -24.0, im: 0.0 }
gamma_ / s: (25.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(25+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(25+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=25.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7036874417766400, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7036874417766400, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7036874417766400, -48, 53, 53, 'd') / result: (0, 25, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7036874417766400, -48, 53, 53, 'd') / result: (0, 25, 0, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 25, 0, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='25.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 25, 0, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 25, 0, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 0, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 0, 5), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (25+0j) / result: (25.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (25+0j) / result: (25.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 25, 0, 5), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 25, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 25, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 25, 0, 5), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 147926426347074375, 22, 58), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=147926426347074375, exp=22, bc=58, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 147926426347074375, 22, 58, 53, 'n') / result: (0, 2311350411673037, 28, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 147926426347074375, 22, 58, 53, 'n') / result: (0, 2311350411673037, 28, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 2311350411673037, 28, 52), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (6.20448401733239e+23 + 0.0j) / count: 35
gamma__ / s: Complex { re: 25.0, im: 0.0 } / result: Complex { re: 6.204484017332394e23, im: 0.0 }
zeta / count: 1 / s: Complex { re: 25.0, im: -0.0 }
zeta__ / s: Complex { re: -24.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-26.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-26+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-26+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-26+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-26.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-7318349394477056, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7318349394477056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=7318349394477056, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7318349394477056, -48, 53, 53, 'd') / result: (1, 13, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7318349394477056, -48, 53, 53, 'd') / result: (1, 13, 1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 13, 1, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-26.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 13, 1, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 13, 1, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 13, 1, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 13, 1, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 13, 1, 4), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=479615345916448342016, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=260000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=260000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-26+0j) / result: (-26.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-26+0j) / result: (-26.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 13, 1, 4), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 13, 1, 4), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 13, 1, 4), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-26, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=27, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 27 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 27 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-27, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-27, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 27, 0, 5), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -26 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -26 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 13, 1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 13, 1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 13, 1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 13, 1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -26.0, im: 0.0 }
gamma_ / s: (27.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(27+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(27+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=27.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7599824371187712, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7599824371187712 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7599824371187712, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7599824371187712, -48, 53, 53, 'd') / result: (0, 27, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7599824371187712, -48, 53, 53, 'd') / result: (0, 27, 0, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 27, 0, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='27.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 27, 0, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 27, 0, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 27, 0, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 27, 0, 5), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=498062089990157893632, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=270000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=270000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (27+0j) / result: (27.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (27+0j) / result: (27.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 27, 0, 5), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 27, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 27, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 27, 0, 5), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 48076088562799171875, 23, 66), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=48076088562799171875, exp=23, bc=66, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 48076088562799171875, 23, 66, 53, 'n') / result: (0, 5868663154638571, 36, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 48076088562799171875, 23, 66, 53, 'n') / result: (0, 5868663154638571, 36, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 5868663154638571, 36, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (4.03291461126606e+26 + 0.0j) / count: 35
gamma__ / s: Complex { re: 27.0, im: 0.0 } / result: Complex { re: 4.0329146112660565e26, im: 0.0 }
zeta / count: 1 / s: Complex { re: 27.0, im: -0.0 }
zeta__ / s: Complex { re: -26.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-28.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-28+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-28+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-28+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-28.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-7881299347898368, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7881299347898368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=7881299347898368, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7881299347898368, -48, 53, 53, 'd') / result: (1, 7, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7881299347898368, -48, 53, 53, 'd') / result: (1, 7, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 7, 2, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-28.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 7, 2, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 7, 2, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 7, 2, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 7, 2, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, 2, 3), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=516508834063867445248, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=280000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=280000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-28+0j) / result: (-28.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-28+0j) / result: (-28.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 7, 2, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 7, 2, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 7, 2, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-28, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=29, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 29 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 29 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-29, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-29, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 29, 0, 5), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -28 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -28 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 7, 2, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 7, 2, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 7, 2, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 7, 2, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -28.0, im: 0.0 }
gamma_ / s: (29.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(29+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(29+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=29.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8162774324609024, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8162774324609024 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8162774324609024, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8162774324609024, -48, 53, 53, 'd') / result: (0, 29, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8162774324609024, -48, 53, 53, 'd') / result: (0, 29, 0, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 29, 0, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='29.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 29, 0, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 29, 0, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 29, 0, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 29, 0, 5), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=534955578137576996864, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=290000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=290000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (29+0j) / result: (29.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (29+0j) / result: (29.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 29, 0, 5), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 29, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 29, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 29, 0, 5), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 9086380738369043484375, 25, 73), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=9086380738369043484375, exp=25, bc=73, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 9086380738369043484375, 25, 73, 53, 'n') / result: (0, 8665447939271015, 45, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 9086380738369043484375, 25, 73, 53, 'n') / result: (0, 8665447939271015, 45, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 8665447939271015, 45, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (3.04888344611714e+29 + 0.0j) / count: 35
gamma__ / s: Complex { re: 29.0, im: 0.0 } / result: Complex { re: 3.0488834461171387e29, im: 0.0 }
zeta / count: 1 / s: Complex { re: 29.0, im: -0.0 }
zeta__ / s: Complex { re: -28.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-30.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-30+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-30+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-30+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-30.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-8444249301319680, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8444249301319680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=8444249301319680, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 8444249301319680, -48, 53, 53, 'd') / result: (1, 15, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 8444249301319680, -48, 53, 53, 'd') / result: (1, 15, 1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 15, 1, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-30.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 15, 1, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 15, 1, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 15, 1, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 15, 1, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 1, 4), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=553402322211286548480, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-30+0j) / result: (-30.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-30+0j) / result: (-30.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 15, 1, 4), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 15, 1, 4), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 15, 1, 4), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-30, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=31, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 31 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 31 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-31, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-31, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 31, 0, 5), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -30 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -30 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 15, 1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 15, 1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 15, 1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 15, 1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -30.0, im: 0.0 }
gamma_ / s: (31.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(31+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(31+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=31.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8725724278030336, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8725724278030336 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8725724278030336, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8725724278030336, -48, 53, 53, 'd') / result: (0, 31, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8725724278030336, -48, 53, 53, 'd') / result: (0, 31, 0, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 31, 0, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='31.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 31, 0, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 31, 0, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 31, 0, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 31, 0, 5), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=571849066284996100096, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=310000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=310000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (31+0j) / result: (31.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (31+0j) / result: (31.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 31, 0, 5), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 31, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 31, 0, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 31, 0, 5), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 3952575621190533915703125, 26, 82), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3952575621190533915703125, exp=26, bc=82, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3952575621190533915703125, 26, 82, 53, 'n') / result: (0, 7362245807779085, 55, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3952575621190533915703125, 26, 82, 53, 'n') / result: (0, 7362245807779085, 55, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 7362245807779085, 55, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (2.65252859812191e+32 + 0.0j) / count: 35
gamma__ / s: Complex { re: 31.0, im: 0.0 } / result: Complex { re: 2.6525285981219107e32, im: 0.0 }
zeta / count: 1 / s: Complex { re: 31.0, im: -0.0 }
zeta__ / s: Complex { re: -30.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-32.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-32+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-32+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-32+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-32.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -47, 53, 53, 'd') / result: (1, 1, 5, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -47, 53, 53, 'd') / result: (1, 1, 5, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, 5, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-32.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, 5, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 1, 5, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, 5, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 5, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 5, 1), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=320000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=320000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-32+0j) / result: (-32.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-32+0j) / result: (-32.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 1, 5, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 1, 5, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 1, 5, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-32, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=33, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 33 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 33 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-33, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-33, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 33, 0, 6), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -32 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -32 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 1, 5, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 1, 5, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 1, 5, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 1, 5, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -32.0, im: 0.0 }
gamma_ / s: (33.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(33+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(33+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=33.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4644337115725824, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4644337115725824 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4644337115725824, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4644337115725824, -47, 53, 53, 'd') / result: (0, 33, 0, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4644337115725824, -47, 53, 53, 'd') / result: (0, 33, 0, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 33, 0, 6), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='33.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 33, 0, 6), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 33, 0, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 33, 0, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 33, 0, 6), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=304371277216207601664, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=330000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=330000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (33+0j) / result: (33.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (33+0j) / result: (33.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 33, 0, 6), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 33, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 33, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 33, 0, 6), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 122529844256906551386796875, 31, 87), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=122529844256906551386796875, exp=31, bc=87, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 122529844256906551386796875, 31, 87, 53, 'n') / result: (0, 1783043906571497, 67, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 122529844256906551386796875, 31, 87, 53, 'n') / result: (0, 1783043906571497, 67, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1783043906571497, 67, 51), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (2.63130836933694e+35 + 0.0j) / count: 35
gamma__ / s: Complex { re: 33.0, im: 0.0 } / result: Complex { re: 2.631308369336935e35, im: 0.0 }
zeta / count: 1 / s: Complex { re: 33.0, im: -0.0 }
zeta__ / s: Complex { re: -32.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-34.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-34+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-34+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-34+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-34.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4785074604081152, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4785074604081152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4785074604081152, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4785074604081152, -47, 53, 53, 'd') / result: (1, 17, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4785074604081152, -47, 53, 53, 'd') / result: (1, 17, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 17, 1, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-34.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 17, 1, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 17, 1, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 17, 1, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 17, 1, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 17, 1, 5), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=313594649253062377472, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=340000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=340000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-34+0j) / result: (-34.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-34+0j) / result: (-34.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 17, 1, 5), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 17, 1, 5), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 17, 1, 5), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-34, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=35, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 35 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 35 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-35, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-35, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 35, 0, 6), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -34 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -34 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 17, 1, 5) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 17, 1, 5) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 17, 1, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 17, 1, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -34.0, im: 0.0 }
gamma_ / s: (35.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(35+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(35+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=35.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4925812092436480, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4925812092436480 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4925812092436480, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4925812092436480, -47, 53, 53, 'd') / result: (0, 35, 0, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4925812092436480, -47, 53, 53, 'd') / result: (0, 35, 0, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 35, 0, 6), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='35.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 35, 0, 6), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 35, 0, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 35, 0, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 35, 0, 6), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=322818021289917153280, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=350000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=350000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (35+0j) / result: (35.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (35+0j) / result: (35.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 35, 0, 6), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 35, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 35, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 35, 0, 6), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 68739242628124575327993046875, 32, 96), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=68739242628124575327993046875, exp=32, bc=96, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 68739242628124575327993046875, 32, 96, 53, 'n') / result: (0, 3907373560885195, 76, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 68739242628124575327993046875, 32, 96, 53, 'n') / result: (0, 3907373560885195, 76, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 3907373560885195, 76, 52), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (2.95232799039604e+38 + 0.0j) / count: 35
gamma__ / s: Complex { re: 35.0, im: 0.0 } / result: Complex { re: 2.9523279903960416e38, im: 0.0 }
zeta / count: 1 / s: Complex { re: 35.0, im: -0.0 }
zeta__ / s: Complex { re: -34.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-36.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-36+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-36+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-36+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-36.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-5066549580791808, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5066549580791808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=5066549580791808, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5066549580791808, -47, 53, 53, 'd') / result: (1, 9, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5066549580791808, -47, 53, 53, 'd') / result: (1, 9, 2, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 9, 2, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-36.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 9, 2, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 9, 2, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 9, 2, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 9, 2, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 9, 2, 4), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=332041393326771929088, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=360000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=360000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-36+0j) / result: (-36.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-36+0j) / result: (-36.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 9, 2, 4), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 9, 2, 4), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 9, 2, 4), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-36, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=37, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 37 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 37 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-37, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-37, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 37, 0, 6), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -36 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -36 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 9, 2, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 9, 2, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 9, 2, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 9, 2, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -36.0, im: 0.0 }
gamma_ / s: (37.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(37+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(37+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=37.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5207287069147136, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5207287069147136 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5207287069147136, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5207287069147136, -47, 53, 53, 'd') / result: (0, 37, 0, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5207287069147136, -47, 53, 53, 'd') / result: (0, 37, 0, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 37, 0, 6), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='37.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 37, 0, 6), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 37, 0, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 37, 0, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 37, 0, 6), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=341264765363626704896, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=370000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=370000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (37+0j) / result: (37.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (37+0j) / result: (37.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 37, 0, 6), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 37, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 37, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 37, 0, 6), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 21652861427859241228317809765625, 34, 105), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=21652861427859241228317809765625, exp=34, bc=105, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 21652861427859241228317809765625, 34, 105, 53, 'n') / result: (0, 4807901061245455, 86, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 21652861427859241228317809765625, 34, 105, 53, 'n') / result: (0, 4807901061245455, 86, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 4807901061245455, 86, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (3.71993326789901e+41 + 0.0j) / count: 35
gamma__ / s: Complex { re: 37.0, im: 0.0 } / result: Complex { re: 3.7199332678990125e41, im: 0.0 }
zeta / count: 1 / s: Complex { re: 37.0, im: -0.0 }
zeta__ / s: Complex { re: -36.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-38.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-38+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-38+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-38+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-38.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-5348024557502464, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5348024557502464 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=5348024557502464, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5348024557502464, -47, 53, 53, 'd') / result: (1, 19, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5348024557502464, -47, 53, 53, 'd') / result: (1, 19, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 19, 1, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-38.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 19, 1, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 19, 1, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 19, 1, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 19, 1, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 19, 1, 5), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=350488137400481480704, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=380000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=380000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-38+0j) / result: (-38.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-38+0j) / result: (-38.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 19, 1, 5), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 19, 1, 5), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 19, 1, 5), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-38, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=39, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 39 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 39 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-39, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-39, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 39, 0, 6), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -38 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -38 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 19, 1, 5) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 19, 1, 5) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 19, 1, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 19, 1, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -38.0, im: 0.0 }
gamma_ / s: (39.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(39+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(39+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=39.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5488762045857792, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5488762045857792 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5488762045857792, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5488762045857792, -47, 53, 53, 'd') / result: (0, 39, 0, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5488762045857792, -47, 53, 53, 'd') / result: (0, 39, 0, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 39, 0, 6), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='39.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 39, 0, 6), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 39, 0, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 39, 0, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 39, 0, 6), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=359711509437336256512, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=390000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=390000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (39+0j) / result: (39.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (39+0j) / result: (39.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 39, 0, 6), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 39, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 39, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 39, 0, 6), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 15221961583785046583507420265234375, 35, 114), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15221961583785046583507420265234375, exp=35, bc=114, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15221961583785046583507420265234375, 35, 114, 53, 'n') / result: (0, 6601473527452255, 96, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15221961583785046583507420265234375, 35, 114, 53, 'n') / result: (0, 6601473527452255, 96, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 6601473527452255, 96, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (5.23022617466601e+44 + 0.0j) / count: 35
gamma__ / s: Complex { re: 39.0, im: 0.0 } / result: Complex { re: 5.230226174666011e44, im: 0.0 }
zeta / count: 1 / s: Complex { re: 39.0, im: -0.0 }
zeta__ / s: Complex { re: -38.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (-40.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-40+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-40+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-40+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-40.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -47, 53, 53, 'd') / result: (1, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -47, 53, 53, 'd') / result: (1, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 5, 3, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-40.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 5, 3, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 5, 3, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 5, 3, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 3, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 3, 3), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-40+0j) / result: (-40.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-40+0j) / result: (-40.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 5, 3, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(1, 5, 3, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 5, 3, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=-40, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_bernoulli / f_locals: n=41, prec=73, rnd=None / f_lineno: 403 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[4]gammazeta.mpf_bernoulli / n: 41 / prec: 73 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[4]gammazeta.mpf_bernoulli / n: 41 / prec: 73 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 419 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=-41, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-41, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 0, 0, 0), t=(1, 41, 0, 6), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 951 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]gammazeta.mpf_zeta_int / s: -40 / prec: 53 / rnd: n / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[3]gammazeta.mpf_zeta_int / s: -40 / prec: 53 / rnd: n / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 952 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (1, 5, 3, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (1, 5, 3, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((1, 5, 3, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((1, 5, 3, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 0, 0, 0), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (0.0 + 0.0j) / count: 45
zeta / count: 0 / s: Complex { re: -40.0, im: 0.0 }
gamma_ / s: (41.0, 0.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(41+0j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(41+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=41.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5770237022568448, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5770237022568448 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5770237022568448, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5770237022568448, -47, 53, 53, 'd') / result: (0, 41, 0, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5770237022568448, -47, 53, 53, 'd') / result: (0, 41, 0, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 41, 0, 6), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='41.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 41, 0, 6), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 41, 0, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 41, 0, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 41, 0, 6), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=378158253511045808128, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=410000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=410000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (41+0j) / result: (41.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (41+0j) / result: (41.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 41, 0, 6), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 41, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 41, 0, 6), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 41, 0, 6), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 2968282508838084083783946951720703125, 38, 122), prec=53, rnd='n' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1824 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2968282508838084083783946951720703125, exp=38, bc=122, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2968282508838084083783946951720703125, 38, 122, 53, 'n') / result: (0, 2514233081744511, 108, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2968282508838084083783946951720703125, 38, 122, 53, 'n') / result: (0, 2514233081744511, 108, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 2514233081744511, 108, 52), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (8.15915283247898e+47 + 0.0j) / count: 35
gamma__ / s: Complex { re: 41.0, im: 0.0 } / result: Complex { re: 8.159152832478977e47, im: 0.0 }
zeta / count: 1 / s: Complex { re: 41.0, im: -0.0 }
zeta__ / s: Complex { re: -40.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 } / z: Complex { re: NaN, im: NaN }

test_non_trivial_zero___¶

In [ ]:
inl test_non_trivial_zero___ log = run_test log (3u8, 2u8) fun zeta, gamma =>
    ;[
        .^(0.5, 14.134725)
        .^(0.5, 21.022040)
        .^(0.5, 25.010857)
        .^(0.5, 30.424876)
        .^(0.5, 32.935062)
        .^(0.5, 37.586178)
    ]
    |> fun x => a x : _ i32 _
    |> am.iter fun x =>
            inl result = zeta x
            result |> re |> abs |> _assert_lt 0.0001
            result |> im |> abs |> _assert_lt 0.0001
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_non_trivial_zero___ true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (0.5, 14.134725) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5+14.134725j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5+14.134725j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5+14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7957142780373054, -49, 53, 53, 'd') / result: (0, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7957142780373054, -49, 53, 53, 'd') / result: (0, 3978571390186527, -48, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+14.134725j) / result: (0.5 + 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+14.134725j) / result: (0.5 + 14.134725j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 3978571390186527, -48, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 15829030306810754071359852321729, -96, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15848837347439320155758238309313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15848837347439320155758238309313, exp=-96, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6401, -5, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13109248 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13109248 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13109248 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3620, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3620, exp=-8, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 905, -6, 10), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 905, -6, 10), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 3978571390186527, -48, 52), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 3978571390186527, -48, 52), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3978571390186527, exp=-48, bc=52, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 3978571390186527, -48, 52, 73, 'd') / result: (1, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 3978571390186527, -48, 52, 73, 'd') / result: (1, 3978571390186527, -48, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 3978571390186527, -48, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3978571390186527, -48, 52), t=(1, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 15829030306810754071359852321729, -96, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15848837347439320155758238309313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15848837347439320155758238309313, exp=-96, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6401, -5, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13109248 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13109248 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13109248 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3620, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3620, exp=-8, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=45 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 45 / result: [1, 4051, 2736451, 739027171, 106764890851, 9573696452323, 583327124420323, 25664548404164323, 851672769217066723, 22025556704041924323, 455310086907194799843, 7676718923626409391843, 107311229250534993327843, 1260619007250012201842403, 12586223430355989445244643, 107825444073394299229992675, 799077851966414289603163875, 5158527083919185637090293475, 29183936184458903285463807715, 145449144946956939472898651875, 641514035666948560539287320291, 2514000556967729940871184152291, 8784653093416858284308234008291, 27457262868620929351431893579491, 76986029222708323529476210456291, 194156939340377930327821051524835, 441576659045864279524929313208035, 908060519119520582902845518673635, 1693207379711025218198662924236515, 2872115128040193097693048163563235, 4449320522415034644948813274707683, 6325953064637876253264768589395683, 8306842970317542395376054754899683, 10155673548951897461346588509370083, 11674993497680392932591908609619683, 12768400566371956133016076863960803, 13452849435662449529212739307992803, 13822314985986603313609160575448803, 13992398776170915511899723629098723, 14058212084260882469746421687154403, 14079205696461732689211444358837987, 14084578948605882850772802163996387, 14085639418334848803484854421583587, 14085790872561530124227861611312867, 14085804799386972084755954226460387, 14085805418356991727446091676022499]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 45 / result: [1, 4051, 2736451, 739027171, 106764890851, 9573696452323, 583327124420323, 25664548404164323, 851672769217066723, 22025556704041924323, 455310086907194799843, 7676718923626409391843, 107311229250534993327843, 1260619007250012201842403, 12586223430355989445244643, 107825444073394299229992675, 799077851966414289603163875, 5158527083919185637090293475, 29183936184458903285463807715, 145449144946956939472898651875, 641514035666948560539287320291, 2514000556967729940871184152291, 8784653093416858284308234008291, 27457262868620929351431893579491, 76986029222708323529476210456291, 194156939340377930327821051524835, 441576659045864279524929313208035, 908060519119520582902845518673635, 1693207379711025218198662924236515, 2872115128040193097693048163563235, 4449320522415034644948813274707683, 6325953064637876253264768589395683, 8306842970317542395376054754899683, 10155673548951897461346588509370083, 11674993497680392932591908609619683, 12768400566371956133016076863960803, 13452849435662449529212739307992803, 13822314985986603313609160575448803, 13992398776170915511899723629098723, 14058212084260882469746421687154403, 14079205696461732689211444358837987, 14084578948605882850772802163996387, 14085639418334848803484854421583587, 14085790872561530124227861611312867, 14085804799386972084755954226460387, 14085805418356991727446091676022499]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=86 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=86, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: pi_fixed / f_locals: prec=85, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=958288617897701126742203875414927711381592807340433735680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 0, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=0, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=0 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 1, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=108, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 689 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=123 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=123, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 224939120507729810846275465740351, -108, 108, 88, 'd') / result: (0, 214518661983232317777896371, -88, 88)

[2]libmpf._normalize. / x: (0, 356520070949948947528356728229971, -108, 109, 88, 'd') / result: (0, 85001008737075077898110563, -86, 87)

[2]libmpf._normalize. / x: (0, 449878241015459621692550931480702, -108, 109, 88, 'd') / result: (0, 214518661983232317777896371, -87, 88)

[2]libmpf._normalize. / x: (0, 522292463546151898066896762790005, -108, 109, 88, 'd') / result: (0, 124524227034128164784168425, -86, 87)

[2]libmpf._normalize. / x: (0, 581459191457678758374632193970322, -108, 109, 88, 'd') / result: (0, 8664417139555197333911541, -82, 83)

[2]libmpf._normalize. / x: (0, 631483947120683840791049765974625, -108, 109, 88, 'd') / result: (0, 301115010795919342418217547, -87, 88)

[2]libmpf._normalize. / x: (0, 674817361523189432538826397221053, -108, 110, 88, 'd') / result: (0, 80444498243712119166711139, -85, 87)

[2]libmpf._normalize. / x: (0, 713040141899897895056713456459942, -108, 110, 88, 'd') / result: (0, 85001008737075077898110563, -85, 87)

[2]libmpf._normalize. / x: (0, 747231584053881708913172228530356, -108, 110, 88, 'd') / result: (0, 89076946264968122114321259, -85, 87)

[2]libmpf._normalize. / x: (0, 778161505752905805354238767353817, -108, 110, 88, 'd') / result: (0, 92764080256570077580718847, -85, 87)

[2]libmpf._normalize. / x: (0, 806398311965408569220907659710673, -108, 110, 88, 'd') / result: (0, 192260339728691236787058749, -86, 88)

[2]libmpf._normalize. / x: (0, 832373655690528864538379510958074, -108, 110, 88, 'd') / result: (0, 198453344271309105047793271, -86, 88)

[2]libmpf._normalize. / x: (0, 856423067628413651637325231714976, -108, 110, 88, 'd') / result: (0, 102093585446883875326791433, -85, 87)

[2]libmpf._normalize. / x: (0, 878812534496100845595253491019976, -108, 110, 88, 'd') / result: (0, 52381308942800810670569747, -84, 86)

[2]libmpf._normalize. / x: (0, 899756482030919243385101862961404, -108, 110, 88, 'd') / result: (0, 214518661983232317777896371, -86, 88)

[2]libmpf._normalize. / x: (0, 919430296618877781423204854757461, -108, 110, 88, 'd') / result: (0, 219209264902800984721947873, -86, 88)

[2]libmpf._normalize. / x: (0, 937979262407627705902988922200293, -108, 110, 88, 'd') / result: (0, 223631682969958235240695219, -86, 88)

[2]libmpf._normalize. / x: (0, 955525078854587723508080664044832, -108, 110, 88, 'd') / result: (0, 28476866449552408561351319, -83, 85)

[2]libmpf._normalize. / x: (0, 972170704561611519759447694270707, -108, 110, 88, 'd') / result: (0, 231783558025744323673116611, -86, 88)

[2]libmpf._normalize. / x: (0, 988004018070632788319406494204596, -108, 110, 88, 'd') / result: (0, 235558514135034749107219337, -86, 88)

[2]libmpf._normalize. / x: (0, 1003100626260635616200514233094168, -108, 110, 88, 'd') / result: (0, 239157826008948234605911787, -86, 88)

[2]libmpf._normalize. / x: (0, 1017526047957690401622753083176439, -108, 110, 88, 'd') / result: (0, 242597114552900886922539015, -86, 88)

[2]libmpf._normalize. / x: (0, 1031337432473138380067183125451024, -108, 110, 88, 'd') / result: (0, 122945002612249658115766421, -85, 87)

[2]libmpf._normalize. / x: (0, 1044584927092303796133793525580010, -108, 110, 88, 'd') / result: (0, 124524227034128164784168425, -85, 87)

[2]libmpf._normalize. / x: (0, 1057312776198258675384654976698425, -108, 110, 88, 'd') / result: (0, 63020752441779296123066841, -84, 86)

[2]libmpf._normalize. / x: (0, 1069560212849846842585070184689914, -108, 110, 88, 'd') / result: (0, 255003026211225233694331689, -86, 88)

[2]libmpf._normalize. / x: (0, 1081362188136143462483600697455327, -108, 110, 88, 'd') / result: (0, 257816836389575830098056959, -86, 88)

[2]libmpf._normalize. / x: (0, 1092749972487262132322162826065000, -108, 110, 88, 'd') / result: (0, 260531895753684552269497591, -86, 88)

[2]libmpf._normalize. / x: (0, 1103751655003830656441528956760327, -108, 110, 88, 'd') / result: (0, 263154901267011322126753081, -86, 88)

[2]libmpf._normalize. / x: (0, 1114392560881063724586709659212406, -108, 110, 88, 'd') / result: (0, 265691890926614695688893713, -86, 88)

[2]libmpf._normalize. / x: (0, 1124695602538649054231377328701755, -108, 110, 88, 'd') / result: (0, 8379635233720012413199077, -81, 83)

[2]libmpf._normalize. / x: (0, 1134681576702854752882595495583788, -108, 110, 88, 'd') / result: (0, 270529169250215233059548257, -86, 88)

[2]libmpf._normalize. / x: (0, 1144369417126607592269480320497812, -108, 110, 88, 'd') / result: (0, 136419465199304532083210983, -85, 87)

[2]libmpf._normalize. / x: (0, 1153776410666835738857946528764630, -108, 110, 88, 'd') / result: (0, 137540866216043917996638599, -85, 87)

[2]libmpf._normalize. / x: (0, 1162918382915357516749264387940644, -108, 110, 88, 'd') / result: (0, 8664417139555197333911541, -81, 83)

[2]libmpf._normalize. / x: (0, 1171809858390608982398566213337114, -108, 110, 88, 'd') / result: (0, 34922655176836519908862299, -83, 85)

[2]libmpf._normalize. / x: (0, 1180464199362317534354356129785183, -108, 110, 88, 'd') / result: (0, 281444597092227347935284645, -86, 88)

[2]libmpf._normalize. / x: (0, 1188893726640477812066736239188045, -108, 110, 88, 'd') / result: (0, 283454353008384182945903835, -86, 88)

[2]libmpf._normalize. / x: (0, 1197109825069341330605723160011058, -108, 110, 88, 'd') / result: (0, 285413223521552403117590703, -86, 88)

[2]libmpf._normalize. / x: (0, 1205123035993216547930927173891029, -108, 110, 88, 'd') / result: (0, 143661860942031925670019051, -85, 87)

[2]libmpf._normalize. / x: (0, 1212943138578362599165681959944947, -108, 110, 88, 'd') / result: (0, 289188179630842828551693429, -86, 88)

[2]libmpf._normalize. / x: (0, 1220579221564782150033120128189249, -108, 110, 88, 'd') / result: (0, 291008763686366593845634491, -86, 88)

[2]libmpf._normalize. / x: (0, 1228039746768365427046789698834519, -108, 110, 88, 'd') / result: (0, 36598436438094539256298235, -83, 85)

[2]libmpf._normalize. / x: (0, 1235332605446049793123610219249947, -108, 110, 88, 'd') / result: (0, 294526244508278320580389551, -86, 88)

[2]libmpf._normalize. / x: (1, 153120441794174, -73, 48, 73, 'd') / result: (1, 76560220897087, -72, 47)

[2]libmpf._normalize. / x: (1, 2515609284194685, -73, 52, 73, 'd') / result: (1, 2515609284194685, -73, 52)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 26671181600861946303071036718460217276547, -131, 135, 83, 'd') / result: (1, 5922191981447154929945283, -79, 83)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (1, 151121746166493518974841525782529, -107, 107, 77, 'd') / result: (1, 70371546860082782327589, -76, 76)

[2]libmpf._normalize. / x: (0, 59078682726760234328303176772303, -107, 106, 77, 'd') / result: (0, 55021310901977340065225, -77, 76)

[3]libmpf._normalize1 / x: (1, 7519548517005631292626979655834296412779829963, -152, 153, 73, 'd') / result: (1, 6220024748418928932523, -72, 73)

[3]libmpf._normalize1 / x: (0, 5879299734867058439431761933794605628385657575, -153, 153, 73, 'd') / result: (0, 2431621378035093300407, -72, 72)

[3]libmpf._normalize1 / x: (0, 10942391231288574146219, -72, 74, 73, 'd') / result: (0, 5471195615644287073109, -71, 73)

[2]libmpf._normalize1 / x: (1, 2431621378035093300407, -72, 72, 73, 'd') / result: (1, 2431621378035093300407, -72, 72)

[3]libmpf._normalize1 / x: (0, 125648708384698363898211291208006903590069173, -144, 147, 63, 'd') / result: (0, 3247942986504735535, -59, 62)

[3]libmpf._normalize1 / x: (0, 4441505534611752507045341591641202863, -145, 122, 63, 'd') / result: (0, 963097989946490775, -83, 60)

[2]libmpf._normalize. / x: (1, 13949555956200469759062948925906440074, -144, 124, 63, 'd') / result: (1, 6049655549168262979, -83, 63)

[3]libmpf._normalize1 / x: (0, 683741302274438299, -85, 60, 53, 'n') / result: (0, 5341728924019049, -78, 53)

[3]libmpf._normalize1 / x: (1, 536861176988063609, -82, 59, 53, 'n') / result: (1, 4194227945219247, -75, 52)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5341728924019049, -78, 53), (1, 4194227945219247, -75, 52))

zeta_ / result: (1.76742984138492e-8 - 1.11020289309231e-7j) / count: 1633
zeta / count: 0 / s: Complex { re: 0.5, im: 14.134725 }
gamma_ / s: (0.5, -14.134725) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-14.134725j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=56 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 3978571390186527, -48, 52), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=287275361037200865517000943840, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=287275361037200865517000943840 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-243790725006669908234919702522, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=243790725006669908234919702522 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3324546003940230230441984, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3324546003940230230441984 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=3324546003940230230441984, y=-8543917002826194402410496, prec=79 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=79, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: ln_sqrt2pi_fixed / f_locals: prec=92 / f_lineno: 298 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: f / f_locals: prec=102, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=16703571626015105435307505830654230989 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=16703571626015105435307505830654230989, exp=-122, bc=124, prec=102, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 16703571626015105435307505830654230989, -122, 124, 102, 'd') / result: (0, 124451306656115542615260972311, -95, 97)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 16703571626015105435307505830654230989, -122, 124, 102, 'd') / result: (0, 124451306656115542615260972311, -95, 97)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 124451306656115542615260972311, -95, 97), n=1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 124451306656115542615260972311, -94, 97), prec=102, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=124451306656115542615260972311, n=25 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=4175892906503776358826876457663332352, prec=122 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=280153111556540953215542460800145041418878976, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=99961970518367115073231831877510988860191686310266891205533259355525058899519208482144256 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=112812380252346714256619501890993673050670816217087917444950810085789266016207277765165056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119844398375027416975362124250156558253081446922452215126903700549285702590021345940078592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123523112981967131966433631211306545068774826918748702154819251296018532790592798371872768 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125404601453928029720323931284714870129867852460400437921184426881038853667772148177960960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126356065534944591108671811195750949899937575479834920054591589616121392668525122285469696 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126834501251325580293361066030583655283751847122811260937259636407222732982902106993197056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127074398013868139835428851315650043196027587579164016306760379080409009090078308965548032 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=9771830597929420112984881758595737588, exp=-122, prec=102, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9771830597929420112984881758595737588 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=9771830597929420112984881758595737588, exp=-122, bc=123, prec=102, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9771830597929420112984881758595737588, -122, 123, 102, 'd') / result: (0, 291223245797438028841760210949, -97, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9771830597929420112984881758595737588, -122, 123, 102, 'd') / result: (0, 291223245797438028841760210949, -97, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 291223245797438028841760210949, -97, 98), prec=91 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 11, -1, 4), (1, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 11, -1, 4), b=(1, 3978571390186527, -48, 52), prec=79, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 11, -1, 4), t=(0, 11, -1, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3978571390186527, -48, 52), t=(1, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 121, -2, 7), t=(0, 15829030306810754071359852321729, -96, 104), prec=99, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18225682222867250283564556819393 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=18225682222867250283564556819393, exp=-96, bc=104, prec=99, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 284776284732300785680696200303, -90, 98), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=283538344693015405405797076079 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=283538344693015405405797076079, exp=-90, bc=98, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 284776284732300785680696200303, -90, 98), prec=79, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=284776284732300785680696200303, n=1 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=569552569464601571361392400606, prec=99 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=320573212228877707659575950169320196648468480, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=114384344374250927695737917073768793223104914683389975011306714685426684312882676372602880 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=120676485028096484433951552367843431407527463960676057612806510180772854322011304760442880 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123951185326074664259857871786972098313394081357046750141548787348173476088241469901504512 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125621709862019204453913212908825132427429745625801802714947246381288877340626171700707328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126465396056981193274815852744801877898272499397908483525622083986070613245447135251398656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126889361632846350693997912295296262541909385612810917707591166893070219651155061672771584 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127101877115422858141706372732003982758358472832807458644577177971327327704869509082906624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127208268290567809871602809777025776342159359187110407689967463022858021207834437890342912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3446903713076390561309005800422, exp=-99, prec=79, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3446903713076390561309005800422 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3446903713076390561309005800422, exp=-99, bc=102, prec=79, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 410902942785786457217813, -76, 79), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 11, -1, 4), (1, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 11, -1, 4), prec=83, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=795361000990365733460758901 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=795361000990365733460758901, exp=-88, bc=90, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 3106878910118616146331089, -80, 82), prec=83, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 3106878910118616146331089, -80, 82), prec=115, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4137755196124176474103397727147895027 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4137755196124176474103397727147895027, exp=-123, bc=122, prec=115, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 32326212469720128703932794743342929, -116, 115), prec=115 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=16163106234860064351966397371671464, prec=115 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=49, prec=115 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=114 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=136592064341000066741906274419971214224130048, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=31102006696265179814114748792328683520, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=31102006696265179814114748792328683520, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=960596954648329995352001931985120417250650554932471146773005280633120915390264924402228071420211273294155979973862067535872, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=960596954648329995352001931985120417250650554932471146773005280633120915390264924402228071420211273294155979973862067535872 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=63616873907402959623674243669028964632506234012469323646411736841980019385839238149504021818082361165649382199226525885399626852659704893752844651084805216602074576870728350790448963184095728456929980200294747108689588245232463420734175062766544694001965766172367 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=63616873907402959623674243669028964632506234012469323646411736841980019385839238149504021818082361165649382199226525885399626852659704893752844651084805216602074576870728350790448963184095728456929980200294747108689588245232463420734175062766544694001965766172367 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=136592064341000066741906274419971214224130048, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=146875073972429994300413514533805050883358785970196765999104, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: pi_fixed / f_locals: prec=216, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=6, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=6, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=4, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=6, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=5, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=5, b=6, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=7101583434157760683541000681561997427937677552418571477652645940236617263256392795779825646866410618589286160811223740454114930951454720 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=146875073972429994300413514533805050883358785970196765999104, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=136592064341000066741906274419971214224130048, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=146875073972429994300413514533803264057810994313047999882333, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=115, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=49834032997671069426337453096415908, exp=-115, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=49834032997671069426337453096415908 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=49834032997671069426337453096415908, exp=-115, bc=116, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 2900722494678983315030197, -81, 82), prec=79, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2900722494678983315030197, exp=-81, bc=82, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 181295155917436457189387, -77, 78), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 410902942785786457217813, -77, 79), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 181295155917436457189387, -77, 78), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4800046813251803222648618, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4800046813251803222648618 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-18310891217218483114822925, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18310891217218483114822925 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 2400023406625901611324309, -78, 81), (1, 18310891217218483114822925, -79, 84)), prec=79, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 2400023406625901611324309, -78, 81), prec=83, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=59699187411898656429395990080, prec=97 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=230957530658735881693891676201, exp=-109, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=230957530658735881693891676201 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=230957530658735881693891676201, exp=-109, bc=98, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 18310891217218483114822925, -79, 84), prec=83, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=18310891217218483114822925, exp=-79, mag=5, wp=93 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=117, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=4649164099690916627888465732026023, prec=113 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=1177505944407630316883099142433373414694345841530125921850780666582535315639679584751118281095742851134771846419572856979456, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1177505944407630316883099142433373414694345841530125921850780666582535315639679584751118281095742851134771846419572856979456 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=93477364213445395674486584006672159009349578834116038418346307598933757089764905705753957410338063415411683564056931495176489629478493565113272041128563300977300636534135255003477278175347280633168128240323507519288257651602240552345475774780715975148167786059120 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=93477364213445395674486584006672159009349578834116038418346307598933757089764905705753957410338063415411683564056931495176489629478493565113272041128563300977300636534135255003477278175347280633168128240323507519288257651602240552345475774780715975148167786059120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4495404953043347407944683301079216, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4495404953043347407944683301079216 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4495404953043347407944683301079216, exp=-113, bc=112, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4495404953043347407944683301079216, -113, 112, 83, 'd') / result: (0, 8373344229615009218351325, -84, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4495404953043347407944683301079216, -113, 112, 83, 'd') / result: (0, 8373344229615009218351325, -84, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=9361149554235093976625001073510346, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9361149554235093976625001073510346 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=9361149554235093976625001073510346, exp=-113, bc=113, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9361149554235093976625001073510346, -113, 113, 83, 'd') / result: (0, 8718249904210766755626537, -83, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9361149554235093976625001073510346, -113, 113, 83, 'd') / result: (0, 8718249904210766755626537, -83, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 8373344229615009218351325, -84, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3688596547369876239432441312247797506607298704825, exp=-174, bc=162, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3688596547369876239432441312247797506607298704825, -174, 162, 79, 'd') / result: (0, 381391943939299648778581, -91, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3688596547369876239432441312247797506607298704825, -174, 162, 79, 'd') / result: (0, 381391943939299648778581, -91, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 8718249904210766755626537, -83, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3840533198437269834067505864995107096179479656597, exp=-173, bc=162, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3840533198437269834067505864995107096179479656597, -173, 162, 79, 'd') / result: (0, 198550912725848715621957, -89, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3840533198437269834067505864995107096179479656597, -173, 162, 79, 'd') / result: (0, 198550912725848715621957, -89, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((0, 381391943939299648778581, -91, 79), (0, 198550912725848715621957, -89, 78)), w=((0, 8977355032412527047406279495, -74, 93), (1, 121895362503334954117459851261, -78, 97)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 8977355032412527047406279495, -74, 93), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 121895362503334954117459851261, -78, 97), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 80592903377982524553907910110515080449823065558057455025, -148, 186), t=(0, 14858479399819437132148394216276916640401370646256243290121, -156, 194), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=35490262664582963417948819204568777235556075429118951776521 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35490262664582963417948819204568777235556075429118951776521, exp=-156, bc=195, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 35490262664582963417948819204568777235556075429118951776521, -156, 195, 63, 'd') / result: (0, 6518531761158815351, -24, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 35490262664582963417948819204568777235556075429118951776521, -156, 195, 63, 'd') / result: (0, 6518531761158815351, -24, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778581, -91, 79), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 198550912725848715621957, -89, 78), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 3423890887245068097056047351909084148739746255496595, -165, 172), t=(1, 24202435482085350494818342228484790191920956325737777, -167, 175), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10506871933105078106594152820848453596961971303751397 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=10506871933105078106594152820848453596961971303751397, exp=-167, bc=173, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 10506871933105078106594152820848453596961971303751397, -167, 173, 63, 'd') / result: (1, 8094199711123548935, -57, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 10506871933105078106594152820848453596961971303751397, -167, 173, 63, 'd') / result: (1, 8094199711123548935, -57, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 198550912725848715621957, -89, 78), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778581, -91, 79), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1782462035549498425446128939415939579200266300871715, -163, 171), t=(1, 46489909262332533317794197358759010978315664582640641, -169, 175), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1782462035549498425446128939415939579200266300871715, -163, 171), t=(1, 46489909262332533317794197358759010978315664582640641, -169, 175), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=160567479537500432546346449481379144047132707838430401 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=160567479537500432546346449481379144047132707838430401, exp=-169, bc=177, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 160567479537500432546346449481379144047132707838430401, -169, 177, 63, 'd') / result: (0, 7731042923401420971, -55, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 160567479537500432546346449481379144047132707838430401, -169, 177, 63, 'd') / result: (0, 7731042923401420971, -55, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 8094199711123548935, -57, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=715803592853699603 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=715803592853699603, exp=-92, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 7731042923401420971, -55, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=683688134538102371 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=683688134538102371, exp=-90, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 683688134538102371, -90, 60, 53, 'n') / result: (0, 5341313551078925, -83, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 683688134538102371, -90, 60, 53, 'n') / result: (0, 5341313551078925, -83, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 699026946146191, -82, 50), (0, 5341313551078925, -83, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.4455538437607e-10 + 5.52278876877407e-10j) / count: 244
gamma__ / s: Complex { re: 0.5, im: -14.134725 } / result: Complex { re: -1.4455538437606964e-10, im: 5.522788768774066e-10 }
zeta__ / s: Complex { re: 0.5, im: 14.134725 } / result: Complex { re: 1.767429841384921e-8, im: -1.1102028930923147e-7 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.5, 21.02204) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5+21.02204j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5+21.02204j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5+21.02204j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=21.02204, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5917178219410479, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5917178219410479 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5917178219410479, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5917178219410479, -48, 53, 53, 'd') / result: (0, 5917178219410479, -48, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5917178219410479, -48, 53, 53, 'd') / result: (0, 5917178219410479, -48, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 5917178219410479, -48, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='21.022040000000001') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 5917178219410479, -48, 53)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5917178219410479, -48, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5917178219410479, -48, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5917178219410479, -48, 53), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=387788191787285151744, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=210220400000000005036, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=210220400000000005036, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+21.02204j) / result: (0.5 + 21.02204j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+21.02204j) / result: (0.5 + 21.02204j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (0, 5917178219410479, -48, 53)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 5917178219410479, -48, 53)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 5917178219410479, -48, 53), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5917178219410479, -48, 53), t=(0, 5917178219410479, -48, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 35012998080265766757482295009441, -96, 105), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=35032805120894332841880680997025 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35032805120894332841880680997025, exp=-96, bc=105, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 35032805120894332841880680997025, -96, 105, 14, 'd') / result: (0, 14149, -5, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 35032805120894332841880680997025, -96, 105, 14, 'd') / result: (0, 14149, -5, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 14149, -5, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=28977152 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=28977152 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=28977152 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5383, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5383 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5383, exp=-8, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5383, -8, 13, 10, 'd') / result: (0, 21, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5383, -8, 13, 10, 'd') / result: (0, 21, 0, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 21, 0, 5), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 21, 0, 5), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (0, 5917178219410479, -48, 53)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5917178219410479, -48, 53), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5917178219410479, -48, 53), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5917178219410479, -48, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5917178219410479, exp=-48, bc=53, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5917178219410479, -48, 53, 73, 'd') / result: (1, 5917178219410479, -48, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5917178219410479, -48, 53, 73, 'd') / result: (1, 5917178219410479, -48, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 5917178219410479, -48, 53)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 5917178219410479, -48, 53), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5917178219410479, -48, 53), t=(1, 5917178219410479, -48, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 35012998080265766757482295009441, -96, 105), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=35032805120894332841880680997025 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35032805120894332841880680997025, exp=-96, bc=105, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 35032805120894332841880680997025, -96, 105, 14, 'd') / result: (0, 14149, -5, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 35032805120894332841880680997025, -96, 105, 14, 'd') / result: (0, 14149, -5, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 14149, -5, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=28977152 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=28977152 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=28977152 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5383, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5383 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5383, exp=-8, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5383, -8, 13, 10, 'd') / result: (0, 21, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5383, -8, 13, 10, 'd') / result: (0, 21, 0, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5917178219410479, -48, 53), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=51 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 51 / result: [1, 5203, 4513603, 1565622243, 290593736163, 33496712602083, 2625586476196323, 148751086335959523, 6363955680371220963, 212481263589749760483, 5680014062870106808803, 124072217794473336054243, 2251700226884154557276643, 34421435724320134622159331, 448372741172808513023189475, 5025627406017013340859867619, 48878680162750201530133848547, 415493327986419814021568733667, 3106328457409671065069814620643, 20537428285849907476554468631011, 120654514479968188404056071152099, 632519106148387088105405727711715, 2969998002562308490547087034622435, 12532206357554137686622525347144163, 47661454073056035016885483119387107, 163803048561041899659795670039863779, 509950545858568398203371129096970723, 1441234867728223897429622364156273123, 3705344284013931812431625366793953763, 8682823787209492951643530334480179683, 18581540087349817929059296145923973603, 36389807064122628914341387785549455843, 65363574764427599168173362278590915043, 107966494730283951699915109388638822883, 164521029399620918361893618282749829603, 232199126788599731468774732445888881123, 305066937435888344015776620621537812963, 375479742245004700456974298569869435363, 436355935595763543359118536627655090659, 483264863805439188539125785001186894307, 515329194480407351067232005408411165155, 534658550099584183762585408978198274531, 544861078596223705322955535934138687971, 549533864561579261846090855366216458723, 551369776288824496174929810545381810659, 551979454839944636413969962951946084835, 552147240241495138457776521855998173667, 552184474704891154697193671738617831907, 552190876419650469769935567683348931043, 552191676465635538811216587290159423971, 552191741115816150450916063622022898147, 552191743651117350907374866615429308899]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 51 / result: [1, 5203, 4513603, 1565622243, 290593736163, 33496712602083, 2625586476196323, 148751086335959523, 6363955680371220963, 212481263589749760483, 5680014062870106808803, 124072217794473336054243, 2251700226884154557276643, 34421435724320134622159331, 448372741172808513023189475, 5025627406017013340859867619, 48878680162750201530133848547, 415493327986419814021568733667, 3106328457409671065069814620643, 20537428285849907476554468631011, 120654514479968188404056071152099, 632519106148387088105405727711715, 2969998002562308490547087034622435, 12532206357554137686622525347144163, 47661454073056035016885483119387107, 163803048561041899659795670039863779, 509950545858568398203371129096970723, 1441234867728223897429622364156273123, 3705344284013931812431625366793953763, 8682823787209492951643530334480179683, 18581540087349817929059296145923973603, 36389807064122628914341387785549455843, 65363574764427599168173362278590915043, 107966494730283951699915109388638822883, 164521029399620918361893618282749829603, 232199126788599731468774732445888881123, 305066937435888344015776620621537812963, 375479742245004700456974298569869435363, 436355935595763543359118536627655090659, 483264863805439188539125785001186894307, 515329194480407351067232005408411165155, 534658550099584183762585408978198274531, 544861078596223705322955535934138687971, 549533864561579261846090855366216458723, 551369776288824496174929810545381810659, 551979454839944636413969962951946084835, 552147240241495138457776521855998173667, 552184474704891154697193671738617831907, 552190876419650469769935567683348931043, 552191676465635538811216587290159423971, 552191741115816150450916063622022898147, 552191743651117350907374866615429308899]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5917178219410479, -48, 53), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=178405961588244985132285746181186892047843328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-137622677397399573414848, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10734841104019902397182, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2995409858580813964000866239523493774222458719681899274883564853587151241539535785770388609804959884465647679488387092316160, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2995409858580813964000866239523493774222458719681899274883564853587151241539535785770388609804959884465647679488387092316160 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=105778458786457081043780612795497558406816031522581720473319957079705218851735529447128878423280085019000547087296665931408318606906844215757878678748307056745775334300653727741690961274980320121989475731194876163148278527598340665203382974278854890882937647178792927 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=105778458786457081043780612795497558406816031522581720473319957079705218851735529447128878423280085019000547087296665931408318606906844215757878678748307056745775334300653727741690961274980320121989475731194876163148278527598340665203382974278854890882937647178792927 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=267608942382367477698428619271780338071764992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-218126782923723365891901, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4409494828405847826144, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1229150941969368488676217525873433652180939957386710392107393853713348268080016408643711188161345607763489909859027806846976, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1229150941969368488676217525873433652180939957386710392107393853713348268080016408643711188161345607763489909859027806846976 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=101246729906920264471294047588524657088001435829673352830915319876134625357148268898322555828304260680061147042055436733656744854312099010189082303699282175363230866662441185505926214781438612674297940212583889301179578199834356239474869966296900112956064748947295 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=101246729906920264471294047588524657088001435829673352830915319876134625357148268898322555828304260680061147042055436733656744854312099010189082303699282175363230866662441185505926214781438612674297940212583889301179578199834356239474869966296900112956064748947295 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=356811923176489970264571492362373784095686656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-275245354794799146829717, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6633930357897857213140, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1848890912710226550193638127154156502020069347665724035186752099283103697364058295354826072948578687308106671132487205257216, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1848890912710226550193638127154156502020069347665724035186752099283103697364058295354826072948578687308106671132487205257216 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3339298091689260728886518752346849333933356557486867796009618714004013530194586431454916952812775042486452963799573150996712863736624781708950438683167051100889689410800349301535964938304590266405111973343633566102579882739845277266483872942018260074548675075563687 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3339298091689260728886518752346849333933356557486867796009618714004013530194586431454916952812775042486452963799573150996712863736624781708950438683167051100889689410800349301535964938304590266405111973343633566102579882739845277266483872942018260074548675075563687 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=446014903970612462830714365452967230119608320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-319549961142642054191125, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6836579560480792595341, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1910864909784312356345380187282228787003982286693625399494687923840079240292462484025937561427301995262568347259833145098240, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1910864909784312356345380187282228787003982286693625399494687923840079240292462484025937561427301995262568347259833145098240 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3526122667593002998854958841668909659961414786425189537207360500997955268259487558889874573884839632972535670880962134348573825122661030482120992537741890945028931454326914313467986250234233589204750737244125306197432418609304846197160424845864805072691921387442112 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3526122667593002998854958841668909659961414786425189537207360500997955268259487558889874573884839632972535670880962134348573825122661030482120992537741890945028931454326914313467986250234233589204750737244125306197432418609304846197160424845864805072691921387442112 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=535217884764734955396857238543560676143529984 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-355749460321122939306748, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=308584082283802642124, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=82631996098781074868989413504096379978550585370535152410581099409300723904538918228148651304964410605948901503127919788032, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=82631996098781074868989413504096379978550585370535152410581099409300723904538918228148651304964410605948901503127919788032 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=120081172701730746092896413144227018867976327457729029430899963621940730359508344543165148824051912340863044293334325245042446606830289981585040087213953849835475175942178721427253004097683481614914435020887570808601409085167552235519264353720751592683477775 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=120081172701730746092896413144227018867976327457729029430899963621940730359508344543165148824051912340863044293334325245042446606830289981585040087213953849835475175942178721427253004097683481614914435020887570808601409085167552235519264353720751592683477775 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=437, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=624420865558857447963000111634154122167451648 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-386355700778335473922167, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14209599175497110770314, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3976664812253839228070115524884638286467746920957004209759215409072597337905935439729653844051412260411290884838031139799040, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3976664812253839228070115524884638286467746920957004209759215409072597337905935439729653844051412260411290884838031139799040 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128401932487692008474964933255467984213504882816721553271677888654421723910738420095368745570897328273324791726750173957510888549359114841982016404362514391583968530919127095194207072701252758623347230953203131300875442566682126233111913451450903636960494838475754480 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128401932487692008474964933255467984213504882816721553271677888654421723910738420095368745570897328273324791726750173957510888549359114841982016404362514391583968530919127095194207072701252758623347230953203131300875442566682126233111913451450903636960494838475754480 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=713623846352979940529142984724747568191373312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-412868032192198720244585, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2533019611775812029099, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=702371966839639136386410014784819229817679975649548795489939344979056153188580804939263536092197490150565662776587318198272, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=702371966839639136386410014784819229817679975649548795489939344979056153188580804939263536092197490150565662776587318198272 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=34719690561929476994314296882206655374095556111075716534196663522431474974516344292717441369895112009147724143161266063575270961025000707174304047257300760003875218858445950999290573826941284936839637927204843105966139622745474458509644097926681048844554345383767 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=34719690561929476994314296882206655374095556111075716534196663522431474974516344292717441369895112009147724143161266063575270961025000707174304047257300760003875218858445950999290573826941284936839637927204843105966139622745474458509644097926681048844554345383767 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=802826827147102433095285857815341014215294976 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-436253565847446731783801, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8818989656811695652289, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2468630883451084611711058728434879351859198737944737678266110344852859126648100182065940957735811766852723432405946603667456, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2468630883451084611711058728434879351859198737944737678266110344852859126648100182065940957735811766852723432405946603667456 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5207777832378145265158493457695946310787214808139298787211966142934764565411847969068128924444575825321893226787221646055290132599448256541492855572223347931730025296137258712303856841344443798899723047053215408157397090620513727763586489120371650380947669719141647 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5207777832378145265158493457695946310787214808139298787211966142934764565411847969068128924444575825321893226787221646055290132599448256541492855572223347931730025296137258712303856841344443798899723047053215408157397090620513727763586489120371650380947669719141647 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=892029807941224925661428730905934460239216640 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-457172638540041627605993, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2735668814358747411300, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=981232788735347418227571603996527906263138304 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-476096241630084589947262, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13483569424599680232437, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3770084822006886540897641991124397336521370457530666328732762660549345528144588144159282215789001233896418631080211340328960, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3770084822006886540897641991124397336521370457530666328732762660549345528144588144159282215789001233896418631080211340328960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=126284786941024818271813865467493432578101688261742183076805788878457714137448474498297292959927303159887273519609701203985859924557793492533712815191835902397338954863391641982668876843839940262969375085399345945618061903186159896158649220183296398028996659002632167 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=126284786941024818271813865467493432578101688261742183076805788878457714137448474498297292959927303159887273519609701203985859924557793492533712815191835902397338954863391641982668876843839940262969375085399345945618061903186159896158649220183296398028996659002632167 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1070435769529469910793714477087121352287059968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-493372137718522512721617, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11043425186303705039285, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1159638750323592403359857350177714798310981632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-509264421558255732254203, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9986893196712433087902, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2788829868333861276828392705763252824276082256255561393857112105063899431778188490200016981542548857950775425730567292846080, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2788829868333861276828392705763252824276082256255561393857112105063899431778188490200016981542548857950775425730567292846080 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=97566583747970360905697999061729824033013786081296983987276199456216330200262707500304867076703152323039071318501833300615469795754111027597970263373289074482708181478603997551154964552830410822815812055899720464498687782745560454084853012218212302552314165283976935 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=97566583747970360905697999061729824033013786081296983987276199456216330200262707500304867076703152323039071318501833300615469795754111027597970263373289074482708181478603997551154964552830410822815812055899720464498687782745560454084853012218212302552314165283976935 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1248841731117714895926000223268308244334903296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-523978378175735047337014, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10108688429375065586294, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2819816866870904179904263735827288966768038725769512076011080017342387203242390584535572725781910511928006263794240262766592, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2819816866870904179904263735827288966768038725769512076011080017342387203242390584535572725781910511928006263794240262766592 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=98854878314844651322812539178442167827778740418996528424497401936617096143610994652730641829167655632700024614944550681182190742680653786385619574705482787159665543364290938525122196720486682631689309614243514690928769663320478434871126906608949831643917369773158492 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=98854878314844651322812539178442167827778740418996528424497401936617096143610994652730641829167655632700024614944550681182190742680653786385619574705482787159665543364290938525122196720486682631689309614243514690928769663320478434871126906608949831643917369773158492 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1338044711911837388492143096358901690358824960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-537676744066365420083046, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11246074388886640421465, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3140015851753680845021597713155662439184922244080335791602081777553427508372478892669648749588647603026058257118860951945216, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3140015851753680845021597713155662439184922244080335791602081777553427508372478892669648749588647603026058257118860951945216 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=110939173400999981053350442336855944259556784432593038760372793660103977312149983053314130397202080025019248771549439500919944924747675090198515140419364937146899812960815439117426288113216615401354420161459725364817508412428640936891176859987834328491353372077897052 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=110939173400999981053350442336855944259556784432593038760372793660103977312149983053314130397202080025019248771549439500919944924747675090198515140419364937146899812960815439117426288113216615401354420161459725364817508412428640936891176859987834328491353372077897052 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1427247692705959881058285969449495136382746624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-550490709589598293659454, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13267860715795714426260, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3708110824932800734745899930996325051537457518502764964424826835992369985216183955488170727310277925941956954952865400487936, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3708110824932800734745899930996325051537457518502764964424826835992369985216183955488170727310277925941956954952865400487936 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125352725498474359924704027680747382115066369112260562441987109338409025970568992225274047532677727333712367118883035222873793702405002863526283691982258504737432688162540330395608343911424303431286350321664102423909537075977900226409047812578621307314819490946834127 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125352725498474359924704027680747382115066369112260562441987109338409025970568992225274047532677727333712367118883035222873793702405002863526283691982258504737432688162540330395608343911424303431286350321664102423909537075977900226409047812578621307314819490946834127 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1516450673500082373624428842540088582406668288 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-562527579975253725984494, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1230990330140282101220, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=340856983907471933834581330704397567411521164653457503693647035063365486106223037691113186632978193749539218700402669125632, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=340856983907471933834581330704397567411521164653457503693647035063365486106223037691113186632978193749539218700402669125632 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=520352089751556564460975110225379842354212174773830521696479436056222827292555885960237412041695115126143483560331728454966537923745155118630109173038160170319277208530564124877681633902443232657117676641017485361817417482819671033500149246134649473204469421820 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=520352089751556564460975110225379842354212174773830521696479436056222827292555885960237412041695115126143483560331728454966537923745155118630109173038160170319277208530564124877681633902443232657117676641017485361817417482819671033500149246134649473204469421820 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1605653654294204866190571715630682028430589952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-573876243244846305198670, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4718078910689650468247, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1311782938068149563545206939377530032159490542757245544517974953122648991984555326871859839466310018369438811362155726635008, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1311782938068149563545206939377530032159490542757245544517974953122648991984555326871859839466310018369438811362155726635008 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=114150772052822570588297085934413406892271972827024492287905789813301865268015970717944991608804622253866527678846826145931721964616238560208446168008011534191144354903914198991642305029230079297573974170474661718499608958298044843027789315093145475714370802317607 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=114150772052822570588297085934413406892271972827024492287905789813301865268015970717944991608804622253866527678846826145931721964616238560208446168008011534191144354903914198991642305029230079297573974170474661718499608958298044843027789315093145475714370802317607 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1694856635088327358756714588721275474454511616 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-584611157790184305873962, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8818916215493597374158, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1784059615882449851322857461811868920478433280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-594795315937441201020862, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13470509918378649808461, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1873262596676572343889000334902462366502354944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-604482483702058839814067, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3783342153761011015256, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1053557950259458704579615022177228844726519963474323193234909017468584229782871207408895304138296235225848494164880977297408, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1053557950259458704579615022177228844726519963474323193234909017468584229782871207408895304138296235225848494164880977297408 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=75838893935930375078261042600621765166745015421462836225931890655696984232239087047895479486305790717357146315690749243346873709553936050717553621514189801199908777499738691153372439045487073777401449504762077898137948257835600651686376561117110720209258315849847 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=75838893935930375078261042600621765166745015421462836225931890655696984232239087047895479486305790717357146315690749243346873709553936050717553621514189801199908777499738691153372439045487073777401449504762077898137948257835600651686376561117110720209258315849847 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1962465577470694836455143207993055812526276608 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-613718919027484163362109, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9382658678477635048417, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2051668558264817329021286081083649258550198272 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-622544707765584067761334, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=556869940377730649192, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=154934992685214515379355150320180712459782347569753410769839561392438857321010471677778721196808269886154190318364849602560, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=154934992685214515379355150320180712459782347569753410769839561392438857321010471677778721196808269886154190318364849602560 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=421814761291112011551841638731109070844937866830705569050005151605743116091364982911473330427636052514400614926765876858316422726464479210807097065386949117864246367067387865064331884200775079700313336121325713764744191194403438273296194250346403185117453312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=421814761291112011551841638731109070844937866830705569050005151605743116091364982911473330427636052514400614926765876858316422726464479210807097065386949117864246367067387865064331884200775079700313336121325713764744191194403438273296194250346403185117453312 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2140871539058939821587428954174242704574119936 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-630994815115922086136486, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6942514440181659855243, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1941851908321355259421251217346264929495938756207576081648655836118567011756664578361493305666663649239799185323506115018752, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1941851908321355259421251217346264929495938756207576081648655836118567011756664578361493305666663649239799185323506115018752 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3619976286560776085918574864892616653164043340614317721071912438365374793987916950565526802919294720159380545413320504443060245025882973954924242318325345206780117781708389182276453085057433959151321394395987385260121130257475431575108541839867590372406919752288700 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3619976286560776085918574864892616653164043340614317721071912438365374793987916950565526802919294720159380545413320504443060245025882973954924242318325345206780117781708389182276453085057433959151321394395987385260121130257475431575108541839867590372406919752288700 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2230074519853062314153571827264836150598041600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-639099922285284108382270, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13673159120961585190662, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3821729819568624712690760374564457574007964573387250798989375847680158480584924968051875122854603990525136694519666290196480, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3821729819568624712690760374564457574007964573387250798989375847680158480584924968051875122854603990525136694519666290196480 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=126957879716234833275177570775685717091645137033870248046306948280542281874363972035437904351738179789625981050216688749972461114012706047150482763974868436170106842124279118929872872047613123407860589759657075215720684012514373027759191922475701526327821999050503055 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=126957879716234833275177570775685717091645137033870248046306948280542281874363972035437904351738179789625981050216688749972461114012706047150482763974868436170106842124279118929872872047613123407860589759657075215720684012514373027759191922475701526327821999050503055 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2319277500647184806719714700355429596621963264 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-646887098955655305669071, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5885982450590387903861, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1642310922463273863021164593393915552073692884239386154160299350759851887602710999784454444686167660793234417374667405787136, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1642310922463273863021164593393915552073692884239386154160299350759851887602710999784454444686167660793234417374667405787136 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2729796065331479329239046209421871667470854267480199694238183669290562587427779466795750692971111908478708287119599859008038990880142059291428850949598487367956051194073877708680956762867570003368247824191218527085247228257450157369426537297097534081664704400313247 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 1242465168465420212469028548916790, -108, 110, 88, 'd') / result: (0, 74056695012177241591753277, -84, 86)

[2]libmpf._normalize. / x: (0, 1249444331078408621166331932414016, -108, 110, 88, 'd') / result: (0, 297890742082216410914977057, -86, 88)

[2]libmpf._normalize. / x: (0, 1256276552980868190913458591191375, -108, 110, 88, 'd') / result: (0, 149759835360153697838003467, -85, 87)

[2]libmpf._normalize. / x: (0, 1262967894241367681582099531949250, -108, 110, 88, 'd') / result: (0, 301115010795919342418217547, -86, 88)

[2]libmpf._normalize. / x: (0, 1269524047600033606980068991320361, -108, 110, 88, 'd') / result: (0, 302678119564064409012810943, -86, 88)

[2]libmpf._normalize. / x: (0, 1275950367568826728951561582987432, -108, 110, 88, 'd') / result: (0, 304210273639876062620058437, -86, 88)

[2]libmpf._normalize. / x: (1, 3502112575212469, -73, 52, 73, 'd') / result: (1, 3502112575212469, -73, 52)

[2]libmpf._normalize. / x: (0, 7124923305777766, -73, 53, 73, 'd') / result: (0, 3562461652888883, -72, 52)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 39667036073258156869514687258222193896019, -131, 135, 83, 'd') / result: (1, 8807851353433572698551287, -79, 83)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (1, 68260126535297547637300119285845, -107, 106, 77, 'd') / result: (1, 127144393576863310555555, -78, 77)

[2]libmpf._normalize. / x: (1, 147202676750541680798645980164856, -107, 107, 77, 'd') / result: (1, 137093175901604519038131, -77, 77)

[3]libmpf._normalize1 / x: (1, 13586008533639303580839128905265153536445064685, -154, 154, 73, 'd') / result: (1, 702380178812901277087, -70, 70)

[3]libmpf._normalize1 / x: (1, 14649085227473564810483125151471054336745293277, -153, 154, 73, 'd') / result: (1, 6058719645901546048049, -72, 73)

[2]libmpf._normalize1 / x: (0, 1882971799530312580511, -70, 71, 73, 'd') / result: (0, 1882971799530312580511, -70, 71)

[2]libmpf._normalize1 / x: (0, 6058719645901546048049, -72, 73, 73, 'd') / result: (0, 6058719645901546048049, -72, 73)

[3]libmpf._normalize1 / x: (0, 93437408512856134230913828947982543529044337, -144, 147, 63, 'd') / result: (0, 2415300400282244367, -59, 62)

[3]libmpf._normalize1 / x: (0, 8395197968317649824369257853788755949, -144, 123, 63, 'd') / result: (0, 3640836750278355585, -83, 62)

[3]libmpf._normalize1 / x: (0, 74882436895981936145063035916852796685, -145, 126, 63, 'd') / result: (0, 4059385038181615419, -81, 62)

[3]libmpf._normalize1 / x: (0, 868960023289092067, -83, 60, 53, 'n') / result: (0, 424296886371627, -72, 49)

[3]libmpf._normalize1 / x: (0, 968855117452877333, -81, 60, 53, 'n') / result: (0, 1892295151275151, -72, 51)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (0, 5917178219410479, -48, 53)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 424296886371627, -72, 49), (0, 1892295151275151, -72, 51))

zeta_ / result: (8.98483605435455e-8 + 4.00709084764903e-7j) / count: 722
zeta / count: 0 / s: Complex { re: 0.5, im: 21.02204 }
gamma_ / s: (0.5, -21.02204) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-21.02204j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-21.02204j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-21.02204, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5917178219410479, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5917178219410479 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5917178219410479, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5917178219410479, -48, 53, 53, 'd') / result: (1, 5917178219410479, -48, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5917178219410479, -48, 53, 53, 'd') / result: (1, 5917178219410479, -48, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 5917178219410479, -48, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-21.022040000000001') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 5917178219410479, -48, 53)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5917178219410479, -48, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5917178219410479, -48, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5917178219410479, -48, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5917178219410479, -48, 53), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=387788191787285151744, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=210220400000000005036, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=210220400000000005036, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-21.02204j) / result: (0.5 - 21.02204j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-21.02204j) / result: (0.5 - 21.02204j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 5917178219410479, -48, 53)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 5917178219410479, -48, 53)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 5917178219410479, -48, 53)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5917178219410479, -48, 53), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=105 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 5917178219410479, -48, 53), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=604462909807314587353088, y=-25414086936971519704694784, prec=80 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=80, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, -1, 1), (1, 5917178219410479, -48, 53)), prec=80, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, -1, 1), b=(1, 5917178219410479, -48, 53), prec=80, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5917178219410479, -48, 53), t=(1, 5917178219410479, -48, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 35012998080265766757482295009441, -96, 105), prec=100, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=35032805120894332841880680997025 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35032805120894332841880680997025, exp=-96, bc=105, prec=100, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 35032805120894332841880680997025, -96, 105, 100, 'd') / result: (0, 1094775160027947901308771281157, -91, 100)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 35032805120894332841880680997025, -96, 105, 100, 'd') / result: (0, 1094775160027947901308771281157, -91, 100)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1094775160027947901308771281157, -91, 100), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1092299279949377140758973032709 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1092299279949377140758973032709, exp=-91, bc=100, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 1092299279949377140758973032709, -91, 100, 10, 'd') / result: (0, 441, 0, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1092299279949377140758973032709, -91, 100, 10, 'd') / result: (0, 441, 0, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 1094775160027947901308771281157, -91, 100), prec=80, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=1094775160027947901308771281157, n=0 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=1094775160027947901308771281157, prec=100 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=308029043054704232142462108640955493301354496, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=109908435246562847916339476840447405662200809326213845554342538893388248839769875992805376 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=118291862753709150131263922608705831074205530275510602606549069337890412719234621720494080 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=122720408891748459164239261578246212302744442144292613417064195351058734854083809741111296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=124996471935953598871863436722714642911588073555186052405117832278561625162408481934802944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126150284940329561435124428392252052834497874367950658167900095639683070482042430267850752 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126731179285204378289163486700286049719768939159446710895966856920116539608818485483798528 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127022628773197607380650969840788501219422493759435890392803195212456762670331997345284096 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127168604768330981706003894812035001972279098572598673423059029498049177655013356632801280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7722157768785035062268620879564, exp=-100, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7722157768785035062268620879564 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7722157768785035062268620879564, exp=-100, bc=103, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7722157768785035062268620879564, -100, 103, 80, 'd') / result: (0, 920552941415910132201745, -77, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7722157768785035062268620879564, -100, 103, 80, 'd') / result: (0, 920552941415910132201745, -77, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 920552941415910132201745, -77, 80), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, -1, 1), (1, 5917178219410479, -48, 53)), prec=80, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 5917178219410479, -48, 53), x=(0, 1, -1, 1), prec=80, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5917178219410479, -48, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5917178219410479, -48, 53), x=(0, 1, -1, 1), prec=80, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5917178219410479, -48, 53), t=(0, 1, -1, 1), prec=84, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5917178219410479, exp=-47, bc=53, prec=84, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5917178219410479, -47, 53, 84, 'd') / result: (0, 5917178219410479, -47, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5917178219410479, -47, 53, 84, 'd') / result: (0, 5917178219410479, -47, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 5917178219410479, -47, 53), prec=84, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 5917178219410479, -47, 53), prec=120, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=129495469296391199069588164211463834525 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=129495469296391199069588164211463834525, exp=-132, bc=127, prec=120, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 129495469296391199069588164211463834525, -132, 127, 120, 'd') / result: (0, 1011683353878056242731157532902061207, -125, 120)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 129495469296391199069588164211463834525, -132, 127, 120, 'd') / result: (0, 1011683353878056242731157532902061207, -125, 120)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1011683353878056242731157532902061207, -125, 120), prec=120 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=31615104808689257585348672903189412, prec=120 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=3, prec=120 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=119 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=8362779449448983678075894352243135564742656, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=1993477030585071344571090990819966976, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=1993477030585071344571090990819966976, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=51644997561738171793118383440060237486594115856584470256613187130812952440336823892592907065602756628718063439454949867520, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=51644997561738171793118383440060237486594115856584470256613187130812952440336823892592907065602756628718063439454949867520 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=2932250877823344031590164297300035005339451631471122489624666816482794516476673849503938045930594544997561542187873752242809079789063635013772122060431700669865372276397804789821409549608548428853293402360607355750420111902516795568074847901955747764935680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2932250877823344031590164297300035005339451631471122489624666816482794516476673849503938045930594544997561542187873752242809079789063635013772122060431700669865372276397804789821409549608548428853293402360607355750420111902516795568074847901955747764935680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=435, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=8362779449448983678075894352243135564742656, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=9413929113605522350681717820528704292477991030026380771328, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=9413929113605522350681717820528704292477991030026380771328, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=8362779449448983678075894352243135564742656, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=9413929113605522350681717820528377636417130829421108177080, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=120, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2056337308031906062779352217502914422, exp=-120, prec=84, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2056337308031906062779352217502914422 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2056337308031906062779352217502914422, exp=-120, bc=121, prec=84, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2056337308031906062779352217502914422, -120, 121, 84, 'd') / result: (0, 14961823093704195800669201, -83, 84)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2056337308031906062779352217502914422, -120, 121, 84, 'd') / result: (0, 14961823093704195800669201, -83, 84)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 14961823093704195800669201, -83, 84), prec=80, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=14961823093704195800669201, exp=-83, bc=84, prec=80, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 14961823093704195800669201, -83, 84, 80, 'd') / result: (0, 935113943356512237541825, -79, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 14961823093704195800669201, -83, 84, 80, 'd') / result: (0, 935113943356512237541825, -79, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 935113943356512237541825, -79, 80), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 920552941415910132201745, -78, 80), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 935113943356512237541825, -79, 80), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-38809425890011104384567671, exp=-80, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=38809425890011104384567671 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-51988726143243929034987179, exp=-80, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=51988726143243929034987179 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 38809425890011104384567671, -80, 86), (1, 51988726143243929034987179, -80, 86)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 38809425890011104384567671, -80, 86), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1122772868111238198179, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3798763703707661963889, exp=-118, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3798763703707661963889 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3798763703707661963889, exp=-118, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3798763703707661963889, -118, 72, 57, 'n') / result: (0, 57964534053156463, -102, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3798763703707661963889, -118, 72, 57, 'n') / result: (0, 57964534053156463, -102, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 51988726143243929034987179, -80, 86), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=51988726143243929034987179, exp=-80, mag=6, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=92, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=91695071891629848876706075, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=1559678926364492788152175179889819172095142298868851001749718251350551163698172081556305793381203250187285515871539485999104, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1559678926364492788152175179889819172095142298868851001749718251350551163698172081556305793381203250187285515871539485999104 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=2494059710569899177757264893113639159148559757578731581917293564470659147002191851504959953495788016688212038127368339969119213220525262505733496419592786943776858807052479299668725959781098748588506837211371462757420352515710506634801793594959844015511041267648151 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2494059710569899177757264893113639159148559757578731581917293564470659147002191851504959953495788016688212038127368339969119213220525262505733496419592786943776858807052479299668725959781098748588506837211371462757420352515710506634801793594959844015511041267648151 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=86422293092688834610498142, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=86422293092688834610498142 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=86422293092688834610498142, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 86422293092688834610498142, -87, 87, 57, 'n') / result: (0, 80487032507256451, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 86422293092688834610498142, -87, 87, 57, 'n') / result: (0, 80487032507256451, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=128360547220050838945714204, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=128360547220050838945714204 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=128360547220050838945714204, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 128360547220050838945714204, -87, 87, 57, 'n') / result: (0, 119545075316029451, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 128360547220050838945714204, -87, 87, 57, 'n') / result: (0, 119545075316029451, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 57964534053156463, -102, 56), t=(0, 80487032507256451, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4665393336604377766160608769092813, exp=-159, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4665393336604377766160608769092813, -159, 112, 53, 'n') / result: (0, 2023291836418345, -98, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4665393336604377766160608769092813, -159, 112, 53, 'n') / result: (0, 2023291836418345, -98, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 57964534053156463, -102, 56), t=(0, 119545075316029451, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=6929374589043143230359566818991813, exp=-159, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 6929374589043143230359566818991813, -159, 113, 53, 'n') / result: (0, 1502568596681285, -97, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 6929374589043143230359566818991813, -159, 113, 53, 'n') / result: (0, 1502568596681285, -97, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 2023291836418345, -98, 51), (0, 1502568596681285, -97, 51)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (6.38438331841304e-15 + 9.48254098667731e-15j) / count: 164
gamma__ / s: Complex { re: 0.5, im: -21.02204 } / result: Complex { re: 6.384383318413036e-15, im: 9.482540986677311e-15 }
zeta__ / s: Complex { re: 0.5, im: 21.02204 } / result: Complex { re: 8.984836054354555e-8, im: 4.007090847649033e-7 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.5, 25.010857) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5+25.010857j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5+25.010857j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5+25.010857j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=25.010857, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7039930391588548, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7039930391588548 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7039930391588548, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7039930391588548, -48, 53, 53, 'd') / result: (0, 1759982597897137, -46, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7039930391588548, -48, 53, 53, 'd') / result: (0, 1759982597897137, -46, 51)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 1759982597897137, -46, 51)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='25.010857000000001') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 1759982597897137, -46, 51)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1759982597897137, -46, 51), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1759982597897137, -46, 51), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1759982597897137, -46, 51), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=461368878143147081728, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=250108570000000014488, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=250108570000000014488, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+25.010857j) / result: (0.5 + 25.010857j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+25.010857j) / result: (0.5 + 25.010857j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (0, 1759982597897137, -46, 51)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 1759982597897137, -46, 51)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 1759982597897137, -46, 51), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1759982597897137, -46, 51), t=(0, 1759982597897137, -46, 51), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 3097538744900755424054432796769, -92, 102), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3098776684940040804329331920993 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3098776684940040804329331920993, exp=-92, bc=102, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3098776684940040804329331920993, -92, 102, 14, 'd') / result: (0, 2503, -2, 12)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3098776684940040804329331920993, -92, 102, 14, 'd') / result: (0, 2503, -2, 12)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 2503, -2, 12), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=10252288 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=10252288 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=10252288 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3201, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3201 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3201, exp=-7, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3201, -7, 12, 10, 'd') / result: (0, 25, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3201, -7, 12, 10, 'd') / result: (0, 25, 0, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 25, 0, 5), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 25, 0, 5), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (0, 1759982597897137, -46, 51)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 1759982597897137, -46, 51), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 1759982597897137, -46, 51), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1759982597897137, -46, 51), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1759982597897137, exp=-46, bc=51, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1759982597897137, -46, 51, 73, 'd') / result: (1, 1759982597897137, -46, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1759982597897137, -46, 51, 73, 'd') / result: (1, 1759982597897137, -46, 51)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 1759982597897137, -46, 51)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 1759982597897137, -46, 51), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1759982597897137, -46, 51), t=(1, 1759982597897137, -46, 51), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 3097538744900755424054432796769, -92, 102), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3098776684940040804329331920993 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3098776684940040804329331920993, exp=-92, bc=102, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3098776684940040804329331920993, -92, 102, 14, 'd') / result: (0, 2503, -2, 12)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3098776684940040804329331920993, -92, 102, 14, 'd') / result: (0, 2503, -2, 12)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 2503, -2, 12), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=10252288 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=10252288 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=10252288 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3201, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3201 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3201, exp=-7, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3201, -7, 12, 10, 'd') / result: (0, 25, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3201, -7, 12, 10, 'd') / result: (0, 25, 0, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1759982597897137, -46, 51), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=55 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 55 / result: [1, 6051, 6104451, 2462539971, 531648934851, 71301509476803, 6504925195108803, 429144511928164803, 21392068013887742403, 832780518854440804803, 25977281563850106233283, 662753606729324750201283, 14062742362385399866745283, 251634235316509414702211523, 3841603462178827861104812483, 50535961819850087101900022211, 577730330374203014014104003011, 5782012706584553297863989289411, 50984922488525881477588707205571, 398333597655022403279683908035011, 2770992240330783259897072664469955, 17238422988353715312442126057365955, 96274027751337344115352100618133955, 484350301573059857715727453968687555, 2201794236784087151947175826243477955, 9068765987529892610841571032285864387, 33926582279822401059328069515697217987, 115535262182820447663793177744255246787, 358877507711760077538925500462137369027, 1018683886695854101193095537014797787587, 2646951832121008166346437186541363159491, 6306464665572570713623910486640730071491, 13799752848354341643763498672558481367491, 27780237373991939435100856211039992177091, 51543378762608611361377523633779417047491, 88324588911945720951614452340280439890371, 140129110249040241501243929391690331218371, 206452706984942815385219764876242498642371, 283527707823296964404071683165658912154051, 364683602811933600833512164561308162744771, 441935796522635816776473230396154031661507, 508231717051242054487234759342047053767107, 559351463001010719709990637083458540691907, 594624787018881191308291683229515933311427, 616297424973434835299724300924272199623107, 628083443816135918099559567176252011864515, 633714604276098212796088600263676671320515, 636056734158553360761837806887547188568515, 636894970116484676875895417679248215794115, 637149280289288581322870186196318041432515, 637213397278310656625865036925470191411651, 637226467136294189739463288384528579584451, 637228536449134002301138291602841035366851, 637228775173095037281299181461988671775171, 637228793021615488494769154535569803469251, 637228793670652595811622608101881844621763]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 55 / result: [1, 6051, 6104451, 2462539971, 531648934851, 71301509476803, 6504925195108803, 429144511928164803, 21392068013887742403, 832780518854440804803, 25977281563850106233283, 662753606729324750201283, 14062742362385399866745283, 251634235316509414702211523, 3841603462178827861104812483, 50535961819850087101900022211, 577730330374203014014104003011, 5782012706584553297863989289411, 50984922488525881477588707205571, 398333597655022403279683908035011, 2770992240330783259897072664469955, 17238422988353715312442126057365955, 96274027751337344115352100618133955, 484350301573059857715727453968687555, 2201794236784087151947175826243477955, 9068765987529892610841571032285864387, 33926582279822401059328069515697217987, 115535262182820447663793177744255246787, 358877507711760077538925500462137369027, 1018683886695854101193095537014797787587, 2646951832121008166346437186541363159491, 6306464665572570713623910486640730071491, 13799752848354341643763498672558481367491, 27780237373991939435100856211039992177091, 51543378762608611361377523633779417047491, 88324588911945720951614452340280439890371, 140129110249040241501243929391690331218371, 206452706984942815385219764876242498642371, 283527707823296964404071683165658912154051, 364683602811933600833512164561308162744771, 441935796522635816776473230396154031661507, 508231717051242054487234759342047053767107, 559351463001010719709990637083458540691907, 594624787018881191308291683229515933311427, 616297424973434835299724300924272199623107, 628083443816135918099559567176252011864515, 633714604276098212796088600263676671320515, 636056734158553360761837806887547188568515, 636894970116484676875895417679248215794115, 637149280289288581322870186196318041432515, 637213397278310656625865036925470191411651, 637226467136294189739463288384528579584451, 637228536449134002301138291602841035366851, 637228775173095037281299181461988671775171, 637228793021615488494769154535569803469251, 637228793670652595811622608101881844621763]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1759982597897137, -46, 51), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=178405961588244985132285746181186892047843328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-163735826986510016129178, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14293195215193354845258, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3997322811278534496787362878260662381462384567299637997861860683924922518882070169286691006877653363062778110213813119746048, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3997322811278534496787362878260662381462384567299637997861860683924922518882070169286691006877653363062778110213813119746048 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128528526060750129826929580372927171929797391850725557237014777413012633254863732037914969619614081044250535011084414036844293158915865414235615629306069040551726653018237998731414456826261186780486052687626854339527817291822848080770575443717907489755653074434714895 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128528526060750129826929580372927171929797391850725557237014777413012633254863732037914969619614081044250535011084414036844293158915865414235615629306069040551726653018237998731414456826261186780486052687626854339527817291822848080770575443717907489755653074434714895 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=267608942382367477698428619271780338071764992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-259515145798185485195930, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7528387504369571265724, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=356811923176489970264571492362373784095686656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-327471653973020032258381, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13750638580244762109288, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3842387818593319981408007727940481669002602219729884587092021122532483661561059697608912285680845093176623919895448270143488, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3842387818593319981408007727940481669002602219729884587092021122532483661561059697608912285680845093176623919895448270143488 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=127200483306278410437392628028079116521157840480236212236641183886391056107444734045696392736614197618922363313265100448344290928214909066244138501098594287553073036957984609046079673604337935558137202100642186359891763279721548876979682320409213077816340560289455127 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=127200483306278410437392628028079116521157840480236212236641183886391056107444734045696392736614197618922363313265100448344290928214909066244138501098594287553073036957984609046079673604337935558137202100642186359891763279721548876979682320409213077816340560289455127 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=446014903970612462830714365452967230119608320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-380182816819593973327991, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5546731284096663783287, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1549349926852145153793551503201807124597823475697534107698395613924388573210104716777787211968082698861541903183648496025600, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1549349926852145153793551503201807124597823475697534107698395613924388573210104716777787211968082698861541903183648496025600 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2464995905698815492080257517578025082211511420338333957400243519430891631612603411529895275168637335120254196446827673710691235939878718458194408287971984867359475791182172863632273025390261142487719224625766384497675123546699130424350547812816372618666613580373687 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2464995905698815492080257517578025082211511420338333957400243519430891631612603411529895275168637335120254196446827673710691235939878718458194408287971984867359475791182172863632273025390261142487719224625766384497675123546699130424350547812816372618666613580373687 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=535217884764734955396857238543560676143529984 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-423250972784695501325108, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6985830869420978529779, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1952180907833702893779874894034276976993257579378892975699978473544729602244731943140011887079784200565542798011397104992256, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1952180907833702893779874894034276976993257579378892975699978473544729602244731943140011887079784200565542798011397104992256 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3651313494575526501374259722398326922481050598141752423064419591062392095511977554937868293007042968079408413831913192616693734317111376724063792844146193495054624088096317345532606807246195722664983253762594018227029995222776675939969191737834168830860446505566076 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3651313494575526501374259722398326922481050598141752423064419591062392095511977554937868293007042968079408413831913192616693734317111376724063792844146193495054624088096317345532606807246195722664983253762594018227029995222776675939969191737834168830860446505566076 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=624420865558857447963000111634154122167451648 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-459664579807751177552429, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=243727546649197464864, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=713623846352979940529142984724747568191373312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-491207480959530048387584, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13208081945296169373318, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=802826827147102433095285857815341014215294976 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-519030291596370970391860, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=221023158597194950245, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=892029807941224925661428730905934460239216640 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-543918643806103989457194, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5004174649148071047317, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1394414934166930638414196352881626412138041128127780696928556052531949715889094245100008490771274428975387712865283646423040, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1394414934166930638414196352881626412138041128127780696928556052531949715889094245100008490771274428975387712865283646423040 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2041484205495685452533974683005572584892285105224967349637674385540953525490597461379259086743077539231012868857247076058354711742779621034104621576516572568043331233554557108706096004092846596468401455718614086644048172335854882821021658221069114710306359179043135 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2041484205495685452533974683005572584892285105224967349637674385540953525490597461379259086743077539231012868857247076058354711742779621034104621576516572568043331233554557108706096004092846596468401455718614086644048172335854882821021658221069114710306359179043135 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=981232788735347418227571603996527906263138304 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-566432896980858802551067, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12161425174677153115850, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3398240839562371703987189630355963626617892823363258142885147713207492270574163012132613284916661386169648574316135701282816, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3398240839562371703987189630355963626617892823363258142885147713207492270574163012132613284916661386169648574316135701282816 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=118737902291978198949315817925706897320884765187094529029546374039768884203729859706405498659843946293529013104123571369546186340387101656807753635777873920816875835597412669409884325121484129743319940191051959863682412948174921931695109831933650040227072382553800220 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=118737902291978198949315817925706897320884765187094529029546374039768884203729859706405498659843946293529013104123571369546186340387101656807753635777873920816875835597412669409884325121484129743319940191051959863682412948174921931695109831933650040227072382553800220 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1070435769529469910793714477087121352287059968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-586986799771205517454311, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6443274234472385793809, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1797245915148488378400519743714096264533475231809139564930138912152290744923721471462233165882975930679388607693032255389696, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1797245915148488378400519743714096264533475231809139564930138912152290744923721471462233165882975930679388607693032255389696 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3184753681395442904159148172360143627976688355819668411195610669958075337389569880210729210632892280632250699761757664903326362303429218092936299183673002189530583657234998381834428754864683826154354781998732403975719225932333895097696399588293164026005880593787151 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3184753681395442904159148172360143627976688355819668411195610669958075337389569880210729210632892280632250699761757664903326362303429218092936299183673002189530583657234998381834428754864683826154354781998732403975719225932333895097696399588293164026005880593787151 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1159638750323592403359857350177714798310981632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-605894557463559755453177, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2371268392260095376146, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=661055968790248598951915308032771039828404682964281219284648795274405791236311345825189210439715284847591212025023358304256, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=661055968790248598951915308032771039828404682964281219284648795274405791236311345825189210439715284847591212025023358304256 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=30838233503796989642676245739147954066765478740038583324579921142117214795209836568725075929412604421075023929567333101128904574026939070325441049701838788137053707243536738829912364848416510090944146949806681363284719811779461333660665236070126769905205489957135 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=30838233503796989642676245739147954066765478740038583324579921142117214795209836568725075929412604421075023929567333101128904574026939070325441049701838788137053707243536738829912364848416510090944146949806681363284719811779461333660665236070126769905205489957135 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=446, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1248841731117714895926000223268308244334903296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-623400406794261193681606, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14536922761842552310123, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4069625807864967937297728615076746713943616329498856256221119145908060652298541722736321076769497222342983399029050049560576, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4069625807864967937297728615076746713943616329498856256221119145908060652298541722736321076769497222342983399029050049560576 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128848314992743143546947160845721426089667076023813890858099981620566381826789200113329701591658432338012607051059133380480553667445197739763218213548281999225987489849007932557916681557179022993076127795734667597964400191103555190818511698674592203400016208456336112 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128848314992743143546947160845721426089667076023813890858099981620566381826789200113329701591658432338012607051059133380480553667445197739763218213548281999225987489849007932557916681557179022993076127795734667597964400191103555190818511698674592203400016208456336112 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1338044711911837388492143096358901690358824960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-639697962617779458523946, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13075118788466235048986, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3656465827371062562952781547556264814050863402646180494168213648861557032775847131595577820244675169313238891513410450620416, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3656465827371062562952781547556264814050863402646180494168213648861557032775847131595577820244675169313238891513410450620416 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=124473772961789542693346565424735160320392140547817467279319890908642131985914822567505093827683217619696052905649729002393396306435020929751818897241388394129990607868936759758605445019545133023105321500650520430406681942687880971688990697877916682751543175610392975 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=124473772961789542693346565424735160320392140547817467279319890908642131985914822567505093827683217619696052905649729002393396306435020929751818897241388394129990607868936759758605445019545133023105321500650520430406681942687880971688990697877916682751543175610392975 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1427247692705959881058285969449495136382746624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-654943307946040064516787, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12665525310347576637348, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3542846832735238585007921103988132291580356347761694659603664637173768537407106119031873424700349104730059151946609560911872, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3542846832735238585007921103988132291580356347761694659603664637173768537407106119031873424700349104730059151946609560911872 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=122220029356724178543890402551442291095079152696641938119413270184338845438885638934242198054362234034851866731766082055047600729917892130811909672138482263309740633808500735210035213864910973348985709688190644268041699665060751476030149728386282786661134419597340400 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=122220029356724178543890402551442291095079152696641938119413270184338845438885638934242198054362234034851866731766082055047600729917892130811909672138482263309740633808500735210035213864910973348985709688190644268041699665060751476030149728386282786661134419597340400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1516450673500082373624428842540088582406668288 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-669264108588754229240176, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13180476517775359495162, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3687452825908105466028652577620300956542819872160131176322181561140044804240049225931133564484036823290469729577083420540928, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3687452825908105466028652577620300956542819872160131176322181561140044804240049225931133564484036823290469729577083420540928 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125012215589616169129047439350188706347077343470506649052860341803702889049095535073737559466407674790245104480041262693881616032712800807155278755897213326315129381975055121597429116767706037159121709452245026426331708270265236383847658483568791995019977574710346791 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125012215589616169129047439350188706347077343470506649052860341803702889049095535073737559466407674790245104480041262693881616032712800807155278755897213326315129381975055121597429116767706037159121709452245026426331708270265236383847658483568791995019977574710346791 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1605653654294204866190571715630682028430589952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-682766118582880986521062, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14514218373790549795479, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1694856635088327358756714588721275474454511616 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-695537924392434615030777, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1742412564236921285764, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=485462977080338814855312804336566232373984689051894020412163959029641752939166144590373326416665912309949796330876528754688, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=485462977080338814855312804336566232373984689051894020412163959029641752939166144590373326416665912309949796330876528754688 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1049510941243011899708782018769446326008640547608376057086222054194542587981310742242506252110824527398856782242131042044844734127969626397469613842025589740913340731237764973101222827821727366098781345320484738918358701158069352043968625121705685319346942757852 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1049510941243011899708782018769446326008640547608376057086222054194542587981310742242506252110824527398856782242131042044844734127969626397469613842025589740913340731237764973101222827821727366098781345320484738918358701158069352043968625121705685319346942757852 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1784059615882449851322857461811868920478433280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-707654470792614005586397, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4461618014199478311347, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1239479941481716123034841202561445699678258780558027286158716491139510858568083773422229769574466159089233522546918796820480, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1239479941481716123034841202561445699678258780558027286158716491139510858568083773422229769574466159089233522546918796820480 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=102828572495449867091295800140396501089501930560221170770310348356607579188169353382936858500698912146900461306859018428844892255742424073008223407796059451173692424470899963272703602505030006921664778852080510767853866310956435308074643244819397371468766516499111 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=102828572495449867091295800140396501089501930560221170770310348356607579188169353382936858500698912146900461306859018428844892255742424073008223407796059451173692424470899963272703602505030006921664778852080510767853866310956435308074643244819397371468766516499111 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1873262596676572343889000334902462366502354944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-719179725605936662748358, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7772115051018768730589, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2169089897593003215310972104482529974436952865976547750777753859494144002494146603488902096755315778406158664457107894435840, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2169089897593003215310972104482529974436952865976547750777753859494144002494146603488902096755315778406158664457107894435840 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4311787910361773909996404667941546608815450721895937528775402010530350020654224937952732133491925400558570679641017808484957101533211174333318378098863363505913178984456216894958130948461813006989814712161386071078987559723250031319464392578103119179333998226564092 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4311787910361773909996404667941546608815450721895937528775402010530350020654224937952732133491925400558570679641017808484957101533211174333318378098863363505913178984456216894958130948461813006989814712161386071078987559723250031319464392578103119179333998226564092 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1962465577470694836455143207993055812526276608 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-730168723967368818680245, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11618868539728560379905, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3243305846877157188607834480035782914158110475793504732115308151815053413253152540454834563719853116283494383997770851680256, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3243305846877157188607834480035782914158110475793504732115308151815053413253152540454834563719853116283494383997770851680256 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=114288867254612917811826704312363468649142917623115914944193497695720460105538940396830988700907473865903380226653528214264098764151106467693941992221520617940810317024396599078770258354969604191597990485569165625158453207493161265972613105014045143029310116785849200 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=114288867254612917811826704312363468649142917623115914944193497695720460105538940396830988700907473865903380226653528214264098764151106467693941992221520617940810317024396599078770258354969604191597990485569165625158453207493161265972613105014045143029310116785849200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2051668558264817329021286081083649258550198272 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-740669157799709883968930, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1118434707387495091220, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=309869985370429030758710300640361424919564695139506821539679122784877714642020943355557442393616539772308380636729699205120, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=309869985370429030758710300640361424919564695139506821539679122784877714642020943355557442393616539772308380636729699205120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=26903566834893162693934766180552882539204883648021672362705516655046745012010364532948743491167943574995026171791835001024442133386006293865228666485349882873843252190753687249336276979772447871852983809430577758327302580043687415232128087248804103748475591680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26903566834893162693934766180552882539204883648021672362705516655046745012010364532948743491167943574995026171791835001024442133386006293865228666485349882873843252190753687249336276979772447871852983809430577758327302580043687415232128087248804103748475591680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=441, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2140871539058939821587428954174242704574119936 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-750722626757715533583513, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5900717599523793057840, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2230074519853062314153571827264836150598041600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-760365633639187946656007, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11093462568193327566549, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3098699853704290307587103006403614249195646951395068215396791227848777146420209433555574423936165397723083806367296992051200, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3098699853704290307587103006403614249195646951395068215396791227848777146420209433555574423936165397723083806367296992051200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=109518749919556303121581747285590908436343924577850808564547178036039270031157495363538651925742629958981704686168434856827691958556114310943045713840192151765556190163334022836038671280422256481649022524123829789727230721066856535629184071767006792300818056793579255 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=109518749919556303121581747285590908436343924577850808564547178036039270031157495363538651925742629958981704686168434856827691958556114310943045713840192151765556190163334022836038671280422256481649022524123829789727230721066856535629184071767006792300818056793579255 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2319277500647184806719714700355429596621963264 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-769630384450069771582380, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1828711757311502640176, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=506120976105034083572560157712590327368622335394527808514809233881966933915300874147410489242907014961437021706658508701696, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=506120976105034083572560157712590327368622335394527808514809233881966933915300874147410489242907014961437021706658508701696 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1139615378511306542224539198338586647613085063154646680494152350616588470324302380146518468364770137355115937150384477893693718303290756489672318347568401308544091910129489785593279918788804543029394387306651634586474499243748208333361502501607109725154741808380 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1139615378511306542224539198338586647613085063154646680494152350616588470324302380146518468364770137355115937150384477893693718303290756489672318347568401308544091910129489785593279918788804543029394387306651634586474499243748208333361502501607109725154741808380 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2408480481441307299285857573446023042645884928 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-778545437394556455587789, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 1282251896705988486230930442438776, -108, 110, 88, 'd') / result: (0, 305712675262925263936741457, -86, 88)

[2]libmpf._normalize. / x: (0, 1288433389387681976710025743103290, -108, 110, 88, 'd') / result: (0, 307186457964821333100801883, -86, 88)

[2]libmpf._normalize. / x: (0, 1294499333357576653431345650430265, -108, 110, 88, 'd') / result: (0, 154316345853516656569402891, -85, 87)

[2]libmpf._normalize. / x: (0, 1300453969299057703421135530143822, -108, 111, 88, 'd') / result: (0, 155026193773634159972803059, -85, 88)

[2]libmpf._normalize. / x: (1, 7758785875918447, -73, 53, 73, 'd') / result: (1, 7758785875918447, -73, 53)

[2]libmpf._normalize. / x: (1, 10005139221257142, -73, 54, 73, 'd') / result: (1, 5002569610628571, -72, 53)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 11798409750458344186022574458252960735757, -129, 134, 83, 'd') / result: (1, 5239546463568320516134313, -78, 83)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (0, 9315926317700618578919147598400, -107, 103, 77, 'd') / result: (0, 138818119730064549728023, -81, 77)

[2]libmpf._normalize. / x: (0, 161991624579737052737306657537216, -107, 107, 77, 'd') / result: (0, 150866456869744744838501, -77, 77)

[3]libmpf._normalize1 / x: (0, 14833404023719496606850680452526058839013098041, -157, 154, 73, 'd') / result: (0, 3067476056646709664313, -75, 72)

[3]libmpf._normalize1 / x: (0, 16120828554136583202496170012854001702370813067, -153, 154, 73, 'd') / result: (0, 3333709209568259589331, -71, 72)

[3]libmpf._normalize1 / x: (0, 34711455806310452045255, -75, 75, 73, 'd') / result: (0, 8677863951577613011313, -73, 73)

[2]libmpf._normalize1 / x: (1, 3333709209568259589331, -71, 72, 73, 'd') / result: (1, 3333709209568259589331, -71, 72)

[3]libmpf._normalize1 / x: (0, 253123196265453906793273627093758260170424945, -146, 148, 63, 'd') / result: (0, 6543081266819950305, -61, 63)

[3]libmpf._normalize1 / x: (0, 66087210799027930678840847092606617097, -146, 126, 63, 'd') / result: (0, 1791297438045339295, -81, 61)

[3]libmpf._normalize1 / x: (1, 95142690348566257173512097415398601637, -145, 127, 63, 'd') / result: (1, 5157695578601558557, -81, 63)

[3]libmpf._normalize1 / x: (0, 631269963875401401, -81, 60, 53, 'n') / result: (0, 4931796592776573, -74, 53)

[3]libmpf._normalize1 / x: (1, 454405035204113571, -79, 59, 53, 'n') / result: (1, 7100078675064275, -73, 53)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (0, 1759982597897137, -46, 51)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 4931796592776573, -74, 53), (1, 7100078675064275, -73, 53))

zeta_ / result: (2.61087137702391e-7 - 7.51750070734638e-7j) / count: 682
zeta / count: 0 / s: Complex { re: 0.5, im: 25.010857 }
gamma_ / s: (0.5, -25.010857) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-25.010857j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-25.010857j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-25.010857, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7039930391588548, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7039930391588548 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7039930391588548, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7039930391588548, -48, 53, 53, 'd') / result: (1, 1759982597897137, -46, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7039930391588548, -48, 53, 53, 'd') / result: (1, 1759982597897137, -46, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 1759982597897137, -46, 51)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-25.010857000000001') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 1759982597897137, -46, 51)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1759982597897137, -46, 51), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1759982597897137, -46, 51), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1759982597897137, -46, 51), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1759982597897137, -46, 51), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=461368878143147081728, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=250108570000000014488, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=250108570000000014488, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-25.010857j) / result: (0.5 - 25.010857j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-25.010857j) / result: (0.5 - 25.010857j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 1759982597897137, -46, 51)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 1759982597897137, -46, 51)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 1759982597897137, -46, 51)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 1759982597897137, -46, 51), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=125 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 1759982597897137, -46, 51), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=604462909807314587353088, y=-30236270797989287148126208, prec=80 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=80, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, -1, 1), (1, 1759982597897137, -46, 51)), prec=80, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, -1, 1), b=(1, 1759982597897137, -46, 51), prec=80, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1759982597897137, -46, 51), t=(1, 1759982597897137, -46, 51), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 3097538744900755424054432796769, -92, 102), prec=100, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3098776684940040804329331920993 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3098776684940040804329331920993, exp=-92, bc=102, prec=100, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3098776684940040804329331920993, -92, 102, 100, 'd') / result: (0, 96836771404376275135291622531, -87, 97)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3098776684940040804329331920993, -92, 102, 100, 'd') / result: (0, 96836771404376275135291622531, -87, 97)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 96836771404376275135291622531, -87, 97), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=96682028899465602600929232003 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=96682028899465602600929232003, exp=-87, bc=97, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 96682028899465602600929232003, -87, 97, 10, 'd') / result: (0, 39, 4, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 96682028899465602600929232003, -87, 97, 10, 'd') / result: (0, 39, 4, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 96836771404376275135291622531, -87, 97), prec=80, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=96836771404376275135291622531, n=3 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=774694171235010201082332980248, prec=100 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8162427053410834428348664765810, exp=-100, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8162427053410834428348664765810 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8162427053410834428348664765810, exp=-100, bc=103, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8162427053410834428348664765810, -100, 103, 80, 'd') / result: (0, 973037130047182372611601, -77, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8162427053410834428348664765810, -100, 103, 80, 'd') / result: (0, 973037130047182372611601, -77, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 973037130047182372611601, -77, 80), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, -1, 1), (1, 1759982597897137, -46, 51)), prec=80, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 1759982597897137, -46, 51), x=(0, 1, -1, 1), prec=80, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1759982597897137, -46, 51), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 1759982597897137, -46, 51), x=(0, 1, -1, 1), prec=80, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 1759982597897137, -46, 51), t=(0, 1, -1, 1), prec=84, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1759982597897137, exp=-45, bc=51, prec=84, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1759982597897137, -45, 51, 84, 'd') / result: (0, 1759982597897137, -45, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1759982597897137, -45, 51, 84, 'd') / result: (0, 1759982597897137, -45, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 1759982597897137, -45, 51), prec=84, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 1759982597897137, -45, 51), prec=120, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=108843089037992882451505034859099107043 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=108843089037992882451505034859099107043, exp=-132, bc=127, prec=120, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 108843089037992882451505034859099107043, -132, 127, 120, 'd') / result: (0, 850336633109319394152383084836711773, -125, 120)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 108843089037992882451505034859099107043, -132, 127, 120, 'd') / result: (0, 850336633109319394152383084836711773, -125, 120)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 850336633109319394152383084836711773, -125, 120), prec=120 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=26573019784666231067261971401147242, prec=120 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=2, prec=120 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=119 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=5575186299632655785383929568162090376495104, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=1329119838776543333605051485592223744, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=1329119838776543333605051485592223744, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=30986998537042903075871030064036142491956469513950682153967912278487771464202094335555744239361653977230838063672969920512, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=30986998537042903075871030064036142491956469513950682153967912278487771464202094335555744239361653977230838063672969920512 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=16891139628563275610607505878559393308687008204201577160831661849766742873585357798496436296548995546274570192384073302136873581841969249367942053716476363552824851946163761770613689948251847223781526980558258162507130766825012611163181366327727872362511516 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=16891139628563275610607505878559393308687008204201577160831661849766742873585357798496436296548995546274570192384073302136873581841969249367942053716476363552824851946163761770613689948251847223781526980558258162507130766825012611163181366327727872362511516 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=436, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=5575186299632655785383929568162090376495104, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=6276590978355562654495739995582376278076606877684463566848, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=6276590978355562654495739995582376278076606877684463566848, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=5575186299632655785383929568162090376495104, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=6276590978355562654495739995581924089204578495522598220903, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=120, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2061376972612542941635794290724859944, exp=-120, prec=84, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2061376972612542941635794290724859944 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2061376972612542941635794290724859944, exp=-120, bc=121, prec=84, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2061376972612542941635794290724859944, -120, 121, 84, 'd') / result: (0, 14998491479582611221382061, -83, 84)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2061376972612542941635794290724859944, -120, 121, 84, 'd') / result: (0, 14998491479582611221382061, -83, 84)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 14998491479582611221382061, -83, 84), prec=80, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=14998491479582611221382061, exp=-83, bc=84, prec=80, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 14998491479582611221382061, -83, 84, 80, 'd') / result: (0, 468702858736956600668189, -78, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 14998491479582611221382061, -83, 84, 80, 'd') / result: (0, 468702858736956600668189, -78, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 468702858736956600668189, -78, 79), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 973037130047182372611601, -78, 80), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 468702858736956600668189, -78, 79), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-46384094586027445753866990, exp=-80, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=46384094586027445753866990 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-67105672654697923409601956, exp=-80, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=67105672654697923409601956 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 23192047293013722876933495, -79, 85), (1, 16776418163674480852400489, -78, 84)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 23192047293013722876933495, -79, 85), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1058325630477780781343, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3696480703711625452304, exp=-127, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3696480703711625452304 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3696480703711625452304, exp=-127, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3696480703711625452304, -127, 72, 57, 'n') / result: (0, 112807638663074507, -112, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3696480703711625452304, -127, 72, 57, 'n') / result: (0, 112807638663074507, -112, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 16776418163674480852400489, -78, 84), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=16776418163674480852400489, exp=-78, mag=6, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=92, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=82112558855935775463944839, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=78312924373885880125111190, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=78312924373885880125111190 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=78312924373885880125111190, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 78312924373885880125111190, -87, 87, 57, 'n') / result: (0, 72934594353554659, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 78312924373885880125111190, -87, 87, 57, 'n') / result: (0, 72934594353554659, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=133462836407891257742572456, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=133462836407891257742572456 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=133462836407891257742572456, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 133462836407891257742572456, -87, 87, 57, 'n') / result: (0, 124296952418881709, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 133462836407891257742572456, -87, 87, 57, 'n') / result: (0, 124296952418881709, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 112807638663074507, -112, 57), t=(0, 72934594353554659, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=8227579365873708179913681213978113, exp=-169, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 8227579365873708179913681213978113, -169, 113, 53, 'n') / result: (0, 7136287538221747, -109, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 8227579365873708179913681213978113, -169, 113, 53, 'n') / result: (0, 7136287538221747, -109, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 112807638663074507, -112, 57), t=(0, 124296952418881709, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=14021645695390572640445788686492463, exp=-169, bc=114, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 14021645695390572640445788686492463, -169, 114, 53, 'n') / result: (0, 47507183514889, -101, 46)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 14021645695390572640445788686492463, -169, 114, 53, 'n') / result: (0, 47507183514889, -101, 46)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 7136287538221747, -109, 53), (0, 47507183514889, -101, 46)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (1.0995191889295e-17 + 1.8738279896028e-17j) / count: 150
gamma__ / s: Complex { re: 0.5, im: -25.010857 } / result: Complex { re: 1.0995191889294987e-17, im: 1.8738279896028033e-17 }
zeta__ / s: Complex { re: 0.5, im: 25.010857 } / result: Complex { re: 2.6108713770239107e-7, im: -7.517500707346376e-7 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.5, 30.424876) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5+30.424876j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5+30.424876j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5+30.424876j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=30.424876, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8563841263524597, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8563841263524597 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8563841263524597, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8563841263524597, -48, 53, 53, 'd') / result: (0, 8563841263524597, -48, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8563841263524597, -48, 53, 53, 'd') / result: (0, 8563841263524597, -48, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 8563841263524597, -48, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='30.424876000000001') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 8563841263524597, -48, 53)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 8563841263524597, -48, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 8563841263524597, -48, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 8563841263524597, -48, 53), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=561239901046347988992, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=304248760000000011416, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=304248760000000011416, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+30.424876j) / result: (0.5 + 30.424876j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+30.424876j) / result: (0.5 + 30.424876j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (0, 8563841263524597, -48, 53)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 8563841263524597, -48, 53)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 8563841263524597, -48, 53), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 8563841263524597, -48, 53), t=(0, 8563841263524597, -48, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 73339377186846566039367224012409, -96, 106), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=73359184227475132123765609999993 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=73359184227475132123765609999993, exp=-96, bc=106, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 73359184227475132123765609999993, -96, 106, 14, 'd') / result: (0, 7407, -3, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 73359184227475132123765609999993, -96, 106, 14, 'd') / result: (0, 7407, -3, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 7407, -3, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=15169536 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=15169536 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=15169536 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3894, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3894 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3894, exp=-7, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3894, -7, 12, 10, 'd') / result: (0, 973, -5, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3894, -7, 12, 10, 'd') / result: (0, 973, -5, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 973, -5, 10), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 973, -5, 10), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (0, 8563841263524597, -48, 53)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 8563841263524597, -48, 53), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 8563841263524597, -48, 53), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 8563841263524597, -48, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=8563841263524597, exp=-48, bc=53, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 8563841263524597, -48, 53, 73, 'd') / result: (1, 8563841263524597, -48, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 8563841263524597, -48, 53, 73, 'd') / result: (1, 8563841263524597, -48, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 8563841263524597, -48, 53)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 8563841263524597, -48, 53), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 8563841263524597, -48, 53), t=(1, 8563841263524597, -48, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 73339377186846566039367224012409, -96, 106), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=73359184227475132123765609999993 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=73359184227475132123765609999993, exp=-96, bc=106, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 73359184227475132123765609999993, -96, 106, 14, 'd') / result: (0, 7407, -3, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 73359184227475132123765609999993, -96, 106, 14, 'd') / result: (0, 7407, -3, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 7407, -3, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=15169536 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=15169536 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=15169536 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3894, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3894 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3894, exp=-7, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3894, -7, 12, 10, 'd') / result: (0, 973, -5, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3894, -7, 12, 10, 'd') / result: (0, 973, -5, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 8563841263524597, -48, 53), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=60 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 60 / result: [1, 7201, 8644801, 4150086081, 1066429774401, 170275781016129, 18501288832203329, 1454363497940580929, 86433475240338061889, 4014356862444488292929, 149512908436880326851137, 4558559925844026949827137, 115711274226999556669635137, 2479673001148805776433674817, 45393708371882758898181929537, 717023025162587937870278752833, 9857139735519966885575225440833, 118821668360956955124881256544833, 1264159935912772409284697983482433, 11938777758102665518324696838240833, 100592847312136162390582533480708673, 759577801023883409756959019557124673, 5160705641986694307072779991048452673, 31661023231242962434678766748859038273, 175956192232317429491200017339703556673, 888362055186193655415967791685358778945, 4085055029979228002514284727851760417345, 17148828975883955369272466029529689684545, 65858043259900153122470827740071683095105, 231817084305017652061377768546951602567745, 749196738817423504685608559152806628358721, 2226642605748672369926669515933143560813121, 6094677965700622524064724937503886779808321, 15385175949137660843001443600409466763147841, 35866686428865846285363252698351443355040321, 77321602878104508994375477489548288730266177, 154360277813113760898838727786177794024602177, 285790938346443132530000022627669375067290177, 491560625118273187343418162130383562650614337, 787024790739362496819095490647101370462566977, 1175803271958504695806394962790301574539180609, 1644070036450094215815186859379521934763948609, 2159620191963209699978624409324854046795692609, 2677568255176386186393984924618769098883398209, 3151406843831700725429144936259127121979308609, 3545148372681859723159235452798231117201078849, 3841442165294855624461143032133677267451574849, 4042631819029783978399386385020340313423542849, 4165375156023330180297674325312159741909072449, 4232311981078510435993100864600271662513846849, 4264739154105242204307774165855401437384604225, 4278588849437956219118933409256932306092751425, 4283755333992616899027950617680430938594409025, 4285419007006444740608715907436928611450288705, 4285874515955540560162328003040040296887810625, 4285978458614817137501667677232710319519758913, 4285997688675654985625902012065652810836802113, 4286000459285258699809924595938494082680027713, 4286000750884650275125844214211167931680619073, 4286000770823070211899582307768273835885787713, 4286000771487684209792040244220177366025960001]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 60 / result: [1, 7201, 8644801, 4150086081, 1066429774401, 170275781016129, 18501288832203329, 1454363497940580929, 86433475240338061889, 4014356862444488292929, 149512908436880326851137, 4558559925844026949827137, 115711274226999556669635137, 2479673001148805776433674817, 45393708371882758898181929537, 717023025162587937870278752833, 9857139735519966885575225440833, 118821668360956955124881256544833, 1264159935912772409284697983482433, 11938777758102665518324696838240833, 100592847312136162390582533480708673, 759577801023883409756959019557124673, 5160705641986694307072779991048452673, 31661023231242962434678766748859038273, 175956192232317429491200017339703556673, 888362055186193655415967791685358778945, 4085055029979228002514284727851760417345, 17148828975883955369272466029529689684545, 65858043259900153122470827740071683095105, 231817084305017652061377768546951602567745, 749196738817423504685608559152806628358721, 2226642605748672369926669515933143560813121, 6094677965700622524064724937503886779808321, 15385175949137660843001443600409466763147841, 35866686428865846285363252698351443355040321, 77321602878104508994375477489548288730266177, 154360277813113760898838727786177794024602177, 285790938346443132530000022627669375067290177, 491560625118273187343418162130383562650614337, 787024790739362496819095490647101370462566977, 1175803271958504695806394962790301574539180609, 1644070036450094215815186859379521934763948609, 2159620191963209699978624409324854046795692609, 2677568255176386186393984924618769098883398209, 3151406843831700725429144936259127121979308609, 3545148372681859723159235452798231117201078849, 3841442165294855624461143032133677267451574849, 4042631819029783978399386385020340313423542849, 4165375156023330180297674325312159741909072449, 4232311981078510435993100864600271662513846849, 4264739154105242204307774165855401437384604225, 4278588849437956219118933409256932306092751425, 4283755333992616899027950617680430938594409025, 4285419007006444740608715907436928611450288705, 4285874515955540560162328003040040296887810625, 4285978458614817137501667677232710319519758913, 4285997688675654985625902012065652810836802113, 4286000459285258699809924595938494082680027713, 4286000750884650275125844214211167931680619073, 4286000770823070211899582307768273835885787713, 4286000771487684209792040244220177366025960001]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 8563841263524597, -48, 53), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=178405961588244985132285746181186892047843328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-199179189774345629653568, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8521336127641636483274, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2375669887839955902483445638242770924383329329402885631804206608017395812255493899059273725017726804921030918214927693905920, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2375669887839955902483445638242770924383329329402885631804206608017395812255493899059273725017726804921030918214927693905920 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4934050192488393180860560550803610462211582033559273686194576876389074099693505243110315297064412857777039168326826849662912502824876974688430168496628969709918724932340751331299259891037613074009685690680417546030833935891760826033858026115911520639846185636027095 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4934050192488393180860560550803610462211582033559273686194576876389074099693505243110315297064412857777039168326826849662912502824876974688430168496628969709918724932340751331299259891037613074009685690680417546030833935891760826033858026115911520639846185636027095 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=267608942382367477698428619271780338071764992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-315691546716360588962541, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10694993986762257823925, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2985080859068466329642242562835481726725139896510582380832242216160988651051468420991870028391839333139904066800496102342656, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2985080859068466329642242562835481726725139896510582380832242216160988651051468420991870028391839333139904066800496102342656 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=105390185879644325351155683506915385534516600324571191761046765708153899583182747996283760394896956292424857356037256091886613517264319781515263982801929420325999144366223168288516874352086056346865609762448372893746905089311029827971388955194085817338566397290034767 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=105390185879644325351155683506915385534516600324571191761046765708153899583182747996283760394896956292424857356037256091886613517264319781515263982801929420325999144366223168288516874352086056346865609762448372893746905089311029827971388955194085817338566397290034767 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=356811923176489970264571492362373784095686656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-398358379548691259307166, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2206920405141325385315, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=609410971228510427158796924592710802341810567107696749028035608143592838795974521932596303374112528218873148585568408436736, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=609410971228510427158796924592710802341810567107696749028035608143592838795974521932596303374112528218873148585568408436736 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1643150507677080388488016154002256060016814675640601693371040280355211503380068128470170517135885779862346180263585064237693960230046123270382657518525701256747245172018318393145503768200528835380158553089037389887228886774487997979866819022035614704501094799296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1643150507677080388488016154002256060016814675640601693371040280355211503380068128470170517135885779862346180263585064237693960230046123270382657518525701256747245172018318393145503768200528835380158553089037389887228886774487997979866819022035614704501094799296 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=446014903970612462830714365452967230119608320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-462479756653954751443836, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12264302550587571154660, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3429227838099414607063060660419999769109849292877208825039115625485980042038365106468169029156023040146879412379808671203328, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3429227838099414607063060660419999769109849292877208825039115625485980042038365106468169029156023040146879412379808671203328 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=119540190353477454120216469152278921738154915756523661389899886774301964492092709110467855172665394525414347500317231608451433702566984994295638653820306512504501566347087575866505789594796144515425713847101966966028003990909047352750267649497074136866175713079439695 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=119540190353477454120216469152278921738154915756523661389899886774301964492092709110467855172665394525414347500317231608451433702566984994295638653820306512504501566347087575866505789594796144515425713847101966966028003990909047352750267649497074136866175713079439695 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=535217884764734955396857238543560676143529984 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-514870736490706218616108, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4380578264261946725997, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1218821942457020854317593849185421604683621134215393498056071216287185677591949043865192606748225056437746297171136816873472, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1218821942457020854317593849185421604683621134215393498056071216287185677591949043865192606748225056437746297171136816873472 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=99674083056104300031923540923288252112649772787218961483605442550353897034148961000550153043256403068663103181427711071466899202373168398193603694872733988197020654376228609758315609285405383044461477636691802971157862263381924820809726163149511908691041458994112 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=99674083056104300031923540923288252112649772787218961483605442550353897034148961000550153043256403068663103181427711071466899202373168398193603694872733988197020654376228609758315609285405383044461477636691802971157862263381924820809726163149511908691041458994112 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=624420865558857447963000111634154122167451648 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-559166678784454812185159, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4591891520939195900555, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1280795939531106660469335909313493889667534073243294862364007040844161220520353232536304095226948364392207973298482756714496, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1280795939531106660469335909313493889667534073243294862364007040844161220520353232536304095226948364392207973298482756714496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=109245960981413369464956840325470339557531373777803890214208500301394051724441346340929120111858729548109607941820616291513787365652143742933790422572051875416537346269268438584487083707989204572567573771664618615816516590101067565922148616957623188137782971079687 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=109245960981413369464956840325470339557531373777803890214208500301394051724441346340929120111858729548109607941820616291513787365652143742933790422572051875416537346269268438584487083707989204572567573771664618615816516590101067565922148616957623188137782971079687 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=713623846352979940529142984724747568191373312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-597537569323036888960763, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10728256532782961868560, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=802826827147102433095285857815341014215294976 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-631383093432721177925081, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6554236123382568066648, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1828232913685531281476390773778132407025431701323090247084106824430778516387923565797788910122337584656619445756705225310208, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1828232913685531281476390773778132407025431701323090247084106824430778516387923565797788910122337584656619445756705225310208 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3277340524529908773902204461785111341798775995104956374484690326797875579168457810296274965450528826023962590556871795516239703924000737095849781674551940864240432858655132373902315550475433098901056643236119982003998576913986737748266067655560646963764601683839055 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3277340524529908773902204461785111341798775995104956374484690326797875579168457810296274965450528826023962590556871795516239703924000737095849781674551940864240432858655132373902315550475433098901056643236119982003998576913986737748266067655560646963764601683839055 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=892029807941224925661428730905934460239216640 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-661658946428300381097433, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5949886828087260056702, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=981232788735347418227571603996527906263138304 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-689046786879929907618949, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8233550076741628697592, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2303366891253522461973079901426686591902097567203667373444948146034257678839022345609643655125882945640825629399690764091392, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2303366891253522461973079901426686591902097567203667373444948146034257678839022345609643655125882945640825629399690764091392 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4717993995066976620307122845629062524623058290628595802056166910455993936871101815461431314658628530682603309147656897637636912710196901157205378786428350482727330224875703151261483972160346111915039477910277547187229671459077769368525324241588033713175581500839951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4717993995066976620307122845629062524623058290628595802056166910455993936871101815461431314658628530682603309147656897637636912710196901157205378786428350482727330224875703151261483972160346111915039477910277547187229671459077769368525324241588033713175581500839951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1070435769529469910793714477087121352287059968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-714049926265051848269706, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12901914391903583209241, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3604820829809324391159663164116204576564269286789596023911600461730744080335510307702984913179072412684520828073955500752896, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3604820829809324391159663164116204576564269286789596023911600461730744080335510307702984913179072412684520828073955500752896 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=123503302683110052331307612276431315599331656580366524937000288145707458469454106599541423075569836592395308093163021347652093760085999341220706740635161464399357367169703285124990951503033872607365054249967774412504829771636556160639516817181415068566008070632911087 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=123503302683110052331307612276431315599331656580366524937000288145707458469454106599541423075569836592395308093163021347652093760085999341220706740635161464399357367169703285124990951503033872607365054249967774412504829771636556160639516817181415068566008070632911087 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1159638750323592403359857350177714798310981632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-737050584868150647621203, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4737007638946731438947, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1322111937580497197903830616065542079656809365928562438569297590548811582472622691650378420879430569695182424050046716608512, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1322111937580497197903830616065542079656809365928562438569297590548811582472622691650378420879430569695182424050046716608512 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1852842542919445656396492190274439319973098306813686257088124315012197388839458669129584915009868256101696324567042269948427205246222391165863453106016897137008763106830260226429792880409852076357774846173226157163372100752243655053350095494551652216300127072266780 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1852842542919445656396492190274439319973098306813686257088124315012197388839458669129584915009868256101696324567042269948427205246222391165863453106016897137008763106830260226429792880409852076357774846173226157163372100752243655053350095494551652216300127072266780 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=449, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1248841731117714895926000223268308244334903296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-758345868558800441838727, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13113227648580832383829, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3666794826883410197311405224244276861548182225817497388219536286287719623263914496374096401657795720638982504201301440593920, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3666794826883410197311405224244276861548182225817497388219536286287719623263914496374096401657795720638982504201301440593920 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=124656929824863083549568338472401552183147040549167596448423225191883442919027934729338433600957209790276037746580117146893402651968557039047546734985567519827963273641984811124204543497353591590508943569315449771578242965136558249464981324484059464766775052985305532 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=124656929824863083549568338472401552183147040549167596448423225191883442919027934729338433600957209790276037746580117146893402651968557039047546734985567519827963273641984811124204543497353591590508943569315449771578242965136558249464981324484059464766775052985305532 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1338044711911837388492143096358901690358824960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-778171303370315340406406, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8123544687207881397353, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2272379892716479558897208871362650449410141097689716691290980233755769907374820251274087910886521291663594791336017794170880, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2272379892716479558897208871362650449410141097689716691290980233755769907374820251274087910886521291663594791336017794170880 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4624731373877469593821619195696905383363472717146489563736106401093898115189117445219414074524656031104232215286434826126860211009060326164001583237310558419233294590163531061363586264752048001513704996871111397338032405753668836817397549545671601747323979257356092 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4624731373877469593821619195696905383363472717146489563736106401093898115189117445219414074524656031104232215286434826126860211009060326164001583237310558419233294590163531061363586264752048001513704996871111397338032405753668836817397549545671601747323979257356092 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1427247692705959881058285969449495136382746624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-796716759097382518614361, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4413840810282650770601, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1516450673500082373624428842540088582406668288 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-814137536952987336804408, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1828814804819780161757, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1605653654294204866190571715630682028430589952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-830562283207066807578679, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=239820400882256968689, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1694856635088327358756714588721275474454511616 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-846098760347844061026225, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14374846960388898683549, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4017980810303229765504610231636686476457022213642271785964505958777247699858204898843728169703894465714265335589595099693056, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4017980810303229765504610231636686476457022213642271785964505958777247699858204898843728169703894465714265335589595099693056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128639485321142800615806462799535827090896174734217806015677748615354490112383127868623992662002532587773519239362415402372170503930667469404466507361569956144816756840230063705547652232125031272552843989279876383292679473974118305407694664995005597854109404702200252 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128639485321142800615806462799535827090896174734217806015677748615354490112383127868623992662002532587773519239362415402372170503930667469404466507361569956144816756840230063705547652232125031272552843989279876383292679473974118305407694664995005597854109404702200252 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1784059615882449851322857461811868920478433280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-860838136202646010751031, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14471222955728896539946, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4048967808840272668580481261700722618948978683156222468118473871055735471322406993179283913943256119691496173653268069613568, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4048967808840272668580481261700722618948978683156222468118473871055735471322406993179283913943256119691496173653268069613568 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128776551663379881688924903362281380512279851669985975556799838885882956465274794519567408039806900121142187462384140637429348608755220673161177896782577301029632404846207533199931990293148102399658238749380035723623826728704079445336888576056961267209520607374954240 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128776551663379881688924903362281380512279851669985975556799838885882956465274794519567408039806900121142187462384140637429348608755220673161177896782577301029632404846207533199931990293148102399658238749380035723623826728704079445336888576056961267209520607374954240 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1873262596676572343889000334902462366502354944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-874858225500815401147700, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=451133657559506143277, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=123947994148171612303484120256144569967825878055802728615871649113951085856808377342222976957446615908923352254691879682048, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=123947994148171612303484120256144569967825878055802728615871649113951085856808377342222976957446615908923352254691879682048 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=270072711717764051621290989286360185170327313081017423185981409396609470146569174718640916140086654380682612044290927849686968751253351347476250788097576482966397566355479116821860482385072067733927890972660638729049840957247484027185613486210551580804256700 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=270072711717764051621290989286360185170327313081017423185981409396609470146569174718640916140086654380682612044290927849686968751253351347476250788097576482966397566355479116821860482385072067733927890972660638729049840957247484027185613486210551580804256700 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1962465577470694836455143207993055812526276608 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-888225976654275537272516, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1919134354241317599664, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=537107974642076986648431187776626469860578804908478490668777146160454705379502968482966233482268668938667859770331478622208, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=537107974642076986648431187776626469860578804908478490668777146160454705379502968482966233482268668938667859770331478622208 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1281450327576983882164692566435725404722963650120417850200534411982232914483249780716959236033774323010036610290159513663832893999465266031568307512225761517804602858899484648920470406220014556002054967399740698883782844350538761795880947204413904765482062726000 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1281450327576983882164692566435725404722963650120417850200534411982232914483249780716959236033774323010036610290159513663832893999465266031568307512225761517804602858899484648920470406220014556002054967399740698883782844350538761795880947204413904765482062726000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2051668558264817329021286081083649258550198272 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-900999405301489892806092, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3981457557168909647291, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2140871539058939821587428954174242704574119936 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-913229116039397477923304, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6587498669403272111282, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1838561913197878915835014450466144454522750524494407141135429461856941106875990930576307491535458135982363058444596215283712, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1838561913197878915835014450466144454522750524494407141135429461856941106875990930576307491535458135982363058444596215283712 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3308297266286257083003155583437384776318315198754273225343238199352649524020650165329910406098516771028334809173177659877766492242064286396182966047455079387791630912467607887911981637714569338850314197161562277292804038751264186261682860340715140947666235186968551 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3308297266286257083003155583437384776318315198754273225343238199352649524020650165329910406098516771028334809173177659877766492242064286396182966047455079387791630912467607887911981637714569338850314197161562277292804038751264186261682860340715140947666235186968551 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2230074519853062314153571827264836150598041600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-924959513307909502887701, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9692853251033194728088, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2706197872235080201959403292259156444297531670885026241446531005654598707873649571971868330237584447344826524227439373058048, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2706197872235080201959403292259156444297531670885026241446531005654598707873649571971868330237584447344826524227439373058048 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=94044257912591591365717485332715261084375474850545115042848069631795600979430077494526413294896142540779307113782233589606214942959871888749207774884312632648391271811349273748168354550667291094977522553954550407304014585654236618228356331206204068661169903842344560 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=94044257912591591365717485332715261084375474850545115042848069631795600979430077494526413294896142540779307113782233589606214942959871888749207774884312632648391271811349273748168354550667291094977522553954550407304014585654236618228356331206204068661169903842344560 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2319277500647184806719714700355429596621963264 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-936229774642496277274800, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13258343766588367922192, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2408480481441307299285857573446023042645884928 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-947074640149081766887622, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2413478260002878309370, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=671384968302596233310538984720783087325723506135598113335971432700568381724378710603707791852835836173334824712914348277760, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=671384968302596233310538984720783087325723506135598113335971432700568381724378710603707791852835836173334824712914348277760 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=31788504127344432896151662968672171693437746991265959703822877368361805099744753502848394224186880270190332096899386249297813493407087876949566216108263729412878478403364149362989442806912936167315204884713092812231235137428937913698248806617483397918792657224535 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=31788504127344432896151662968672171693437746991265959703822877368361805099744753502848394224186880270190332096899386249297813493407087876949566216108263729412878478403364149362989442806912936167315204884713092812231235137428937913698248806617483397918792657224535 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
[2]libmpf._normalize. / x: (0, 1306301308643873273329876163195678, -108, 111, 88, 'd') / result: (0, 77861625471345977385632763, -84, 87)

[2]libmpf._normalize. / x: (0, 1312045149804536671036437392274803, -108, 111, 88, 'd') / result: (0, 156407970166747173194460557, -85, 88)

[2]libmpf._normalize. / x: (0, 1317689092994991943168438291805351, -108, 111, 88, 'd') / result: (0, 78540390312373157928492921, -84, 87)

[2]libmpf._normalize. / x: (0, 1323236553784362377064475134718151, -108, 111, 88, 'd') / result: (0, 9858880592766123839203083, -81, 84)

[2]libmpf._normalize. / x: (0, 1328690775511560467287804422500678, -108, 111, 88, 'd') / result: (0, 158392283381409700785613587, -85, 88)

[2]libmpf._normalize. / x: (1, 11402327486449, -73, 44, 73, 'd') / result: (1, 11402327486449, -73, 44)

[2]libmpf._normalize. / x: (1, 3379291089921454, -73, 52, 73, 'd') / result: (1, 1689645544960727, -72, 51)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 57409492790252818238184217900128239642817, -131, 136, 83, 'd') / result: (1, 6373734072779060148914911, -78, 83)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (1, 100578097551407268434436859044807, -107, 107, 77, 'd') / result: (1, 93670652761503372745995, -77, 77)

[2]libmpf._normalize. / x: (1, 127326820466384457299363214008645, -107, 107, 77, 'd') / result: (1, 118582342254355975705537, -77, 77)

[3]libmpf._normalize1 / x: (1, 10009173444207043332341944181970405562305564165, -153, 153, 73, 'd') / result: (1, 8279394220728679875591, -73, 73)

[3]libmpf._normalize1 / x: (1, 12671110919512729632801907861141400584301210479, -153, 154, 73, 'd') / result: (1, 5240648646064948724653, -72, 73)

[3]libmpf._normalize1 / x: (0, 17724127186467970302983, -73, 74, 73, 'd') / result: (0, 8862063593233985151491, -72, 73)

[2]libmpf._normalize1 / x: (0, 5240648646064948724653, -72, 73, 73, 'd') / result: (0, 5240648646064948724653, -72, 73)

[2]libmpf._normalize. / x: (0, 106000569362025632441545271461954317429493490, -144, 147, 63, 'd') / result: (0, 1370025248372657197, -58, 61)

[3]libmpf._normalize1 / x: (1, 17810725426352003657048452541758050921, -145, 124, 63, 'd') / result: (1, 7724170880317461827, -84, 63)

[3]libmpf._normalize1 / x: (1, 29887736946829062558805305207791260717, -145, 125, 63, 'd') / result: (1, 6480869865685469389, -83, 63)

[3]libmpf._normalize1 / x: (1, 812518119990303641, -83, 60, 53, 'n') / result: (1, 6347797812424247, -76, 53)

[3]libmpf._normalize1 / x: (1, 681733260535031687, -82, 60, 53, 'n') / result: (1, 5326041097929935, -75, 53)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (0, 8563841263524597, -48, 53)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 6347797812424247, -76, 53), (1, 5326041097929935, -75, 53))

zeta_ / result: (-8.40124045255017e-8 - 1.40979134011785e-7j) / count: 713
zeta / count: 0 / s: Complex { re: 0.5, im: 30.424876 }
gamma_ / s: (0.5, -30.424876) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-30.424876j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-30.424876j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-30.424876, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-8563841263524597, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8563841263524597 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=8563841263524597, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 8563841263524597, -48, 53, 53, 'd') / result: (1, 8563841263524597, -48, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 8563841263524597, -48, 53, 53, 'd') / result: (1, 8563841263524597, -48, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 8563841263524597, -48, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-30.424876000000001') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 8563841263524597, -48, 53)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 8563841263524597, -48, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 8563841263524597, -48, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 8563841263524597, -48, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 8563841263524597, -48, 53), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=561239901046347988992, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=304248760000000011416, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=304248760000000011416, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-30.424876j) / result: (0.5 - 30.424876j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-30.424876j) / result: (0.5 - 30.424876j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 8563841263524597, -48, 53)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 8563841263524597, -48, 53)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 8563841263524597, -48, 53)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 8563841263524597, -48, 53), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=150 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 8563841263524597, -48, 53), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1208925819614629174706176, y=-73562836309946923613159424, prec=81 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=81, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, -1, 1), (1, 8563841263524597, -48, 53)), prec=81, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, -1, 1), b=(1, 8563841263524597, -48, 53), prec=81, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 8563841263524597, -48, 53), t=(1, 8563841263524597, -48, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 73339377186846566039367224012409, -96, 106), prec=101, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=73359184227475132123765609999993 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=73359184227475132123765609999993, exp=-96, bc=106, prec=101, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 73359184227475132123765609999993, -96, 106, 101, 'd') / result: (0, 2292474507108597878867675312499, -91, 101)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 73359184227475132123765609999993, -96, 106, 101, 'd') / result: (0, 2292474507108597878867675312499, -91, 101)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 2292474507108597878867675312499, -91, 101), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2289998627030027118317877064051 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2289998627030027118317877064051, exp=-91, bc=101, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2289998627030027118317877064051, -91, 101, 10, 'd') / result: (0, 231, 2, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2289998627030027118317877064051, -91, 101, 10, 'd') / result: (0, 231, 2, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 2292474507108597878867675312499, -91, 101), prec=81, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=2292474507108597878867675312499, n=0 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=2292474507108597878867675312499, prec=101 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=321967008803785871605921932561360719242592256, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=114881667610660714337893299321915614063205370834187322728747178662319843809895209748135936 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=120938540678782418183055235529475473227535920954920989439961988288734504139711942043369472 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=124085695763067183013490898317738966215404494759902163232312981140448353391597566717591552 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125689853015732629048519483205478143505210023383182894242451060787005246416395708074557440 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126499691811195968617811447714739008728148879867605572092631274691928893892230821433049088 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126906565830592265717942815553389618813646457852339717041923053037983411355331738405437440 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127110493329125184183277472572645902295684978250004324082282187569486329055825857871872000 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127212579930468330094820023855756018972838906019449459016379002733530222753518482934988800 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=17318113037715150487011451038923, exp=-101, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=17318113037715150487011451038923 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=17318113037715150487011451038923, exp=-101, bc=104, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 17318113037715150487011451038923, -101, 104, 81, 'd') / result: (0, 1032239975793072610319343, -77, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 17318113037715150487011451038923, -101, 104, 81, 'd') / result: (0, 1032239975793072610319343, -77, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 1032239975793072610319343, -77, 80), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, -1, 1), (1, 8563841263524597, -48, 53)), prec=81, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 8563841263524597, -48, 53), x=(0, 1, -1, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 8563841263524597, -48, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 8563841263524597, -48, 53), x=(0, 1, -1, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 8563841263524597, -48, 53), t=(0, 1, -1, 1), prec=85, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=8563841263524597, exp=-47, bc=53, prec=85, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 8563841263524597, -47, 53, 85, 'd') / result: (0, 8563841263524597, -47, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 8563841263524597, -47, 53, 85, 'd') / result: (0, 8563841263524597, -47, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 8563841263524597, -47, 53), prec=85, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 8563841263524597, -47, 53), prec=121, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=178949550056835571363296678251360745253 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=178949550056835571363296678251360745253, exp=-133, bc=128, prec=121, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 178949550056835571363296678251360745253, -133, 128, 121, 'd') / result: (0, 699021679909513950637877649419377911, -125, 120)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 178949550056835571363296678251360745253, -133, 128, 121, 'd') / result: (0, 699021679909513950637877649419377911, -125, 120)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 699021679909513950637877649419377911, -125, 120), prec=121 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=43688854994344621914867353088711119, prec=121 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=2, prec=121 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=121, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4132207983943192096291698330364818409, exp=-121, prec=85, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4132207983943192096291698330364818409 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4132207983943192096291698330364818409, exp=-121, bc=122, prec=85, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4132207983943192096291698330364818409, -121, 122, 85, 'd') / result: (0, 30065770144161012258640391, -84, 85)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4132207983943192096291698330364818409, -121, 122, 85, 'd') / result: (0, 30065770144161012258640391, -84, 85)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 30065770144161012258640391, -84, 85), prec=81, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=30065770144161012258640391, exp=-84, bc=85, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 30065770144161012258640391, -84, 85, 81, 'd') / result: (0, 58722207312814477067657, -75, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 30065770144161012258640391, -84, 85, 81, 'd') / result: (0, 58722207312814477067657, -75, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 58722207312814477067657, -75, 76), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1032239975793072610319343, -78, 80), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 58722207312814477067657, -75, 76), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-113330376025419026507891261, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=113330376025419026507891261 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-177676728902250009126106325, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=177676728902250009126106325 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 113330376025419026507891261, -81, 87), (1, 177676728902250009126106325, -81, 88)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 113330376025419026507891261, -81, 87), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=617835110520646788687, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3067387475639227324085, exp=-139, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3067387475639227324085 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3067387475639227324085, exp=-139, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3067387475639227324085, -139, 72, 57, 'n') / result: (0, 46804618463733327, -123, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3067387475639227324085, -139, 72, 57, 'n') / result: (0, 46804618463733327, -123, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 177676728902250009126106325, -81, 88), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=177676728902250009126106325, exp=-81, mag=7, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=93, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=190138567358619802230951819, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-51904257601130637730037235, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=51904257601130637730037235 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=51904257601130637730037235, exp=-87, bc=86, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 51904257601130637730037235, -87, 86, 57, 'n') / result: (1, 96679213645180013, -58, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 51904257601130637730037235, -87, 86, 57, 'n') / result: (1, 96679213645180013, -58, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=145777881960553212819718360, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=145777881960553212819718360 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=145777881960553212819718360, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 145777881960553212819718360, -87, 87, 57, 'n') / result: (0, 135766232349493739, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 145777881960553212819718360, -87, 87, 57, 'n') / result: (0, 135766232349493739, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 46804618463733327, -123, 56), t=(1, 96679213645180013, -58, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=4525033708036411445123158942393251, exp=-181, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 4525033708036411445123158942393251, -181, 112, 53, 'n') / result: (1, 981210275364643, -119, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 4525033708036411445123158942393251, -181, 112, 53, 'n') / result: (1, 981210275364643, -119, 50)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 46804618463733327, -123, 56), t=(0, 135766232349493739, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=6354486705376623568972460352139653, exp=-180, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 6354486705376623568972460352139653, -180, 113, 53, 'n') / result: (0, 5511638632799673, -120, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 6354486705376623568972460352139653, -180, 113, 53, 'n') / result: (0, 5511638632799673, -120, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 981210275364643, -119, 50), (0, 5511638632799673, -120, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.4763611336447e-21 + 4.14649604904313e-21j) / count: 143
gamma__ / s: Complex { re: 0.5, im: -30.424876 } / result: Complex { re: -1.4763611336446963e-21, im: 4.146496049043131e-21 }
zeta__ / s: Complex { re: 0.5, im: 30.424876 } / result: Complex { re: -8.401240452550172e-8, im: -1.4097913401178508e-7 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.5, 32.935062) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5+32.935062j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5+32.935062j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5+32.935062j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=32.935062, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4635197904707006, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4635197904707006 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4635197904707006, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4635197904707006, -47, 53, 53, 'd') / result: (0, 2317598952353503, -46, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4635197904707006, -47, 53, 53, 'd') / result: (0, 2317598952353503, -46, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 2317598952353503, -46, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='32.935062000000002') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 2317598952353503, -46, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 2317598952353503, -46, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 2317598952353503, -46, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 2317598952353503, -46, 52), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=303772329882878345216, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=329350620000000020581, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=329350620000000020581, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+32.935062j) / result: (0.5 + 32.935062j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+32.935062j) / result: (0.5 + 32.935062j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (0, 2317598952353503, -46, 52)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 2317598952353503, -46, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 2317598952353503, -46, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 2317598952353503, -46, 52), t=(0, 2317598952353503, -46, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 5371264903950054668782676371009, -92, 103), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5372502843989340049057575495233 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5372502843989340049057575495233, exp=-92, bc=103, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 5372502843989340049057575495233, -92, 103, 14, 'd') / result: (0, 8679, -3, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 5372502843989340049057575495233, -92, 103, 14, 'd') / result: (0, 8679, -3, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 8679, -3, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=17774592 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=17774592 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=17774592 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4215, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4215 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4215, exp=-7, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4215, -7, 13, 10, 'd') / result: (0, 263, -3, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4215, -7, 13, 10, 'd') / result: (0, 263, -3, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 263, -3, 9), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 263, -3, 9), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 263, -3, 9), t=(0, 53, 0, 6), prec=5, rnd='f' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 711 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 263, -3, 9), t=(0, 53, 0, 6), prec=5, rnd='f', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=161 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=161, exp=-3, bc=8, prec=5, rnd='f' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 161, -3, 8, 5, 'f') / result: (1, 21, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 161, -3, 8, 5, 'f') / result: (1, 21, 0, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (0, 2317598952353503, -46, 52)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 2317598952353503, -46, 52), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 2317598952353503, -46, 52), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 2317598952353503, -46, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=2317598952353503, exp=-46, bc=52, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 2317598952353503, -46, 52, 73, 'd') / result: (1, 2317598952353503, -46, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 2317598952353503, -46, 52, 73, 'd') / result: (1, 2317598952353503, -46, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 2317598952353503, -46, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 2317598952353503, -46, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 2317598952353503, -46, 52), t=(1, 2317598952353503, -46, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 5371264903950054668782676371009, -92, 103), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5372502843989340049057575495233 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5372502843989340049057575495233, exp=-92, bc=103, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 5372502843989340049057575495233, -92, 103, 14, 'd') / result: (0, 8679, -3, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 5372502843989340049057575495233, -92, 103, 14, 'd') / result: (0, 8679, -3, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 8679, -3, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=17774592 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=17774592 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=17774592 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4215, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4215 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4215, exp=-7, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4215, -7, 13, 10, 'd') / result: (0, 263, -3, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4215, -7, 13, 10, 'd') / result: (0, 263, -3, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 2317598952353503, -46, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=61 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 61 / result: [1, 7443, 9235523, 4582671971, 1217196678755, 200894303129187, 22564730225577571, 1833789683505188451, 112680756824217374307, 5411600480139046964835, 208443893036623043907171, 6573638103833407051943523, 172622182733314729000717923, 3827733838977343581990047331, 72520625918230203295313317475, 1185819221685431722787104247395, 16879738136210175723364931227235, 210745795315633483965796911566435, 2322962646870493147102389154500195, 22736051252082038739349910773976675, 198602660773904585380251635495620195, 1555287934227964230895779226205441635, 10963168900251887354132418755863400035, 69810146073236310832232906016738397795, 402858995605446026687014387110201151075, 2112962884223894281974014808398267043427, 10098606382206874370011048449888239898211, 44083630073832554828533434806753323535971, 176139722132720913181648993222000505671267, 645406198087899507837547837826454194638435, 2172510662213226459938100010098574673989219, 6728789555177316710467616327369491514019427, 19204315095436135253584149100849382861721187, 50576335964506562862707961585768046698319459, 123070768736581510595116982183051561376042595, 277065153879746927517377137737529586343628387, 577824140826023046952401666895571175012716131, 1117876375809154916356277626324116789616594531, 2009246801549734675540780262517758393510153827, 3360995359266218266392004040481742364249837155, 5243176895327144785298771326254378272874712675, 7647336508687713979277243721992867138995375715, 10461154989040875858632426560378706087294946915, 13474365804937531288398824817408028561616293475, 16421456007319213088044957281963353364087328355, 19048450270116367651025404946997687832207576675, 21177156562378180426378887622534348729451695715, 22740448074197082052753785675262026944998166115, 23777157182034879973402402278649855656360562275, 24395300167856954306900862083825766989834374755, 24724976426962060618100040646586253034353741411, 24881270238791738275243972708372528887725182563, 24946635835972185988463242278649089364116524643, 24970526873647842888497023825089794487023980131, 24978068800390729386534686950861315107339521635, 24980094238598577136633208657699037909459291747, 24980547811633539181056815835292041471323950691, 24980630202636629631604187423210658792761871971, 24980641863372299404515239713914583043352186467, 24980643069480552079853279890006514365229846115, 24980643150563459822733148137138745042330865251, 24980643153221915814302979882946359162891554403]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 61 / result: [1, 7443, 9235523, 4582671971, 1217196678755, 200894303129187, 22564730225577571, 1833789683505188451, 112680756824217374307, 5411600480139046964835, 208443893036623043907171, 6573638103833407051943523, 172622182733314729000717923, 3827733838977343581990047331, 72520625918230203295313317475, 1185819221685431722787104247395, 16879738136210175723364931227235, 210745795315633483965796911566435, 2322962646870493147102389154500195, 22736051252082038739349910773976675, 198602660773904585380251635495620195, 1555287934227964230895779226205441635, 10963168900251887354132418755863400035, 69810146073236310832232906016738397795, 402858995605446026687014387110201151075, 2112962884223894281974014808398267043427, 10098606382206874370011048449888239898211, 44083630073832554828533434806753323535971, 176139722132720913181648993222000505671267, 645406198087899507837547837826454194638435, 2172510662213226459938100010098574673989219, 6728789555177316710467616327369491514019427, 19204315095436135253584149100849382861721187, 50576335964506562862707961585768046698319459, 123070768736581510595116982183051561376042595, 277065153879746927517377137737529586343628387, 577824140826023046952401666895571175012716131, 1117876375809154916356277626324116789616594531, 2009246801549734675540780262517758393510153827, 3360995359266218266392004040481742364249837155, 5243176895327144785298771326254378272874712675, 7647336508687713979277243721992867138995375715, 10461154989040875858632426560378706087294946915, 13474365804937531288398824817408028561616293475, 16421456007319213088044957281963353364087328355, 19048450270116367651025404946997687832207576675, 21177156562378180426378887622534348729451695715, 22740448074197082052753785675262026944998166115, 23777157182034879973402402278649855656360562275, 24395300167856954306900862083825766989834374755, 24724976426962060618100040646586253034353741411, 24881270238791738275243972708372528887725182563, 24946635835972185988463242278649089364116524643, 24970526873647842888497023825089794487023980131, 24978068800390729386534686950861315107339521635, 24980094238598577136633208657699037909459291747, 24980547811633539181056815835292041471323950691, 24980630202636629631604187423210658792761871971, 24980641863372299404515239713914583043352186467, 24980643069480552079853279890006514365229846115, 24980643150563459822733148137138745042330865251, 24980643153221915814302979882946359162891554403]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 2317598952353503, -46, 52), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=178405961588244985132285746181186892047843328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-215612348406213372434610, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6923929345915841283435, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1931522908809007625062627540658252881998619933036259187597333198692404421268597213582974724253543097914055572635615125045248, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1931522908809007625062627540658252881998619933036259187597333198692404421268597213582974724253543097914055572635615125045248 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3588664138911736410744388398274127525623311968822158695193452111459960546589799627047040866581337928514736820707546668080042772355490651824174766169726054349957027200506863660436338298221374037258802992624291769314037898860889294459093782781621742359143073757779292 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3588664138911736410744388398274127525623311968822158695193452111459960546589799627047040866581337928514736820707546668080042772355490651824174766169726054349957027200506863660436338298221374037258802992624291769314037898860889294459093782781621742359143073757779292 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=267608942382367477698428619271780338071764992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-341737486916273140158323, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14320557487133601790549, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4007651810790882131145986554948674428959703390470954891913183321351085109370137534065209588290773914388521722901704109719552, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4007651810790882131145986554948674428959703390470954891913183321351085109370137534065209588290773914388521722901704109719552 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128585961762639639178533948869796845548392477695087378572914211698137004665938730903710768937797264405471586841690456270613003495559621546049791723529223989055702877072079097806868998595912198566336317567464246534200588680865529282807922013158294840992682831458862727 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128585961762639639178533948869796845548392477695087378572914211698137004665938730903710768937797264405471586841690456270613003495559621546049791723529223989055702877072079097806868998595912198566336317567464246534200588680865529282807922013158294840992682831458862727 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=356811923176489970264571492362373784095686656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-431224696812426744869253, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13847858691831682566837, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3873374817130362884483878758004517811494558689243835269245989034810971433025261791944468029920206747153854757959121240064000, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3873374817130362884483878758004517811494558689243835269245989034810971433025261791944468029920206747153854757959121240064000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=127535664785308325272617192176654441938892590416096129425205833651756061236347250121107592725569201345090960193152892664980451083534452029401587927053219209979793698723939947955850939246842636521885785872722880045903765490619248093965211266459694401360238081010598255 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=127535664785308325272617192176654441938892590416096129425205833651756061236347250121107592725569201345090960193152892664980451083534452029401587927053219209979793698723939947955850939246842636521885785872722880045903765490619248093965211266459694401360238081010598255 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=446014903970612462830714365452967230119608320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-500636369369029233326006, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3779193535796984434896, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=535217884764734955396857238543560676143529984 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-557349835322486512592933, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6408734982907495492781, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1786916915636140744041896067026084217036156408637822670878816274726128154435654106683714584469855379353644995005141265416192, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1786916915636140744041896067026084217036156408637822670878816274726128154435654106683714584469855379353644995005141265416192 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3153992139990138342734546490558497813084570572193147254430700570592356154661255788398817253053216300072236719697881906040509687282189648090946508545450526974861650093037822314317081407884197611827106031315188768085765871903551025351294717037624182269784940240851676 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3153992139990138342734546490558497813084570572193147254430700570592356154661255788398817253053216300072236719697881906040509687282189648090946508545450526974861650093037822314317081407884197611827106031315188768085765871903551025351294717037624182269784940240851676 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=624420865558857447963000111634154122167451648 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-605300387554582123369995, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2965438301237727459328, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=826319960987810748689894135040963799785505853705351524105810994093007239045389182281486513049644106059489015031279197880320, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=826319960987810748689894135040963799785505853705351524105810994093007239045389182281486513049644106059489015031279197880320 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=47620368074579091678609021413060856410976936398975909170511462758075478022439141160079814573646582719325398416299577712843336742395582549616967464772928298985561023001133338747183069239004910262139577336940634106302222637756312700924700582928438810801185764872911 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=47620368074579091678609021413060856410976936398975909170511462758075478022439141160079814573646582719325398416299577712843336742395582549616967464772928298985561023001133338747183069239004910262139577336940634106302222637756312700924700582928438810801185764872911 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=713623846352979940529142984724747568191373312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-646837045218640117303896, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5936036187605576269036, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1652639921975621497379788270081927599571011707410703048211621988186014478090778364562973026099288212118978030062558395760640, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1652639921975621497379788270081927599571011707410703048211621988186014478090778364562973026099288212118978030062558395760640 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2759639370250446046035618699433101836681269827216438157437785627638180799859584813895530658709571582911419845219503459802621716728298352345712539886775941221002314688075463505341699920263448730067265230020115887634670014860347232971446215485181468042223966857778951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2759639370250446046035618699433101836681269827216438157437785627638180799859584813895530658709571582911419845219503459802621716728298352345712539886775941221002314688075463505341699920263448730067265230020115887634670014860347232971446215485181468042223966857778951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=802826827147102433095285857815341014215294976 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-683474973832546280316645, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13805363124125255999896, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3863045817618015250125255081316505763997239866072518375194666397384808842537194427165949448507086195828111145271230250090496, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3863045817618015250125255081316505763997239866072518375194666397384808842537194427165949448507086195828111145271230250090496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=127427776806248234446627578585320568847900041051306688889196281244244973706425755453010158747486726450488589335629794670391874989678143770121216107226474413098191214439596421150357724984793230299801862713583994472305867084261758185122239235747999397837621315566941952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=127427776806248234446627578585320568847900041051306688889196281244244973706425755453010158747486726450488589335629794670391874989678143770121216107226474413098191214439596421150357724984793230299801862713583994472305867084261758185122239235747999397837621315566941952 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=892029807941224925661428730905934460239216640 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-716248717775242605760649, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10703122881712825718298, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=981232788735347418227571603996527906263138304 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-745896175445095606296763, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10727168912143720344590, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1070435769529469910793714477087121352287059968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-772962183728699885027575, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13332664328823336776184, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3728768823957496003463147284372349146532095164845398752527472110844695166192318685045207890136519028593444180328647380434944, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3728768823957496003463147284372349146532095164845398752527472110844695166192318685045207890136519028593444180328647380434944 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125678376420827005854106624872683495603022223906796266600120858920348635536090445031476293274485309729289393530793035539299484645570075144524295218597618410443406325358740544507768645227529673981375020239633872721981785097710145327180091100146398862258740777201587791 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125678376420827005854106624872683495603022223906796266600120858920348635536090445031476293274485309729289393530793035539299484645570075144524295218597618410443406325358740544507768645227529673981375020239633872721981785097710145327180091100146398862258740777201587791 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1159638750323592403359857350177714798310981632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-797860497764027173384700, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3270102143637996000262, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=908951957086591823558883548545060179764056439075886676516392093502307962949928100509635164354608516665437916534407117668352, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=908951957086591823558883548545060179764056439075886676516392093502307962949928100509635164354608516665437916534407117668352 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=57225253874200913303457746949723056941395449180378038965431590217090928205554928533771892243471470165332130587986428084752898208889690682712178772715401454545532848134856721455157057057991657411241880014510740232775829230523114404872134807301961045260126565678080 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=57225253874200913303457746949723056941395449180378038965431590217090928205554928533771892243471470165332130587986428084752898208889690682712178772715401454545532848134856721455157057057991657411241880014510740232775829230523114404872134807301961045260126565678080 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1248841731117714895926000223268308244334903296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-820912735960795495804605, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9889367647153568742763, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1338044711911837388492143096358901690358824960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-842373856285302373484361, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3263999172788638644210, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1427247692705959881058285969449495136382746624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-862449393624853489738539, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12859965533521417552438, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3594491830296976756801039487428192529066950463618279129860277824304581489847442942924466331765951861358777215386064510779392, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3594491830296976756801039487428192529066950463618279129860277824304581489847442942924466331765951861358777215386064510779392 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=123298354361229461301124126019606496906389881243653161219403601924221828436314667802868612066351201912142483658034779323535632863323019843586409653349620328526057353472748617722584372734498669532460846375725613204283853326590476986767512640340807553866810452862814767 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=123298354361229461301124126019606496906389881243653161219403601924221828436314667802868612066351201912142483658034779323535632863323019843586409653349620328526057353472748617722584372734498669532460846375725613204283853326590476986767512640340807553866810452862814767 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1516450673500082373624428842540088582406668288 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-881307462225119001056118, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8837648783397853816062, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1605653654294204866190571715630682028430589952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-899087322238759652751288, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5893540619899149702095, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1694856635088327358756714588721275474454511616 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-915905627032937994949334, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3910987675862755085252, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1784059615882449851322857461811868920478433280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-931861066181455978195291, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2791300377486719420498, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=774674963426072576896775751600903562298911737848767053849197806962194286605052358388893605984041349430770951591824248012800, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=774674963426072576896775751600903562298911737848767053849197806962194286605052358388893605984041349430770951591824248012800 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=42020168449447670525109854747104155811342558443542564852721564360964295251107875573600838851843824177923085974885612952439638913698965308244376531180597155569787168683742662587560287447451396657824339656507647449297086877617137140577351641919831605066138606697840 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=42020168449447670525109854747104155811342558443542564852721564360964295251107875573600838851843824177923085974885612952439638913698965308244376531180597155569787168683742662587560287447451396657824339656507647449297086877617137140577351641919831605066138606697840 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1873262596676572343889000334902462366502354944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-947037874470855263528317, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2450243938229381668675, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=681713967814943867669162661408795134823042329306915007387294070126730972212446075382226373265956387499078437400805338251264, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=681713967814943867669162661408795134823042329306915007387294070126730972212446075382226373265956387499078437400805338251264 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=32752209860706191168097073059309132454896141421738915045464090683915073503323367658655695435851498462109860506028549294598204555807088527043971836079097433055423828710107994183800709218778070151016140818853994869960292201333802211473783785993145692706660095271207 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=32752209860706191168097073059309132454896141421738915045464090683915073503323367658655695435851498462109860506028549294598204555807088527043971836079097433055423828710107994183800709218778070151016140818853994869960292201333802211473783785993145692706660095271207 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1962465577470694836455143207993055812526276608 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-961508523851308978731373, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2815346407917614046822, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=785003962938420211255399428288915609796230561020083947900520444388356877093119723167412187397161900756514564279715237986304, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=785003962938420211255399428288915609796230561020083947900520444388356877093119723167412187397161900756514564279715237986304 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=43114856715961104294913425191070943972667732620695673383549546117335637748828325060663964295483743410597577459679679751500356920885429128109447624230824062321949868327444510225464043124498352663087175625963565949741977891158636558474153385584135098559658537321215 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=43114856715961104294913425191070943972667732620695673383549546117335637748828325060663964295483743410597577459679679751500356920885429128109447624230824062321949868327444510225464043124498352663087175625963565949741977891158636558474153385584135098559658537321215 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2051668558264817329021286081083649258550198272 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-975335816506456724848485, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3823805602911815510913, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1063886949771806338938238698865240892223838786645640087286231654894746820270938572187413885551416786551592106852771967270912, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1063886949771806338938238698865240892223838786645640087286231654894746820270938572187413885551416786551592106852771967270912 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=77251754133254667278222969014351066357658035691987105614873973248951148211755093834649373854361857264823791201332578872695020920887835389542736965546470356792807584013694013268491426379511644854098872330442721641670229863111487201645304448546763657636949377967552 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=77251754133254667278222969014351066357658035691987105614873973248951148211755093834649373854361857264823791201332578872695020920887835389542736965546470356792807584013694013268491426379511644854098872330442721641670229863111487201645304448546763657636949377967552 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2140871539058939821587428954174242704574119936 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-988574532134913257462218, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5420841824597230478383, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1508033928802754616359056796449758934608548183012266531493105064219738211257835257663712886315600493558567452432084536131584, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1508033928802754616359056796449758934608548183012266531493105064219738211257835257663712886315600493558567452432084536131584 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2349713881285313240563063445515056032024544871336657651186040530154498810736901508472199736791780648267829076900526271745125734225240786883212134275271974118245959237017815564452295127834143055468859347083633434314906701384747282141222217782387363484545341652174076 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2349713881285313240563063445515056032024544871336657651186040530154498810736901508472199736791780648267829076900526271745125734225240786883212134275271974118245959237017815564452295127834143055468859347083633434314906701384747282141222217782387363484545341652174076 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2230074519853062314153571827264836150598041600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1001272738738058466652044, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7558387071593968869760, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2319277500647184806719714700355429596621963264 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1013472846170240545819343, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10194031489553837283664, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2850803865407947082980134765891325109259995195283462758165047929620874974706592678871128470021272165905237101857913232687104, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2850803865407947082980134765891325109259995195283462758165047929620874974706592678871128470021272165905237101857913232687104 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=100124296048207609686106249010570382711197928251969412834352809130299848412157966031334173734221716058228981758987069944705574077198619669224097998968642773571786058499249934551516617894162067717223736388806386707070096550735031707089942222702391869253325184872251735 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=100124296048207609686106249010570382711197928251969412834352809130299848412157966031334173734221716058228981758987069944705574077198619669224097998968642773571786058499249934551516617894162067717223736388806386707070096550735031707089942222702391869253325184872251735 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2408480481441307299285857573446023042645884928 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1025212460748819420474968, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13290168761116910209242, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3718439824445148369104523607684337099034776341674081858476149473418532575704251320266689308723398477267700567640756390461440, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3718439824445148369104523607684337099034776341674081858476149473418532575704251320266689308723398477267700567640756390461440 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125517413387155378090326863478834296779009472656397171216970201532526741402657384449535720665030052808801186398782125747979546604134132892683188757840947797535329000983230275523072624503992158586857263708234930456266653802221361896903056148392603185556410193897417152 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125517413387155378090326863478834296779009472656397171216970201532526741402657384449535720665030052808801186398782125747979546604134132892683188757840947797535329000983230275523072624503992158586857263708234930456266653802221361896903056148392603185556410193897417152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=28, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2497683462235429791852000446536616488669806592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1036525084367008868239248, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 1334054840673750730269481487234902, -108, 111, 88, 'd') / result: (0, 159031729778498498233494935, -85, 88)

[2]libmpf._normalize. / x: (1, 939136233886236, -73, 50, 73, 'd') / result: (1, 234784058471559, -71, 48)

[2]libmpf._normalize. / x: (0, 11866607331171093, -73, 54, 73, 'd') / result: (0, 11866607331171093, -73, 54)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 15536507071019201619426316505976962441283, -129, 134, 83, 'd') / result: (1, 3449797574499413958954167, -77, 82)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (1, 108580033650424107937731364285254, -107, 107, 77, 'd') / result: (1, 101123036491148274333897, -77, 77)

[2]libmpf._normalize. / x: (0, 120575491745263328383467628353523, -107, 107, 77, 'd') / result: (0, 112294677407726019978027, -77, 77)

[3]libmpf._normalize1 / x: (1, 10805497576939661420769263197650527748825370599, -153, 153, 73, 'd') / result: (1, 2234524526158301355477, -71, 71)

[3]libmpf._normalize1 / x: (0, 11999242771340420081979471838310379378002382309, -153, 154, 73, 'd') / result: (0, 1240692623221232259225, -70, 71)

[2]libmpf._normalize1 / x: (0, 4595707767593123962325, -71, 72, 73, 'd') / result: (0, 4595707767593123962325, -71, 72)

[2]libmpf._normalize1 / x: (1, 1240692623221232259225, -70, 71, 73, 'd') / result: (1, 1240692623221232259225, -70, 71)

[3]libmpf._normalize1 / x: (0, 27277802626378105462369856218721298409808125, -142, 145, 63, 'd') / result: (0, 5640917371397007095, -60, 63)

[3]libmpf._normalize1 / x: (1, 16880810020896533177058164784202612275, -143, 124, 63, 'd') / result: (1, 7320884359188437909, -82, 63)

[3]libmpf._normalize1 / x: (0, 52205100691675656751238947178838017025, -144, 126, 63, 'd') / result: (0, 5660088358473925723, -81, 63)

[3]libmpf._normalize1 / x: (1, 748141167006489013, -81, 60, 53, 'n') / result: (1, 5844852867238195, -74, 53)

[3]libmpf._normalize1 / x: (0, 578419887831413467, -80, 60, 53, 'n') / result: (0, 2259452686841459, -72, 52)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (0, 2317598952353503, -46, 52)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 5844852867238195, -74, 53), (0, 2259452686841459, -72, 52))

zeta_ / result: (-3.09423934400282e-7 + 4.78457717129242e-7j) / count: 660
zeta / count: 0 / s: Complex { re: 0.5, im: 32.935062 }
gamma_ / s: (0.5, -32.935062) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-32.935062j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-32.935062j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-32.935062, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4635197904707006, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4635197904707006 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=4635197904707006, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4635197904707006, -47, 53, 53, 'd') / result: (1, 2317598952353503, -46, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4635197904707006, -47, 53, 53, 'd') / result: (1, 2317598952353503, -46, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 2317598952353503, -46, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-32.935062000000002') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 2317598952353503, -46, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 2317598952353503, -46, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 2317598952353503, -46, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 2317598952353503, -46, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2317598952353503, -46, 52), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=303772329882878345216, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=329350620000000020581, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=329350620000000020581, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-32.935062j) / result: (0.5 - 32.935062j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-32.935062j) / result: (0.5 - 32.935062j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 2317598952353503, -46, 52)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 2317598952353503, -46, 52)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 2317598952353503, -46, 52)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 2317598952353503, -46, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=192 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 2317598952353503, -46, 52), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1208925819614629174706176, y=-79632093644817260928303104, prec=81 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=81, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, -1, 1), (1, 2317598952353503, -46, 52)), prec=81, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, -1, 1), b=(1, 2317598952353503, -46, 52), prec=81, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 2317598952353503, -46, 52), t=(1, 2317598952353503, -46, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 5371264903950054668782676371009, -92, 103), prec=101, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5372502843989340049057575495233 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5372502843989340049057575495233, exp=-92, bc=103, prec=101, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 5372502843989340049057575495233, -92, 103, 101, 'd') / result: (0, 83945356937333438266524617113, -86, 97)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 5372502843989340049057575495233, -92, 103, 101, 'd') / result: (0, 83945356937333438266524617113, -86, 97)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 83945356937333438266524617113, -86, 97), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=83867985684878101999343421849 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=83867985684878101999343421849, exp=-86, bc=97, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 83867985684878101999343421849, -86, 97, 10, 'd') / result: (0, 541, 1, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 83867985684878101999343421849, -86, 97, 10, 'd') / result: (0, 541, 1, 10)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 83945356937333438266524617113, -86, 97), prec=81, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=83945356937333438266524617113, n=4 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=1343125710997335012264393873808, prec=101 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=188859435900056214729880614121490811503771648, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=67387298533526090012054294623894223833611808433040615713182868869023111845198272384729088 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=92625034231027683207743389550561918238625735219641054774053070590062805268519684499570688 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=108593429542783765783463681223671867822367584437658234586495904345708564655703863339253760 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=117582078452722428830891253254214139845779520482832248073416019773147121389698156819644416 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=122351676526207532160530972171216526837599625494637402249741064511681055775339411367002112 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=124808545092254296156825372241634538726990502927618790804369154579883147120806448018227200 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126055418493932402336643142195672409860087984337537700948003637126467364043860685350764544 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126683518680420655000197706587558053459159792526214687179483677150243992603118215972782080 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=17719996037180055894680360489059, exp=-101, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=17719996037180055894680360489059 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=17719996037180055894680360489059, exp=-101, bc=104, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 17719996037180055894680360489059, -101, 104, 81, 'd') / result: (0, 1056194069217446797769091, -77, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 17719996037180055894680360489059, -101, 104, 81, 'd') / result: (0, 1056194069217446797769091, -77, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 1056194069217446797769091, -77, 80), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, -1, 1), (1, 2317598952353503, -46, 52)), prec=81, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 2317598952353503, -46, 52), x=(0, 1, -1, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 2317598952353503, -46, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 2317598952353503, -46, 52), x=(0, 1, -1, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 2317598952353503, -46, 52), t=(0, 1, -1, 1), prec=85, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2317598952353503, exp=-45, bc=52, prec=85, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 2317598952353503, -45, 52, 85, 'd') / result: (0, 2317598952353503, -45, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 2317598952353503, -45, 52, 85, 'd') / result: (0, 2317598952353503, -45, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 2317598952353503, -45, 52), prec=85, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 2317598952353503, -45, 52), prec=122, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=661242765625887095664038366018291429187 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=661242765625887095664038366018291429187, exp=-135, bc=129, prec=122, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 661242765625887095664038366018291429187, -135, 129, 122, 'd') / result: (0, 2582979553226121467437649867258950895, -127, 121)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 661242765625887095664038366018291429187, -135, 129, 122, 'd') / result: (0, 2582979553226121467437649867258950895, -127, 121)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2582979553226121467437649867258950895, -127, 121), prec=122 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=80718111038316295857426558351842215, prec=122 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=1, prec=122 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=121 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=2787593149816327892691964784081045188247552, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=664600476781160997046295488563773440, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=664600476781160997046295488563773440, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=10328999512347634358623676688012047497318823171316894051322637426162590488067364778518581413120551325743612687890989973504, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10328999512347634358623676688012047497318823171316894051322637426162590488067364778518581413120551325743612687890989973504 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=30029914574708654043708814807348761436030351443454986298718509317477438022062124524872795656503836279259546356635926274197294579195040433668812636961252449125591132385807646598506952315972477104935964297333093795331197630715978954398841659090334092305017532 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=30029914574708654043708814807348761436030351443454986298718509317477438022062124524872795656503836279259546356635926274197294579195040433668812636961252449125591132385807646598506952315972477104935964297333093795331197630715978954398841659090334092305017532 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=436, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=2787593149816327892691964784081045188247552, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=3138487016050771648187139513501314789921024079999965069312, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=3138487016050771648187139513501314789921024079999965069312, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=2787593149816327892691964784081045188247552, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=3138487016050771648187139513500276316217043990175626526738, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8271073902269514559669963827631307826, exp=-122, prec=85, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8271073902269514559669963827631307826 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8271073902269514559669963827631307826, exp=-122, bc=123, prec=85, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8271073902269514559669963827631307826, -122, 123, 85, 'd') / result: (0, 30089991568345847771233689, -84, 85)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8271073902269514559669963827631307826, -122, 123, 85, 'd') / result: (0, 30089991568345847771233689, -84, 85)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 30089991568345847771233689, -84, 85), prec=81, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=30089991568345847771233689, exp=-84, bc=85, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 30089991568345847771233689, -84, 85, 81, 'd') / result: (0, 1880624473021615485702105, -80, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 30089991568345847771233689, -84, 85, 81, 'd') / result: (0, 1880624473021615485702105, -80, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1880624473021615485702105, -80, 81), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1056194069217446797769091, -78, 80), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 1880624473021615485702105, -80, 81), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-122863943153406336185632980, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=122863943153406336185632980 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-198648327082194990838234308, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=198648327082194990838234308 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 30715985788351584046408245, -79, 85), (1, 49662081770548747709558577, -79, 86)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 30715985788351584046408245, -79, 85), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1127596001611179228235, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3806531279644368671043, exp=-145, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3806531279644368671043 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3806531279644368671043, exp=-145, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3806531279644368671043, -145, 72, 57, 'n') / result: (0, 116166115711803243, -130, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3806531279644368671043, -145, 72, 57, 'n') / result: (0, 116166115711803243, -130, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 49662081770548747709558577, -79, 86), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=49662081770548747709558577, exp=-79, mag=7, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=93, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=73907100998744616784553211, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=1260137940506411391752088555937469794672896426900661074261361765991836039544218502979266932400707261740720747922700776767488, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1260137940506411391752088555937469794672896426900661074261361765991836039544218502979266932400707261740720747922700776767488 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=106019458140208371369870199705439811593346223589437292794933134784335135253351138567333801689098332365844604631714411149224716325300118538117842771121391682182430026675884404905235109294216555045209873543167148571649132329399453594306995599641007914231928863419247 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=106019458140208371369870199705439811593346223589437292794933134784335135253351138567333801689098332365844604631714411149224716325300118538117842771121391682182430026675884404905235109294216555045209873543167148571649132329399453594306995599641007914231928863419247 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=137425960829125389478996596, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=137425960829125389478996596 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=137425960829125389478996596, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 137425960829125389478996596, -87, 87, 57, 'n') / result: (0, 63993949829193479, -56, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 137425960829125389478996596, -87, 87, 57, 'n') / result: (0, 63993949829193479, -56, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-71129094723757081606620302, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=71129094723757081606620302 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=71129094723757081606620302, exp=-87, bc=86, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 71129094723757081606620302, -87, 86, 57, 'n') / result: (1, 33122065814098847, -56, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 71129094723757081606620302, -87, 86, 57, 'n') / result: (1, 33122065814098847, -56, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 116166115711803243, -130, 57), t=(0, 63993949829193479, -56, 56), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=7433928580713421059563299426652397, exp=-186, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 7433928580713421059563299426652397, -186, 113, 53, 'n') / result: (0, 6447905213849259, -126, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 7433928580713421059563299426652397, -186, 113, 53, 'n') / result: (0, 6447905213849259, -126, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 116166115711803243, -130, 57), t=(1, 33122065814098847, -56, 55), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3847661729974569143304399417160821, exp=-186, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 3847661729974569143304399417160821, -186, 112, 53, 'n') / result: (1, 1668657282651105, -125, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 3847661729974569143304399417160821, -186, 112, 53, 'n') / result: (1, 1668657282651105, -125, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 6447905213849259, -126, 53), (1, 1668657282651105, -125, 51)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (7.57947615351738e-23 - 3.92299441842969e-23j) / count: 164
gamma__ / s: Complex { re: 0.5, im: -32.935062 } / result: Complex { re: 7.579476153517378e-23, im: -3.922994418429686e-23 }
zeta__ / s: Complex { re: 0.5, im: 32.935062 } / result: Complex { re: -3.0942393440028226e-7, im: 4.784577171292422e-7 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.5, 37.586178) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5+37.586178j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5+37.586178j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5+37.586178j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=37.586178, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5289784288596285, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5289784288596285 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5289784288596285, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5289784288596285, -47, 53, 53, 'd') / result: (0, 5289784288596285, -47, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5289784288596285, -47, 53, 53, 'd') / result: (0, 5289784288596285, -47, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 5289784288596285, -47, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='37.586177999999997') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 5289784288596285, -47, 53)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5289784288596285, -47, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5289784288596285, -47, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5289784288596285, -47, 53), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=346671303137446133760, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=375861779999999967571, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=375861779999999967571, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+37.586178j) / result: (0.5 + 37.586178j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+37.586178j) / result: (0.5 + 37.586178j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (0, 5289784288596285, -47, 53)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 5289784288596285, -47, 53)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 5289784288596285, -47, 53), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5289784288596285, -47, 53), t=(0, 5289784288596285, -47, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 27981817819880104992695715801225, -94, 105), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=27986769580037246513795312298121 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=27986769580037246513795312298121, exp=-94, bc=105, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 27986769580037246513795312298121, -94, 105, 14, 'd') / result: (0, 11303, -3, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 27986769580037246513795312298121, -94, 105, 14, 'd') / result: (0, 11303, -3, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 11303, -3, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=23148544 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=23148544 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=23148544 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4811, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4811 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4811, exp=-7, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4811, -7, 13, 10, 'd') / result: (0, 601, -4, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4811, -7, 13, 10, 'd') / result: (0, 601, -4, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 601, -4, 10), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 601, -4, 10), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 601, -4, 10), t=(0, 53, 0, 6), prec=5, rnd='f' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 711 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 601, -4, 10), t=(0, 53, 0, 6), prec=5, rnd='f', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=247 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=247, exp=-4, bc=8, prec=5, rnd='f' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 247, -4, 8, 5, 'f') / result: (1, 31, -1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 247, -4, 8, 5, 'f') / result: (1, 31, -1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (0, 5289784288596285, -47, 53)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5289784288596285, -47, 53), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5289784288596285, -47, 53), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5289784288596285, -47, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5289784288596285, exp=-47, bc=53, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5289784288596285, -47, 53, 73, 'd') / result: (1, 5289784288596285, -47, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5289784288596285, -47, 53, 73, 'd') / result: (1, 5289784288596285, -47, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 5289784288596285, -47, 53)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 5289784288596285, -47, 53), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5289784288596285, -47, 53), t=(1, 5289784288596285, -47, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 27981817819880104992695715801225, -94, 105), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=27986769580037246513795312298121 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=27986769580037246513795312298121, exp=-94, bc=105, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 27986769580037246513795312298121, -94, 105, 14, 'd') / result: (0, 11303, -3, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 27986769580037246513795312298121, -94, 105, 14, 'd') / result: (0, 11303, -3, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 11303, -3, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=23148544 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=23148544 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=23148544 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4811, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4811 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4811, exp=-7, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4811, -7, 13, 10, 'd') / result: (0, 601, -4, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4811, -7, 13, 10, 'd') / result: (0, 601, -4, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5289784288596285, -47, 53), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=66 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 66 / result: [1, 8713, 12655633, 7351241745, 2285982229521, 441808581649425, 58125820038849553, 5534937457293894673, 398678732818251883537, 22455844349670953690129, 1015028297108042534986769, 37589819283598340803372049, 1160011847021181044909253649, 30253190805979324735333704721, 674767160653374814850715591697, 13002022859803559821195490993169, 218340302267825391519623987700753, 3219719787376165890498436239041553, 41970863806219406555091545528574993, 486479007999607589655061436440093713, 5039838074801109619102188908726035473, 46882087710728501090630263892148069393, 393208530257569383989218876069943550993, 2984466473332676434391798791726801724433, 20567346168631319487389446552753036174353, 129078832288188659471603501306514940208145, 739721901235501533500415927077684870751249, 3880415812802393743739451184712772703593489, 18674307783260988609371893885287400716215313, 82611128253288938833254634752138666609845265, 336552285261366051869353882375847366741042193, 1264760258418335383072694971521841303973635089, 4391016279120627922195059056492723662013965329, 14103543142505279428354235868728602465734599697, 41962037666366259648391137225686123143307306001, 115789932056722480521366776432530070280560026641, 296662496482548245430041836179500648126208123921, 706488521764315620935814278108956381712052757521, 1565541390197044849452124652876173417656556561425, 3231583316854459110817090228182291305548927575057, 6220968672597351155734607573747382579077327463441, 11182574237443729039379701102429942982476466332689, 18797201251766196531491362140425266607888225641489, 29597263205869526621534276181729714671946928858129, 43743425859441652293288500581703722663898427794449, 60838913310949539497106339806641100611724958344209, 79878369235204142971592428307992762339571897050129, 99392613696576969227757533887049144069325794419729, 117768527231036380618979674973993903531510714442769, 133635295408065924980346320675828806294567081321489, 146168439564062999415284418593843850699324736775185, 155200284081061861830832898398089986368216295121937, 161119211313075679433255445842620220908509306659857, 164633341694849920827398140677611756384004025459729, 166515086139503694256521972075926711517472467821585, 167419076798486657972264529945342403057820943885329, 167806210507336826796477317758789084344887810565137, 167952865723855133259926968785774009409387601699857, 168001545581332124340898112320068555750137607332881, 168015536721015501177729453587928961362197293147153, 168018965921918289618129292133973178423976627905553, 168019668394722112422882652909155248088982772622353, 168019785381407249449113543046118430422389250958353, 168019800593390180282746613712816881052155375887377, 168019802041972216265181652676402584889192652055569, 168019802131806761132309407030733481251179459879953, 168019802134529020067676914738440478110633605571601]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 66 / result: [1, 8713, 12655633, 7351241745, 2285982229521, 441808581649425, 58125820038849553, 5534937457293894673, 398678732818251883537, 22455844349670953690129, 1015028297108042534986769, 37589819283598340803372049, 1160011847021181044909253649, 30253190805979324735333704721, 674767160653374814850715591697, 13002022859803559821195490993169, 218340302267825391519623987700753, 3219719787376165890498436239041553, 41970863806219406555091545528574993, 486479007999607589655061436440093713, 5039838074801109619102188908726035473, 46882087710728501090630263892148069393, 393208530257569383989218876069943550993, 2984466473332676434391798791726801724433, 20567346168631319487389446552753036174353, 129078832288188659471603501306514940208145, 739721901235501533500415927077684870751249, 3880415812802393743739451184712772703593489, 18674307783260988609371893885287400716215313, 82611128253288938833254634752138666609845265, 336552285261366051869353882375847366741042193, 1264760258418335383072694971521841303973635089, 4391016279120627922195059056492723662013965329, 14103543142505279428354235868728602465734599697, 41962037666366259648391137225686123143307306001, 115789932056722480521366776432530070280560026641, 296662496482548245430041836179500648126208123921, 706488521764315620935814278108956381712052757521, 1565541390197044849452124652876173417656556561425, 3231583316854459110817090228182291305548927575057, 6220968672597351155734607573747382579077327463441, 11182574237443729039379701102429942982476466332689, 18797201251766196531491362140425266607888225641489, 29597263205869526621534276181729714671946928858129, 43743425859441652293288500581703722663898427794449, 60838913310949539497106339806641100611724958344209, 79878369235204142971592428307992762339571897050129, 99392613696576969227757533887049144069325794419729, 117768527231036380618979674973993903531510714442769, 133635295408065924980346320675828806294567081321489, 146168439564062999415284418593843850699324736775185, 155200284081061861830832898398089986368216295121937, 161119211313075679433255445842620220908509306659857, 164633341694849920827398140677611756384004025459729, 166515086139503694256521972075926711517472467821585, 167419076798486657972264529945342403057820943885329, 167806210507336826796477317758789084344887810565137, 167952865723855133259926968785774009409387601699857, 168001545581332124340898112320068555750137607332881, 168015536721015501177729453587928961362197293147153, 168018965921918289618129292133973178423976627905553, 168019668394722112422882652909155248088982772622353, 168019785381407249449113543046118430422389250958353, 168019800593390180282746613712816881052155375887377, 168019802041972216265181652676402584889192652055569, 168019802131806761132309407030733481251179459879953, 168019802134529020067676914738440478110633605571601]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5289784288596285, -47, 53), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=178405961588244985132285746181186892047843328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-246061298023181219961847, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6146483429231888918604, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1714613919049707303531530330209999884554924646438604412519557812742990021019182553234084514578011520073439706189904335601664, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1714613919049707303531530330209999884554924646438604412519557812742990021019182553234084514578011520073439706189904335601664 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2940264111575659277088464534998090645042454600385133056056873302844942003197038408446297400148322748465394398910503223977156283895335124360254500464121754892104087498463648362645045901579050605298628333651642470445244869826817540403892381318432733404989651978293735 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2940264111575659277088464534998090645042454600385133056056873302844942003197038408446297400148322748465394398910503223977156283895335124360254500464121754892104087498463648362645045901579050605298628333651642470445244869826817540403892381318432733404989651978293735 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=267608942382367477698428619271780338071764992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-389997930245514990429765, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10567369708317594262716, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2954093860531423426566371532771445584233183426996631698678274303882500879587266326656314284152477679162673228736823132422144, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2954093860531423426566371532771445584233183426996631698678274303882500879587266326656314284152477679162673228736823132422144 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=104210484355601736922773500142536238139439785498329775339050904222349840587096938420066145669422779036381294613746947092310206585607855390871249361176824303584845923307915674799669331759257752649878167795260311888193689524540253973397136441222207709799102825665766000 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=104210484355601736922773500142536238139439785498329775339050904222349840587096938420066145669422779036381294613746947092310206585607855390871249361176824303584845923307915674799669331759257752649878167795260311888193689524540253973397136441222207709799102825665766000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=356811923176489970264571492362373784095686656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-492122596046362439923731, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12292966858463777837171, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3439556837611762241421684337108011816607168116048525719090438262912142632526432471246687610569143591472623025067699661176832, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3439556837611762241421684337108011816607168116048525719090438262912142632526432471246687610569143591472623025067699661176832 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=119800921194757357279977445853236437638807216252719189258419845599872219021179494452966759221978778540927173199324334043841335455575384120909346404452248835254841002053719745518471022175315404832804986747216619183173223584290487505060073092999788485255321294077673472 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=119800921194757357279977445853236437638807216252719189258419845599872219021179494452966759221978778540927173199324334043841335455575384120909346404452248835254841002053719745518471022175315404832804986747216619183173223584290487505060073092999788485255321294077673472 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=446014903970612462830714365452967230119608320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-571336640944476669016506, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7257681211059286650411, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=535217884764734955396857238543560676143529984 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-636059228268696210391611, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1878101287407535600118, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=516449975617381717931183834400602374865941158565844702566131871308129524403368238925929070656027566287180634394549498675200, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=516449975617381717931183834400602374865941158565844702566131871308129524403368238925929070656027566287180634394549498675200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1186006087193288929827271127775995810871433314964527647939844352948704669968239684769546246119511513260262598885734050036837812399470068542748036568793305126036912264253248805104681138380980766527791280225871320388261006257732511462405365372229444719253122028092 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1186006087193288929827271127775995810871433314964527647939844352948704669968239684769546246119511513260262598885734050036837812399470068542748036568793305126036912264253248805104681138380980766527791280225871320388261006257732511462405365372229444719253122028092 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=624420865558857447963000111634154122167451648 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-690781396133260809406568, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6498940823410726909973, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1817903914173183647117767097090120359528112878151773353032784187004615925899856201019270328709217033330875833068814235336704, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1817903914173183647117767097090120359528112878151773353032784187004615925899856201019270328709217033330875833068814235336704 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3246429755860175673276121413799759423298270257078123598837787800857237452349816572263054905230983328624872412097546021257008383747043831714844645492737034958791915664530811247041275874325193410777503783174346513016846000263652809972562542470648457077448025502607580 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3246429755860175673276121413799759423298270257078123598837787800857237452349816572263054905230983328624872412097546021257008383747043831714844645492737034958791915664530811247041275874325193410777503783174346513016846000263652809972562542470648457077448025502607580 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=713623846352979940529142984724747568191373312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-738183894069543659885615, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3603698437553719174535, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1001912952697720532786496638737168607239925847617738722978295830337771277342534383516302397072693478597130430725426027429888, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1001912952697720532786496638737168607239925847617738722978295830337771277342534383516302397072693478597130430725426027429888 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=68937492073070881491976160608708609221072973290836635007849284559539979479741976108106980879679776704744598310059382896732281283872874961515377330844435193780444939999187250971079460879946307064695430059562948297287601623273714925966230389881563059139028649498911 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=68937492073070881491976160608708609221072973290836635007849284559539979479741976108106980879679776704744598310059382896732281283872874961515377330844435193780444939999187250971079460879946307064695430059562948297287601623273714925966230389881563059139028649498911 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=802826827147102433095285857815341014215294976 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-779995860491029980859530, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6298987566493240944229, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1755929917099097840966025036962048074544199939123871988724848362447640382971452012348158840230493725376414156941468295495680, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1755929917099097840966025036962048074544199939123871988724848362447640382971452012348158840230493725376414156941468295495680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3062036019253733908033927419318046838495347787931830558911614227156129015500645392575934691733358579600397968487265227283413771358130429472294374366808794318895457117296148048902340073155298949132431447980077413664975598220677878570271140825275065332737394716293055 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3062036019253733908033927419318046838495347787931830558911614227156129015500645392575934691733358579600397968487265227283413771358130429472294374366808794318895457117296148048902340073155298949132431447980077413664975598220677878570271140825275065332737394716293055 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=892029807941224925661428730905934460239216640 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-817397938967657888978390, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13404164640291175568978, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3749426822982191272180394637748373241526732811188032540630117385697020347168453414602245052962760131244931405704429360381952, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3749426822982191272180394637748373241526732811188032540630117385697020347168453414602245052962760131244931405704429360381952 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125989088853671904381375058455031473958623771202829032444780460030872192612279268925983691258777217420847094778874903157334183039133658452732291804296804374922889048347460592884994005247415607116310231786394111964677366049917473080534781001821143307586693645427888732 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125989088853671904381375058455031473958623771202829032444780460030872192612279268925983691258777217420847094778874903157334183039133658452732291804296804374922889048347460592884994005247415607116310231786394111964677366049917473080534781001821143307586693645427888732 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=981232788735347418227571603996527906263138304 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-851232234504328199366946, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9241372803904760342828, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2582249878086908589655919172003011874329705792829223512830659356540647622016841194629645353280137831435903171972747493376000, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2582249878086908589655919172003011874329705792829223512830659356540647622016841194629645353280137831435903171972747493376000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5534299629386742176206069814894047641642079025465520836853720336413870540617667000174284349876620087985031850553471081222303199028508976929406605191118911951450323295585042945473983930323545989290148677241284734902898383446358553844854330393105926893433031857846652 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5534299629386742176206069814894047641642079025465520836853720336413870540617667000174284349876620087985031850553471081222303199028508976929406605191118911951450323295585042945473983930323545989290148677241284734902898383446358553844854330393105926893433031857846652 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1070435769529469910793714477087121352287059968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-882120526291877430353495, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8024584716639424518685, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2241392894179436655821337841298614306918184628175766009137012321477282135910618156938532166647159637686363953272344824250368, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2241392894179436655821337841298614306918184628175766009137012321477282135910618156938532166647159637686363953272344824250368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4531142383613209974926789520925099185639640139180924290395083198013952789300885344899226529202703015689596416577392026132613140196888191087229556811111409546870851899498407278357174573806529967892407232811366846936570388498759941356368941572757281154212112648443951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4531142383613209974926789520925099185639640139180924290395083198013952789300885344899226529202703015689596416577392026132613140196888191087229556811111409546870851899498407278357174573806529967892407232811366846936570388498759941356368941572757281154212112648443951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1159638750323592403359857350177714798310981632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-910535000302331991186737, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9281614406468758847849, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2592578877599256224014542848691023921827024616000540406881981993966810212504908559408163934693258382761646784660638483349504, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2592578877599256224014542848691023921827024616000540406881981993966810212504908559408163934693258382761646784660638483349504 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5563468706642460549164840095229935852472179017889372513526793561849474255263092270415872528712518689694661058450567771641715179021558139126373424395276635518416429146035589856661613869197457430994110762345019955957406737265684769245402357887683340750493348287265792 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5563468706642460549164840095229935852472179017889372513526793561849474255263092270415872528712518689694661058450567771641715179021558139126373424395276635518416429146035589856661613869197457430994110762345019955957406737265684769245402357887683340750493348287265792 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1248841731117714895926000223268308244334903296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-936842694156442029368415, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12645424252642615828577, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1338044711911837388492143096358901690358824960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-961334571189991659446309, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2989299069234933331886, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=836648960500158383048517811728975847282824676876668418157133631519169829533456547060005094462764657385232627719170187853824, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=836648960500158383048517811728975847282824676876668418157133631519169829533456547060005094462764657385232627719170187853824 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=48778091743787732406228703341497673701287949857783959858323768055271712268778369367511097380879413519225407070589529588450909421111186730224287589114795077027700087754629897032676127505705061795004962816435061957404001236521799133794925286782060369059109099605692 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=48778091743787732406228703341497673701287949857783959858323768055271712268778369367511097380879413519225407070589529588450909421111186730224287589114795077027700087754629897032676127505705061795004962816435061957404001236521799133794925286782060369059109099605692 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1427247692705959881058285969449495136382746624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-984245192092724879847499, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9750181866785608093102, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2726855871259775470676650645635180539292169317227660029549176280506923888849784301528905493063825549996313749603221353005056, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2726855871259775470676650645635180539292169317227660029549176280506923888849784301528905493063825549996313749603221353005056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=94936204689650800525774224150537880501239672113822390714662574749314310478075643837864413676430676973986705929052002402042903068857183766914814926447714550269670870264903923577542996217049177349803210476652666597452785248954207206938802154900469370210198693464858460 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=94936204689650800525774224150537880501239672113822390714662574749314310478075643837864413676430676973986705929052002402042903068857183766914814926447714550269670870264903923577542996217049177349803210476652666597452785248954207206938802154900469370210198693464858460 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1516450673500082373624428842540088582406668288 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1005766412339578832944531, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3064713470073602577273, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=857306959524853651765765165104999942277462323219302206259778906371495010509591276617042257289005760036719853094952167800832, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=857306959524853651765765165104999942277462323219302206259778906371495010509591276617042257289005760036719853094952167800832 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=51130662122861340826362850638154492609527610941294827529693817956963493298041425031576217807977629727988613724286531400189596022384512889699240406179209096243711072305372917572602848015442213367925938217786293681663652843939387604877364144395824320616518912718695 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=51130662122861340826362850638154492609527610941294827529693817956963493298041425031576217807977629727988613724286531400189596022384512889699240406179209096243711072305372917572602848015442213367925938217786293681663652843939387604877364144395824320616518912718695 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1605653654294204866190571715630682028430589952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1026057158514211200821414, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12445470995725129862796, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3480872835661152778856179043860060006596443408733793295295728812616792994478701930360761936221625796775597475819263621070848, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3480872835661152778856179043860060006596443408733793295295728812616792994478701930360761936221625796775597475819263621070848 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=120809929021809730120498752791152010150692202668572189727033402382702927374861856937825859679329665203557079157335933313256766174385949040831510970783417790084429626366071744758690471619344685851849020214917269601769580320992608692935393447443905954632497041831276912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=120809929021809730120498752791152010150692202668572189727033402382702927374861856937825859679329665203557079157335933313256766174385949040831510970783417790084429626366071744758690471619344685851849020214917269601769580320992608692935393447443905954632497041831276912 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1694856635088327358756714588721275474454511616 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1045250557866313238448020, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8087823493765039817393, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2262050893204131924538585194674638401912822274518399797239657596329607316886752886495569329473400740337851178648126804197376, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2262050893204131924538585194674638401912822274518399797239657596329607316886752886495569329473400740337851178648126804197376 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4593568771790244644205861774561467907132385107110513026632200433876162069256428416270798832906329904436715687204361180071091617935914798479665382961677920332619508928971401289864521400332905618275621357857035509383034993841194602849159649589383556195167658443660775 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4593568771790244644205861774561467907132385107110513026632200433876162069256428416270798832906329904436715687204361180071091617935914798479665382961677920332619508928971401289864521400332905618275621357857035509383034993841194602849159649589383556195167658443660775 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1784059615882449851322857461811868920478433280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1063459236990839108940274, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4714896219381116906342, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1873262596676572343889000334902462366502354944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1080779326378775799836333, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2230558681586373591486, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=619739970740858061517420601280722849839129390279013643079358245569755429284041886711114884787233079544616761273459398410240, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=619739970740858061517420601280722849839129390279013643079358245569755429284041886711114884787233079544616761273459398410240 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1698290607877147267021393177971009539428728028659885653954187505279107493119322147374577704983224334929219401897616217740141605006791910114172137287625477623118040246750689130609280871526165473910442426839654486885656618903024066193881217034501871603112920292615 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1698290607877147267021393177971009539428728028659885653954187505279107493119322147374577704983224334929219401897616217740141605006791910114172137287625477623118040246750689130609280871526165473910442426839654486885656618903024066193881217034501871603112920292615 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1962465577470694836455143207993055812526276608 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1097293532527509419328792, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=552104382994701680230, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2051668558264817329021286081083649258550198272 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1113073526595669234073918, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14443614015118782097510, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4038638809327925034221857585012710571451659859984905574067151233629572880834339628400765332530135568365752560965377079640064, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4038638809327925034221857585012710571451659859984905574067151233629572880834339628400765332530135568365752560965377079640064 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128734783179757975160383333588258133304976557781984094772737844193459909080216128270148953453758002840876547969338026883027114942340683925147520795635018023279661236523110604832370745129648021163501714177757992636308836088411502719163218689322577864912913091022909020 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128734783179757975160383333588258133304976557781984094772737844193459909080216128270148953453758002840876547969338026883027114942340683925147520795635018023279661236523110604832370745129648021163501714177757992636308836088411502719163218689322577864912913091022909020 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2140871539058939821587428954174242704574119936 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1128181824315058650315379, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14171068145871313437252, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3966335812741491593711491848196626238970428097785687315707892771646434747417868074951135262638291709085547272150140149825536, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3966335812741491593711491848196626238970428097785687315707892771646434747417868074951135262638291709085547272150140149825536 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128332782343142608585323878678335477232873318640892385779288611573151599006978464847461599385633557631829159387996686533619142911816543098090226992098431232149452680995782393047242669843803131925309799785309873116285027226144146517034120603027257435862406649951813632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128332782343142608585323878678335477232873318640892385779288611573151599006978464847461599385633557631829159387996686533619142911816543098090226992098431232149452680995782393047242669843803131925309799785309873116285027226144146517034120603027257435862406649951813632 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2230074519853062314153571827264836150598041600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1142673281888953338033050, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14515362422118573300784, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 1339331681388793535432985124952757, -108, 111, 88, 'd') / result: (0, 159660778211211387566683903, -85, 88)

[2]libmpf._normalize. / x: (0, 1344524089020581735847763222434568, -108, 111, 88, 'd') / result: (0, 80139880718027456751332475, -84, 87)

[2]libmpf._normalize. / x: (0, 1349634723046378865077652794442106, -108, 111, 88, 'd') / result: (0, 80444498243712119166711139, -84, 87)

[2]libmpf._normalize. / x: (0, 1354666119236680762605276273748079, -108, 111, 88, 'd') / result: (0, 10093049103294914682248803, -81, 84)

[2]libmpf._normalize. / x: (0, 1359620697210584563728870961324139, -108, 111, 88, 'd') / result: (0, 162079417373011656252011175, -85, 88)

[2]libmpf._normalize. / x: (0, 3007754894387978, -73, 52, 73, 'd') / result: (0, 1503877447193989, -72, 51)

[2]libmpf._normalize. / x: (1, 1345165353863587, -73, 51, 73, 'd') / result: (1, 1345165353863587, -73, 51)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 35461170242799984199875339972134696945385, -130, 135, 83, 'd') / result: (1, 3936980768370899519390009, -77, 82)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (0, 98298381045174051650345214866124, -107, 107, 77, 'd') / result: (0, 11443437664440606214379, -74, 74)

[2]libmpf._normalize. / x: (1, 129094930965693085154455917976031, -107, 107, 77, 'd') / result: (1, 120229023476776746245525, -77, 77)

[3]libmpf._normalize1 / x: (0, 1222788023832698228701418015703218236249209893, -150, 150, 73, 'd') / result: (0, 4045866186305750096437, -72, 72)

[3]libmpf._normalize1 / x: (1, 12847066968463229555868475679448943574194787675, -153, 154, 73, 'd') / result: (1, 5313422362241591249003, -72, 73)

[2]libmpf._normalize1 / x: (0, 676500296563895117259, -72, 70, 73, 'd') / result: (0, 676500296563895117259, -72, 70)

[2]libmpf._normalize1 / x: (0, 5313422362241591249003, -72, 73, 73, 'd') / result: (0, 5313422362241591249003, -72, 73)

[2]libmpf._normalize. / x: (0, 28690109850820049777685781262363370908167090, -144, 145, 63, 'd') / result: (0, 2966487830076872777, -61, 62)

[3]libmpf._normalize1 / x: (1, 5112684594086432286589232439661841459, -145, 122, 63, 'd') / result: (1, 8869093990626686849, -86, 63)

[3]libmpf._normalize1 / x: (1, 16891476876798871394865517580343033967, -145, 124, 63, 'd') / result: (1, 7325510370525599877, -84, 63)

[3]libmpf._normalize1 / x: (1, 861740362163215673, -83, 60, 53, 'n') / result: (1, 3366173289700061, -75, 52)

[3]libmpf._normalize1 / x: (1, 711762437786621147, -81, 60, 53, 'n') / result: (1, 2780322022603989, -73, 52)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (0, 5289784288596285, -47, 53)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 3366173289700061, -75, 52), (1, 2780322022603989, -73, 52))

zeta_ / result: (-8.91018650794796e-8 - 2.94378044640287e-7j) / count: 741
zeta / count: 0 / s: Complex { re: 0.5, im: 37.586178 }
gamma_ / s: (0.5, -37.586178) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-37.586178j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-37.586178j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-37.586178, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5289784288596285, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5289784288596285 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5289784288596285, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5289784288596285, -47, 53, 53, 'd') / result: (1, 5289784288596285, -47, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5289784288596285, -47, 53, 53, 'd') / result: (1, 5289784288596285, -47, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 5289784288596285, -47, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-37.586177999999997') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 5289784288596285, -47, 53)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5289784288596285, -47, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5289784288596285, -47, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5289784288596285, -47, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5289784288596285, -47, 53), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=346671303137446133760, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=375861779999999967571, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=375861779999999967571, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-37.586178j) / result: (0.5 - 37.586178j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-37.586178j) / result: (0.5 - 37.586178j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 5289784288596285, -47, 53)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 5289784288596285, -47, 53)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 5289784288596285, -47, 53)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5289784288596285, -47, 53), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=222 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 5289784288596285, -47, 53), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1208925819614629174706176, y=-90877802089662679288381440, prec=81 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=81, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, -1, 1), (1, 5289784288596285, -47, 53)), prec=81, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, -1, 1), b=(1, 5289784288596285, -47, 53), prec=81, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5289784288596285, -47, 53), t=(1, 5289784288596285, -47, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 27981817819880104992695715801225, -94, 105), prec=101, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=27986769580037246513795312298121 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=27986769580037246513795312298121, exp=-94, bc=105, prec=101, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 27986769580037246513795312298121, -94, 105, 101, 'd') / result: (0, 218646637344040988389025877329, -87, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 27986769580037246513795312298121, -94, 105, 101, 'd') / result: (0, 218646637344040988389025877329, -87, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 218646637344040988389025877329, -87, 98), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=218491894839130315854663486801 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=218491894839130315854663486801, exp=-87, bc=98, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 218491894839130315854663486801, -87, 98, 10, 'd') / result: (0, 705, 1, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 218491894839130315854663486801, -87, 98, 10, 'd') / result: (0, 705, 1, 10)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 218646637344040988389025877329, -87, 98), prec=81, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=218646637344040988389025877329, n=3 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=1749173098752327907112207018632, prec=101 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=246005095471290936530065892195152237862846464, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=87777551226327342340424966797913878277730510615731872128241891921642651222712140781584384 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=105713655031697561994167217439306514414876462878101651244279427127595317340561802604314624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=116012531243768312170391258783417467568338847092001333347698527229512356222768661569470464 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=121532325907858938467189655124659310729963140126854249199977206269699258703440744514846720 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=124389941354274198513842565564216449342335428266352093312816043691764390421069497179832320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125843848089803690748101879196671346137920835808891107117281455652778249670906133845377024 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126577161733293640068800635578926954306610329578154636053384161794503780873223683574857728 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126945419431203769515378400345057853120120065683917496907459318701847546459611118757216256 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=18389679733616629850236273303311, exp=-101, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18389679733616629850236273303311 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=18389679733616629850236273303311, exp=-101, bc=104, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 18389679733616629850236273303311, -101, 104, 81, 'd') / result: (0, 2192220656110838633803877, -78, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 18389679733616629850236273303311, -101, 104, 81, 'd') / result: (0, 2192220656110838633803877, -78, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 2192220656110838633803877, -78, 81), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, -1, 1), (1, 5289784288596285, -47, 53)), prec=81, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 5289784288596285, -47, 53), x=(0, 1, -1, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5289784288596285, -47, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5289784288596285, -47, 53), x=(0, 1, -1, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5289784288596285, -47, 53), t=(0, 1, -1, 1), prec=85, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5289784288596285, exp=-46, bc=53, prec=85, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5289784288596285, -46, 53, 85, 'd') / result: (0, 5289784288596285, -46, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5289784288596285, -46, 53, 85, 'd') / result: (0, 5289784288596285, -46, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 5289784288596285, -46, 53), prec=85, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 5289784288596285, -46, 53), prec=122, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=579417026198834676422578901060470030875 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=579417026198834676422578901060470030875, exp=-135, bc=129, prec=122, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 579417026198834676422578901060470030875, -135, 129, 122, 'd') / result: (0, 1131673879294598977387849416133730529, -126, 120)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 579417026198834676422578901060470030875, -135, 129, 122, 'd') / result: (0, 1131673879294598977387849416133730529, -126, 120)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1131673879294598977387849416133730529, -126, 120), prec=122 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=70729617455912436086740588508358158, prec=122 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=1, prec=122 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=121 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8281060367295368064099348603009160453, exp=-122, prec=85, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8281060367295368064099348603009160453 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8281060367295368064099348603009160453, exp=-122, bc=123, prec=85, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8281060367295368064099348603009160453, -122, 123, 85, 'd') / result: (0, 30126322116467665415618643, -84, 85)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8281060367295368064099348603009160453, -122, 123, 85, 'd') / result: (0, 30126322116467665415618643, -84, 85)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 30126322116467665415618643, -84, 85), prec=81, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=30126322116467665415618643, exp=-84, bc=85, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 30126322116467665415618643, -84, 85, 81, 'd') / result: (0, 1882895132279229088476165, -80, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 30126322116467665415618643, -84, 85, 81, 'd') / result: (0, 1882895132279229088476165, -80, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1882895132279229088476165, -80, 81), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2192220656110838633803877, -79, 81), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 1882895132279229088476165, -80, 81), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-140528660670775868607245745, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=140528660670775868607245745 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-238705621231511381772484558, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=238705621231511381772484558 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 140528660670775868607245745, -81, 87), (1, 119352810615755690886242279, -80, 87)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 140528660670775868607245745, -81, 87), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=243370366914394467283, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2617538118143577812025, exp=-155, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2617538118143577812025 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2617538118143577812025, exp=-155, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2617538118143577812025, -155, 72, 57, 'n') / result: (0, 19970231003903029, -138, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2617538118143577812025, -155, 72, 57, 'n') / result: (0, 19970231003903029, -138, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 119352810615755690886242279, -80, 87), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=119352810615755690886242279, exp=-80, mag=7, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=93, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=206884343427736944872253346, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-35855752706301129072057360, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=35855752706301129072057360 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=35855752706301129072057360, exp=-87, bc=85, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 35855752706301129072057360, -87, 85, 57, 'n') / result: (1, 33393271925208279, -57, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 35855752706301129072057360, -87, 85, 57, 'n') / result: (1, 33393271925208279, -57, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=150531085905516846737575065, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=150531085905516846737575065 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=150531085905516846737575065, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 150531085905516846737575065, -87, 87, 57, 'n') / result: (0, 17524124810648715, -54, 54)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 150531085905516846737575065, -87, 87, 57, 'n') / result: (0, 17524124810648715, -54, 54)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 19970231003903029, -138, 55), t=(1, 33393271925208279, -57, 55), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=666871354322558963471422743977091, exp=-195, bc=110, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 666871354322558963471422743977091, -195, 110, 53, 'n') / result: (1, 2313674787599581, -137, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 666871354322558963471422743977091, -195, 110, 53, 'n') / result: (1, 2313674787599581, -137, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 19970231003903029, -138, 55), t=(0, 17524124810648715, -54, 54), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=349960820609883265738746443457735, exp=-192, bc=109, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 349960820609883265738746443457735, -192, 109, 53, 'n') / result: (0, 1214170502368145, -134, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 349960820609883265738746443457735, -192, 109, 53, 'n') / result: (0, 1214170502368145, -134, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 2313674787599581, -137, 52), (0, 1214170502368145, -134, 51)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.32798420042152e-26 + 5.5751975252688e-26j) / count: 143
gamma__ / s: Complex { re: 0.5, im: -37.586178 } / result: Complex { re: -1.3279842004215153e-26, im: 5.575197525268802e-26 }
zeta__ / s: Complex { re: 0.5, im: 37.586178 } / result: Complex { re: -8.910186507947958e-8, im: -2.943780446402868e-7 } / z: Complex { re: -0.0, im: 0.0 }

test_real_part_greater_than_one___¶

In [ ]:
inl test_real_part_greater_than_one___ log = run_test log (3u8, 2u8) fun zeta, gamma =>
    inl points = ;[2; 3; 4; 5; 10; 20; 50]
    (a points : _ i32 _)
    |> am.iter fun point =>
        inl s = .^(point, 0)
        inl result = zeta s
        result |> re |> _assert_gt 0
        result |> im |> _assert_eq 0
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_real_part_greater_than_one___ true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (2.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(2+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(2+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(2+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 1, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 1, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2+0j) / result: (2.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2+0j) / result: (2.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 1, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 1, 1, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=2, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=146733021972660147120595982891276473012026808, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=146733021972660147120595982891276473012026808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=146733021972660147120595982891276473012026808, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=146733021972660147120595982891276473012026808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=146733021972660147120595982891276473012026808, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 146733021972660147120595982891276473012026808, -146, 147, 53, 'n') / result: (0, 7408124450506707, -52, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 146733021972660147120595982891276473012026808, -146, 147, 53, 'n') / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 2 / prec: 53 / rnd: n / result: (0, 7408124450506707, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 2 / prec: 53 / rnd: n / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 1, 1, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 7408124450506707, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 1, 1, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7408124450506707, -52, 53), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7408124450506707, -52, 53), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 7408124450506707, -52, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.64493406684823 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 2.0, im: 0.0 }
zeta__ / s: Complex { re: 2.0, im: 0.0 } / result: Complex { re: 1.6449340668482264, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (3.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(3+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(3+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(3+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=3.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, 0, 2), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='3.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, 0, 2), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3, 0, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, 0, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 0, 2), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (3+0j) / result: (3.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (3+0j) / result: (3.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 3, 0, 2), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 3, 0, 2), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 3, 0, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=3, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=107227058845987649992062771777817500340443569, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=107227058845987649992062771777817500340443569 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=107227058845987649992062771777817500340443569, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=107227058845987649992062771777817500340443569 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=107227058845987649992062771777817500340443569, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 107227058845987649992062771777817500340443569, -146, 147, 53, 'n') / result: (0, 5413583021147681, -52, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 107227058845987649992062771777817500340443569, -146, 147, 53, 'n') / result: (0, 5413583021147681, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 3 / prec: 53 / rnd: n / result: (0, 5413583021147681, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 3 / prec: 53 / rnd: n / result: (0, 5413583021147681, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 3, 0, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 5413583021147681, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 3, 0, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 5413583021147681, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 3, 0, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5413583021147681, -52, 53), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 3, 0, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5413583021147681, -52, 53), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5413583021147681, -52, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.20205690315959 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 3.0, im: 0.0 }
zeta__ / s: Complex { re: 3.0, im: 0.0 } / result: Complex { re: 1.2020569031595942, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (4.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(4+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(4+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(4+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=4.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -50, 53, 53, 'd') / result: (0, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -50, 53, 53, 'd') / result: (0, 1, 2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 2, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='4.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 2, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (4+0j) / result: (4.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (4+0j) / result: (4.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 2, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 1, 2, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 2, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=4, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=96546458629767209991975301597999168271649827, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=96546458629767209991975301597999168271649827 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=96546458629767209991975301597999168271649827, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=96546458629767209991975301597999168271649827 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=96546458629767209991975301597999168271649827, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 96546458629767209991975301597999168271649827, -146, 147, 53, 'n') / result: (0, 609293814004489, -49, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 96546458629767209991975301597999168271649827, -146, 147, 53, 'n') / result: (0, 609293814004489, -49, 50)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 4 / prec: 53 / rnd: n / result: (0, 609293814004489, -49, 50)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 4 / prec: 53 / rnd: n / result: (0, 609293814004489, -49, 50)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 1, 2, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 609293814004489, -49, 50)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 1, 2, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 609293814004489, -49, 50)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 1, 2, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 609293814004489, -49, 50), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 1, 2, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 609293814004489, -49, 50), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 609293814004489, -49, 50), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.08232323371114 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 4.0, im: 0.0 }
zeta__ / s: Complex { re: 4.0, im: 0.0 } / result: Complex { re: 1.0823232337111381, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (5.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(5+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(5+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(5+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=5.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -50, 53, 53, 'd') / result: (0, 5, 0, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -50, 53, 53, 'd') / result: (0, 5, 0, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, 0, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='5.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, 0, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 0, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 0, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 0, 3), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (5+0j) / result: (5.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (5+0j) / result: (5.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5, 0, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 5, 0, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 0, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=5, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=92497046626946578196606270681831447376742251, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=92497046626946578196606270681831447376742251 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=92497046626946578196606270681831447376742251, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=92497046626946578196606270681831447376742251 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=92497046626946578196606270681831447376742251, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 92497046626946578196606270681831447376742251, -146, 147, 53, 'n') / result: (0, 2334953725836903, -51, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 92497046626946578196606270681831447376742251, -146, 147, 53, 'n') / result: (0, 2334953725836903, -51, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 5 / prec: 53 / rnd: n / result: (0, 2334953725836903, -51, 52)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 5 / prec: 53 / rnd: n / result: (0, 2334953725836903, -51, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 5, 0, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 2334953725836903, -51, 52)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 5, 0, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 2334953725836903, -51, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 5, 0, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 2334953725836903, -51, 52), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 5, 0, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 2334953725836903, -51, 52), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 2334953725836903, -51, 52), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.03692775514337 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 5.0, im: 0.0 }
zeta__ / s: Complex { re: 5.0, im: 0.0 } / result: Complex { re: 1.03692775514337, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (10.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(10+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(10+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(10+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=10.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -49, 53, 53, 'd') / result: (0, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -49, 53, 53, 'd') / result: (0, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, 1, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='10.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, 1, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 1, 3), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (10+0j) / result: (10.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (10+0j) / result: (10.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5, 1, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 5, 1, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=10, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=89291699860147561155657779990449914567168072, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=89291699860147561155657779990449914567168072 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=89291699860147561155657779990449914567168072, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=89291699860147561155657779990449914567168072 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=89291699860147561155657779990449914567168072, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 89291699860147561155657779990449914567168072, -146, 147, 53, 'n') / result: (0, 4508078795545529, -52, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 89291699860147561155657779990449914567168072, -146, 147, 53, 'n') / result: (0, 4508078795545529, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 10 / prec: 53 / rnd: n / result: (0, 4508078795545529, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 10 / prec: 53 / rnd: n / result: (0, 4508078795545529, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 5, 1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 4508078795545529, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 5, 1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 4508078795545529, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 5, 1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 4508078795545529, -52, 53), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 5, 1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 4508078795545529, -52, 53), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 4508078795545529, -52, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.00099457512782 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 10.0, im: 0.0 }
zeta__ / s: Complex { re: 10.0, im: 0.0 } / result: Complex { re: 1.000994575127818, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (20.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(20+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(20+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(20+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=20.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -48, 53, 53, 'd') / result: (0, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -48, 53, 53, 'd') / result: (0, 5, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, 2, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='20.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, 2, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 2, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 2, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 2, 3), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (20+0j) / result: (20.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (20+0j) / result: (20.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5, 2, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 5, 2, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 2, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=20, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=89203065890379478443205241488015099897881099, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=89203065890379478443205241488015099897881099 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=89203065890379478443205241488015099897881099, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=89203065890379478443205241488015099897881099 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=89203065890379478443205241488015099897881099, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 89203065890379478443205241488015099897881099, -146, 147, 53, 'n') / result: (0, 1125900980908389, -50, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 89203065890379478443205241488015099897881099, -146, 147, 53, 'n') / result: (0, 1125900980908389, -50, 51)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 20 / prec: 53 / rnd: n / result: (0, 1125900980908389, -50, 51)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 20 / prec: 53 / rnd: n / result: (0, 1125900980908389, -50, 51)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 5, 2, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 1125900980908389, -50, 51)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 5, 2, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 1125900980908389, -50, 51)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 5, 2, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 1125900980908389, -50, 51), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 5, 2, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 1125900980908389, -50, 51), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1125900980908389, -50, 51), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.00000095396203 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 20.0, im: 0.0 }
zeta__ / s: Complex { re: 20.0, im: 0.0 } / result: Complex { re: 1.0000009539620338, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (50.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(50+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(50+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(50+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=50.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7036874417766400, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7036874417766400, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7036874417766400, -47, 53, 53, 'd') / result: (0, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7036874417766400, -47, 53, 53, 'd') / result: (0, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 25, 1, 5), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='50.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 25, 1, 5), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 25, 1, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 1, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 1, 5), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (50+0j) / result: (50.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (50+0j) / result: (50.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 25, 1, 5), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 25, 1, 5), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 25, 1, 5), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=50, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=9444732965739298816001, exp=-73, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 965 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=9444732965739298816001 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=9444732965739298816001, exp=-73, bc=74, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9444732965739298816001, -73, 74, 53, 'n') / result: (0, 1125899906842625, -50, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9444732965739298816001, -73, 74, 53, 'n') / result: (0, 1125899906842625, -50, 51)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[5]gammazeta.mpf_zeta_int / s: 50 / prec: 53 / rnd: n / result: (0, 1125899906842625, -50, 51)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 966 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[5]gammazeta.mpf_zeta_int / s: 50 / prec: 53 / rnd: n / result: (0, 1125899906842625, -50, 51)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 966 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 25, 1, 5) / prec: 53 / rnd: n / alt: 0 / result: (0, 1125899906842625, -50, 51)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 25, 1, 5) / prec: 53 / rnd: n / alt: 0 / result: (0, 1125899906842625, -50, 51)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 25, 1, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 1125899906842625, -50, 51), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 25, 1, 5), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 1125899906842625, -50, 51), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1125899906842625, -50, 51), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.0 + 0.0j) / count: 43
zeta / count: 0 / s: Complex { re: 50.0, im: 0.0 }
zeta__ / s: Complex { re: 50.0, im: 0.0 } / result: Complex { re: 1.0000000000000009, im: 0.0 } / z: Complex { re: NaN, im: NaN }

test_zeta_at_1___¶

In [ ]:
inl test_zeta_at_1___ log = run_test log (6u8, 5u8) fun zeta, gamma =>
    inl s = .^(1, 0)
    inl result = zeta s
    result |> re |> _assert_eq limit.max
    result |> im |> _assert_eq 0
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_zeta_at_1___ true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (1.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(1+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(1+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(1+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1+0j) / result: (1.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1+0j) / result: (1.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 0, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 1, 0, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=1, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
zeta / count: 0 / s: Complex { re: 1.0, im: 0.0 }
call(zeta_) / f_code.co_name: _fix_up_module / f_locals: ns={'__name__': '', '__doc__': None, '__package__': None, '__loader__': <_frozen_importlib_external.SourceFileLoader object at 0x<?>>, '__spec__': ModuleSpec(name='', loader=<_frozen_importlib_external.SourceFileLoader object at 0x<?>>, origin='C:\\home\\git\\polyglot\\lib\\math'), '__builtins__': {'__name__': 'builtins', '__doc__': "Built-in functions, types, exceptions, and other objects.\n\nThis module provides direct access to all 'built-in'\nidentifiers of Python; for example, builtins.len is\nthe full name for the built-in function len().\n\nThis module is not normally accessed explicitly by most\napplications, but can be useful in modules that provide\nobjects with the same name as a built-in value, but in\nwhich the built-in of that name is also needed.", '__package__': '', '__loader__': <class '_frozen_importlib.BuiltinImporter'>, '__spec__': ModuleSpec(name='builtins', loader=<class '_frozen_importlib.BuiltinImporter'>, origin='built-in'), '__build_class__': <built-in function __build_class__>, '__import__': <built-in function __import__>, 'abs': <built-in function abs>, 'all': <built-in function all>, 'any': <built-in function any>, 'ascii': <built-in function ascii>, 'bin': <built-in function bin>, 'breakpoint': <built-in function breakpoint>, 'callable': <built-in function callable>, 'chr': <built-in function chr>, 'compile': <built-in function compile>, 'delattr': <built-in function delattr>, 'dir': <built-in function dir>, 'divmod': <built-in function divmod>, 'eval': <built-in function eval>, 'exec': <built-in function exec>, 'format': <built-in function format>, 'getattr': <built-in function getattr>, 'globals': <built-in function globals>, 'hasattr': <built-in function hasattr>, 'hash': <built-in function hash>, 'hex': <built-in function hex>, 'id': <built-in function id>, 'input': <built-in function input>, 'isinstance': <built-in function isinstance>, 'issubclass': <built-in function 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<class 'LookupError'>, 'MemoryError': <class 'MemoryError'>, 'NameError': <class 'NameError'>, 'OSError': <class 'OSError'>, 'ReferenceError': <class 'ReferenceError'>, 'RuntimeError': <class 'RuntimeError'>, 'StopAsyncIteration': <class 'StopAsyncIteration'>, 'StopIteration': <class 'StopIteration'>, 'SyntaxError': <class 'SyntaxError'>, 'SystemError': <class 'SystemError'>, 'TypeError': <class 'TypeError'>, 'ValueError': <class 'ValueError'>, 'Warning': <class 'Warning'>, 'FloatingPointError': <class 'FloatingPointError'>, 'OverflowError': <class 'OverflowError'>, 'ZeroDivisionError': <class 'ZeroDivisionError'>, 'BytesWarning': <class 'BytesWarning'>, 'DeprecationWarning': <class 'DeprecationWarning'>, 'EncodingWarning': <class 'EncodingWarning'>, 'FutureWarning': <class 'FutureWarning'>, 'ImportWarning': <class 'ImportWarning'>, 'PendingDeprecationWarning': <class 'PendingDeprecationWarning'>, 'ResourceWarning': <class 'ResourceWarning'>, 'RuntimeWarning': <class 'RuntimeWarning'>, 'SyntaxWarning': <class 'SyntaxWarning'>, 'UnicodeWarning': <class 'UnicodeWarning'>, 'UserWarning': <class 'UserWarning'>, 'BlockingIOError': <class 'BlockingIOError'>, 'ChildProcessError': <class 'ChildProcessError'>, 'ConnectionError': <class 'ConnectionError'>, 'FileExistsError': <class 'FileExistsError'>, 'FileNotFoundError': <class 'FileNotFoundError'>, 'InterruptedError': <class 'InterruptedError'>, 'IsADirectoryError': <class 'IsADirectoryError'>, 'NotADirectoryError': <class 'NotADirectoryError'>, 'PermissionError': <class 'PermissionError'>, 'ProcessLookupError': <class 'ProcessLookupError'>, 'TimeoutError': <class 'TimeoutError'>, 'IndentationError': <class 'IndentationError'>, 'IndexError': <class 'IndexError'>, 'KeyError': <class 'KeyError'>, 'ModuleNotFoundError': <class 'ModuleNotFoundError'>, 'NotImplementedError': <class 'NotImplementedError'>, 'RecursionError': <class 'RecursionError'>, 'UnboundLocalError': <class 'UnboundLocalError'>, 'UnicodeError': <class 'UnicodeError'>, 'BrokenPipeError': <class 'BrokenPipeError'>, 'ConnectionAbortedError': <class 'ConnectionAbortedError'>, 'ConnectionRefusedError': <class 'ConnectionRefusedError'>, 'ConnectionResetError': <class 'ConnectionResetError'>, 'TabError': <class 'TabError'>, 'UnicodeDecodeError': <class 'UnicodeDecodeError'>, 'UnicodeEncodeError': <class 'UnicodeEncodeError'>, 'UnicodeTranslateError': <class 'UnicodeTranslateError'>, 'ExceptionGroup': <class 'ExceptionGroup'>, 'EnvironmentError': <class 'OSError'>, 'IOError': <class 'OSError'>, 'WindowsError': <class 'OSError'>, 'open': <built-in function open>, 'quit': Use quit() or Ctrl-Z plus Return to exit, 'exit': Use exit() or Ctrl-Z plus Return to exit, 'copyright': Copyright (c) 2001-2023 Python Software Foundation.
All Rights Reserved.

Copyright (c) 2000 BeOpen.com.
All Rights Reserved.

Copyright (c) 1995-2001 Corporation for National Research Initiatives.
All Rights Reserved.

Copyright (c) 1991-1995 Stichting Mathematisch Centrum, Amsterdam.
All Rights Reserved., 'credits':     Thanks to CWI, CNRI, BeOpen.com, Zope Corporation and a cast of thousands
    for supporting Python development.  See www.python.org for more information., 'license': Type license() to see the full license text, 'help': Type help() for interactive help, or help(object) for help about object.}, '__file__': '', '__cached__': None, 'sys': <module 'sys' (built-in)>, 'traceback': <module 'traceback' from 'C:\\Users\\i574n\\scoop\\apps\\python\\current\\Lib\\traceback.py'>, 're': <module 're' from 'C:\\Users\\i574n\\scoop\\apps\\python\\current\\Lib\\re\\__init__.py'>, 'count': 32, 'memory_address_pattern': re.compile(' at 0x[0-9a-fA-F]+'), 'trace_calls': <function trace_calls at 0x<?>>, 'mpmath': <module 'mpmath' from 'C:\\Users\\i574n\\scoop\\apps\\python\\current\\Lib\\site-packages\\mpmath\\__init__.py'>, 'fn': <function fn at 0x<?>>}, name='', pathname='', cpathname=None / f_lineno: 1696 / f_code.co_filename: <frozen importlib._bootstrap_external> / f_back.f_lineno:  / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: <module> / f_locals: __name__='', __doc__=None, __package__=None, __loader__=<_frozen_importlib_external.SourceFileLoader object at 0x<?>>, __spec__=ModuleSpec(name='', loader=<_frozen_importlib_external.SourceFileLoader object at 0x<?>>, origin='C:\\home\\git\\polyglot\\lib\\math'), __builtins__={'__name__': 'builtins', '__doc__': "Built-in functions, types, exceptions, and other objects.\n\nThis module provides direct access to all 'built-in'\nidentifiers of Python; for example, builtins.len is\nthe full name for the built-in function len().\n\nThis module is not normally accessed explicitly by most\napplications, but can be useful in modules that provide\nobjects with the same name as a built-in value, but in\nwhich the built-in of that name is also needed.", '__package__': '', '__loader__': <class '_frozen_importlib.BuiltinImporter'>, '__spec__': ModuleSpec(name='builtins', loader=<class '_frozen_importlib.BuiltinImporter'>, origin='built-in'), '__build_class__': <built-in function __build_class__>, '__import__': <built-in function __import__>, 'abs': <built-in function abs>, 'all': <built-in function all>, 'any': <built-in function any>, 'ascii': <built-in function ascii>, 'bin': <built-in function bin>, 'breakpoint': <built-in function breakpoint>, 'callable': <built-in function callable>, 'chr': <built-in function chr>, 'compile': <built-in function compile>, 'delattr': <built-in function delattr>, 'dir': <built-in function dir>, 'divmod': <built-in function divmod>, 'eval': <built-in function eval>, 'exec': <built-in function exec>, 'format': <built-in function format>, 'getattr': <built-in function getattr>, 'globals': <built-in function globals>, 'hasattr': <built-in function hasattr>, 'hash': <built-in function hash>, 'hex': <built-in function hex>, 'id': <built-in function id>, 'input': <built-in function input>, 'isinstance': <built-in function isinstance>, 'issubclass': <built-in function issubclass>, 'iter': <built-in function iter>, 'aiter': <built-in function aiter>, 'len': <built-in function len>, 'locals': <built-in function locals>, 'max': <built-in function max>, 'min': <built-in function min>, 'next': <built-in function next>, 'anext': <built-in function anext>, 'oct': <built-in function oct>, 'ord': <built-in function ord>, 'pow': <built-in function pow>, 'print': <built-in function print>, 'repr': <built-in function repr>, 'round': <built-in function round>, 'setattr': <built-in function setattr>, 'sorted': <built-in function sorted>, 'sum': <built-in function sum>, 'vars': <built-in function vars>, 'None': None, 'Ellipsis': Ellipsis, 'NotImplemented': NotImplemented, 'False': False, 'True': True, 'bool': <class 'bool'>, 'memoryview': <class 'memoryview'>, 'bytearray': <class 'bytearray'>, 'bytes': <class 'bytes'>, 'classmethod': <class 'classmethod'>, 'complex': <class 'complex'>, 'dict': <class 'dict'>, 'enumerate': <class 'enumerate'>, 'filter': <class 'filter'>, 'float': <class 'float'>, 'frozenset': <class 'frozenset'>, 'property': <class 'property'>, 'int': <class 'int'>, 'list': <class 'list'>, 'map': <class 'map'>, 'object': <class 'object'>, 'range': <class 'range'>, 'reversed': <class 'reversed'>, 'set': <class 'set'>, 'slice': <class 'slice'>, 'staticmethod': <class 'staticmethod'>, 'str': <class 'str'>, 'super': <class 'super'>, 'tuple': <class 'tuple'>, 'type': <class 'type'>, 'zip': <class 'zip'>, '__debug__': True, 'BaseException': <class 'BaseException'>, 'BaseExceptionGroup': <class 'BaseExceptionGroup'>, 'Exception': <class 'Exception'>, 'GeneratorExit': <class 'GeneratorExit'>, 'KeyboardInterrupt': <class 'KeyboardInterrupt'>, 'SystemExit': <class 'SystemExit'>, 'ArithmeticError': <class 'ArithmeticError'>, 'AssertionError': <class 'AssertionError'>, 'AttributeError': <class 'AttributeError'>, 'BufferError': <class 'BufferError'>, 'EOFError': <class 'EOFError'>, 'ImportError': <class 'ImportError'>, 'LookupError': <class 'LookupError'>, 'MemoryError': <class 'MemoryError'>, 'NameError': <class 'NameError'>, 'OSError': <class 'OSError'>, 'ReferenceError': <class 'ReferenceError'>, 'RuntimeError': <class 'RuntimeError'>, 'StopAsyncIteration': <class 'StopAsyncIteration'>, 'StopIteration': <class 'StopIteration'>, 'SyntaxError': <class 'SyntaxError'>, 'SystemError': <class 'SystemError'>, 'TypeError': <class 'TypeError'>, 'ValueError': <class 'ValueError'>, 'Warning': <class 'Warning'>, 'FloatingPointError': <class 'FloatingPointError'>, 'OverflowError': <class 'OverflowError'>, 'ZeroDivisionError': <class 'ZeroDivisionError'>, 'BytesWarning': <class 'BytesWarning'>, 'DeprecationWarning': <class 'DeprecationWarning'>, 'EncodingWarning': <class 'EncodingWarning'>, 'FutureWarning': <class 'FutureWarning'>, 'ImportWarning': <class 'ImportWarning'>, 'PendingDeprecationWarning': <class 'PendingDeprecationWarning'>, 'ResourceWarning': <class 'ResourceWarning'>, 'RuntimeWarning': <class 'RuntimeWarning'>, 'SyntaxWarning': <class 'SyntaxWarning'>, 'UnicodeWarning': <class 'UnicodeWarning'>, 'UserWarning': <class 'UserWarning'>, 'BlockingIOError': <class 'BlockingIOError'>, 'ChildProcessError': <class 'ChildProcessError'>, 'ConnectionError': <class 'ConnectionError'>, 'FileExistsError': <class 'FileExistsError'>, 'FileNotFoundError': <class 'FileNotFoundError'>, 'InterruptedError': <class 'InterruptedError'>, 'IsADirectoryError': <class 'IsADirectoryError'>, 'NotADirectoryError': <class 'NotADirectoryError'>, 'PermissionError': <class 'PermissionError'>, 'ProcessLookupError': <class 'ProcessLookupError'>, 'TimeoutError': <class 'TimeoutError'>, 'IndentationError': <class 'IndentationError'>, 'IndexError': <class 'IndexError'>, 'KeyError': <class 'KeyError'>, 'ModuleNotFoundError': <class 'ModuleNotFoundError'>, 'NotImplementedError': <class 'NotImplementedError'>, 'RecursionError': <class 'RecursionError'>, 'UnboundLocalError': <class 'UnboundLocalError'>, 'UnicodeError': <class 'UnicodeError'>, 'BrokenPipeError': <class 'BrokenPipeError'>, 'ConnectionAbortedError': <class 'ConnectionAbortedError'>, 'ConnectionRefusedError': <class 'ConnectionRefusedError'>, 'ConnectionResetError': <class 'ConnectionResetError'>, 'TabError': <class 'TabError'>, 'UnicodeDecodeError': <class 'UnicodeDecodeError'>, 'UnicodeEncodeError': <class 'UnicodeEncodeError'>, 'UnicodeTranslateError': <class 'UnicodeTranslateError'>, 'ExceptionGroup': <class 'ExceptionGroup'>, 'EnvironmentError': <class 'OSError'>, 'IOError': <class 'OSError'>, 'WindowsError': <class 'OSError'>, 'open': <built-in function open>, 'quit': Use quit() or Ctrl-Z plus Return to exit, 'exit': Use exit() or Ctrl-Z plus Return to exit, 'copyright': Copyright (c) 2001-2023 Python Software Foundation.
All Rights Reserved.

Copyright (c) 2000 BeOpen.com.
All Rights Reserved.

Copyright (c) 1995-2001 Corporation for National Research Initiatives.
All Rights Reserved.

Copyright (c) 1991-1995 Stichting Mathematisch Centrum, Amsterdam.
All Rights Reserved., 'credits':     Thanks to CWI, CNRI, BeOpen.com, Zope Corporation and a cast of thousands
    for supporting Python development.  See www.python.org for more information., 'license': Type license() to see the full license text, 'help': Type help() for interactive help, or help(object) for help about object.}, __file__='', __cached__=None, sys=<module 'sys' (built-in)>, traceback=<module 'traceback' from 'C:\\Users\\i574n\\scoop\\apps\\python\\current\\Lib\\traceback.py'>, re=<module 're' from 'C:\\Users\\i574n\\scoop\\apps\\python\\current\\Lib\\re\\__init__.py'>, count=33, memory_address_pattern=re.compile(' at 0x[0-9a-fA-F]+'), mpmath=<module 'mpmath' from 'C:\\Users\\i574n\\scoop\\apps\\python\\current\\Lib\\site-packages\\mpmath\\__init__.py'> / f_lineno: 0 / f_code.co_filename:  / f_back.f_lineno:  / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: compile / f_locals: pattern=' at 0x[0-9a-fA-F]+', flags=0 / f_lineno: 226 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\re\__init__.py / f_back.f_lineno: 5 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: _compile / f_locals: pattern=' at 0x[0-9a-fA-F]+', flags=0 / f_lineno: 280 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\re\__init__.py / f_back.f_lineno: 228 / f_back.f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\re\__init__.py
call(zeta_) / f_code.co_name: fn / f_locals: log=True, s=(0.0, 0.0) / f_lineno: 17 / f_code.co_filename:  / f_back.f_lineno:  / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='gamma_ / s: (0.0, 0.0) / count: 3', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 20 / f_back.f_code.co_filename: 
gamma_ / s: (0.0, 0.0) / count: 3call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 20 / f_back.f_code.co_filename: 

call(gamma_) / f_code.co_name: f / f_locals: x=0j, kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=0j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 0j / result: (0.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 0j / result: (0.0 + 0.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 0, 0, 0), (0, 0, 0, 0)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 0, 0, 0), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 0, 0, 0), (0, 0, 0, 0)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: mpf_gamma / f_locals: x=(0, 0, 0, 0), prec=53, rnd='n', type=0 / f_lineno: 1781 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2000 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
gamma__ / s: Complex { re: 0.0, im: 0.0 } / result: Complex { re: 0.0, im: 0.0 }
zeta__ / s: Complex { re: 1.0, im: 0.0 } / result: Complex { re: inf, im: 0.0 } / z: Complex { re: 0.0, im: 0.0 }

test_symmetry_across_real_axis___¶

In [ ]:
inl test_symmetry_across_real_axis___ log = run_test log (8u8, 7u8) fun zeta, gamma =>
    inl s = .^(2, 10)
    inl result_positive_im = zeta s
    inl result_negative_im = zeta .^(re s, -(im s))
    inl conj = result_negative_im |> conj
    result_positive_im |> re |> _assert_eq (conj |> re)
    result_positive_im |> im |> _assert_eq (conj |> im)
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_symmetry_across_real_axis___ true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (2.0, 10.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(2+10j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(2+10j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(2+10j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=10.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -49, 53, 53, 'd') / result: (0, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -49, 53, 53, 'd') / result: (0, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 1, 1), (0, 5, 1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.0', imag='10.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 1, 1), (0, 5, 1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 1, 3), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2+10j) / result: (2.0 + 10.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2+10j) / result: (2.0 + 10.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 1, 1), (0, 5, 1, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 1, 1), (0, 5, 1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 1, 1), y=(0, 5, 1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 1, 1), t=(0, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, 1, 3), t=(0, 5, 1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 2, 1), t=(0, 25, 2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=26, exp=2, bc=5, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 26, 2, 5, 14, 'd') / result: (0, 13, 3, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 26, 2, 5, 14, 'd') / result: (0, 13, 3, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 13, 3, 4), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=27262976 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=27262976 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=27262976 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5221, exp=-9, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5221 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5221, exp=-9, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5221, -9, 13, 10, 'd') / result: (0, 163, -4, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5221, -9, 13, 10, 'd') / result: (0, 163, -4, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 163, -4, 8), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 163, -4, 8), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, 1, 1), (0, 5, 1, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, 1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, 1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=0, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 0, 1, 73, 'd') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 0, 1, 73, 'd') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5, 1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5, 1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5, 1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5, exp=1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5, 1, 3, 73, 'd') / result: (1, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5, 1, 3, 73, 'd') / result: (1, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 1, 0, 1), (1, 5, 1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 1, 0, 1), y=(1, 5, 1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 0, 1), t=(1, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 1, 3), t=(1, 5, 1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 25, 2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=101 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=101, exp=0, bc=7, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 101, 0, 7, 14, 'd') / result: (0, 101, 0, 7)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 101, 0, 7, 14, 'd') / result: (0, 101, 0, 7)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 101, 0, 7), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26476544 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26476544 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26476544 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5145, exp=-9, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5145 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5145, exp=-9, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5145, -9, 13, 10, 'd') / result: (0, 643, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5145, -9, 13, 10, 'd') / result: (0, 643, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, 1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, 1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, 1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=42 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 42 / result: [1, 3529, 2076817, 488608401, 61478817681, 4799740409745, 254491767943057, 9737301077340049, 280787600504270737, 6304127587769397137, 113012350730582110097, 1650349868562966130577, 19953578432320987475857, 202422687806400954118033, 1742307499719932947738513, 12843638005836798078758801, 81734555945005570000695185, 452099989999431623684403089, 2186350832000315525854146449, 9291105348305501355511132049, 34850004287731592942713057169, 115831045294414958622024150929, 342338269928330588207073996689, 902588023612218522253187624849, 2129376048079597243081113743249, 4508844085740406908948176973713, 8596648150439746591335183036305, 14812624142603103089500190158737, 23167864599601900460410297134993, 33074864778499446042372674432913, 43407250275812931434634001264529, 52849007091972478107202786439057, 60370565349290053482274943676305, 65560265219140874720086968250257, 68635811674056857455401381408657, 70184409806221592447592820912017, 70837535309536766282327708151697, 71063868323643764693772304396177, 71126606246852371270979753881489, 71139976966417309069652004188049, 71142033349236473553878179393425, 71142236448774168811579530030993, 71142246120180725728612927680401]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 42 / result: [1, 3529, 2076817, 488608401, 61478817681, 4799740409745, 254491767943057, 9737301077340049, 280787600504270737, 6304127587769397137, 113012350730582110097, 1650349868562966130577, 19953578432320987475857, 202422687806400954118033, 1742307499719932947738513, 12843638005836798078758801, 81734555945005570000695185, 452099989999431623684403089, 2186350832000315525854146449, 9291105348305501355511132049, 34850004287731592942713057169, 115831045294414958622024150929, 342338269928330588207073996689, 902588023612218522253187624849, 2129376048079597243081113743249, 4508844085740406908948176973713, 8596648150439746591335183036305, 14812624142603103089500190158737, 23167864599601900460410297134993, 33074864778499446042372674432913, 43407250275812931434634001264529, 52849007091972478107202786439057, 60370565349290053482274943676305, 65560265219140874720086968250257, 68635811674056857455401381408657, 70184409806221592447592820912017, 70837535309536766282327708151697, 71063868323643764693772304396177, 71126606246852371270979753881489, 71139976966417309069652004188049, 71142033349236473553878179393425, 71142236448774168811579530030993, 71142246120180725728612927680401]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 1, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=86 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=86, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: pi_fixed / f_locals: prec=85, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=958288617897701126742203875414927711381592807340433735680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 0, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=0, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=0 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 1, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=108, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 689 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=123 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=123, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 224939120507729810846275465740351, -108, 108, 88, 'd') / result: (0, 214518661983232317777896371, -88, 88)

[2]libmpf._normalize. / x: (0, 356520070949948947528356728229971, -108, 109, 88, 'd') / result: (0, 85001008737075077898110563, -86, 87)

[2]libmpf._normalize. / x: (0, 449878241015459621692550931480702, -108, 109, 88, 'd') / result: (0, 214518661983232317777896371, -87, 88)

[2]libmpf._normalize. / x: (0, 522292463546151898066896762790005, -108, 109, 88, 'd') / result: (0, 124524227034128164784168425, -86, 87)

[2]libmpf._normalize. / x: (0, 581459191457678758374632193970322, -108, 109, 88, 'd') / result: (0, 8664417139555197333911541, -82, 83)

[2]libmpf._normalize. / x: (0, 631483947120683840791049765974625, -108, 109, 88, 'd') / result: (0, 301115010795919342418217547, -87, 88)

[2]libmpf._normalize. / x: (0, 674817361523189432538826397221053, -108, 110, 88, 'd') / result: (0, 80444498243712119166711139, -85, 87)

[2]libmpf._normalize. / x: (0, 713040141899897895056713456459942, -108, 110, 88, 'd') / result: (0, 85001008737075077898110563, -85, 87)

[2]libmpf._normalize. / x: (0, 747231584053881708913172228530356, -108, 110, 88, 'd') / result: (0, 89076946264968122114321259, -85, 87)

[2]libmpf._normalize. / x: (0, 778161505752905805354238767353817, -108, 110, 88, 'd') / result: (0, 92764080256570077580718847, -85, 87)

[2]libmpf._normalize. / x: (0, 806398311965408569220907659710673, -108, 110, 88, 'd') / result: (0, 192260339728691236787058749, -86, 88)

[2]libmpf._normalize. / x: (0, 832373655690528864538379510958074, -108, 110, 88, 'd') / result: (0, 198453344271309105047793271, -86, 88)

[2]libmpf._normalize. / x: (0, 856423067628413651637325231714976, -108, 110, 88, 'd') / result: (0, 102093585446883875326791433, -85, 87)

[2]libmpf._normalize. / x: (0, 878812534496100845595253491019976, -108, 110, 88, 'd') / result: (0, 52381308942800810670569747, -84, 86)

[2]libmpf._normalize. / x: (0, 899756482030919243385101862961404, -108, 110, 88, 'd') / result: (0, 214518661983232317777896371, -86, 88)

[2]libmpf._normalize. / x: (0, 919430296618877781423204854757461, -108, 110, 88, 'd') / result: (0, 219209264902800984721947873, -86, 88)

[2]libmpf._normalize. / x: (0, 937979262407627705902988922200293, -108, 110, 88, 'd') / result: (0, 223631682969958235240695219, -86, 88)

[2]libmpf._normalize. / x: (0, 955525078854587723508080664044832, -108, 110, 88, 'd') / result: (0, 28476866449552408561351319, -83, 85)

[2]libmpf._normalize. / x: (0, 972170704561611519759447694270707, -108, 110, 88, 'd') / result: (0, 231783558025744323673116611, -86, 88)

[2]libmpf._normalize. / x: (0, 988004018070632788319406494204596, -108, 110, 88, 'd') / result: (0, 235558514135034749107219337, -86, 88)

[2]libmpf._normalize. / x: (0, 1003100626260635616200514233094168, -108, 110, 88, 'd') / result: (0, 239157826008948234605911787, -86, 88)

[2]libmpf._normalize. / x: (0, 1017526047957690401622753083176439, -108, 110, 88, 'd') / result: (0, 242597114552900886922539015, -86, 88)

[2]libmpf._normalize. / x: (0, 1031337432473138380067183125451024, -108, 110, 88, 'd') / result: (0, 122945002612249658115766421, -85, 87)

[2]libmpf._normalize. / x: (0, 1044584927092303796133793525580010, -108, 110, 88, 'd') / result: (0, 124524227034128164784168425, -85, 87)

[2]libmpf._normalize. / x: (0, 1057312776198258675384654976698425, -108, 110, 88, 'd') / result: (0, 63020752441779296123066841, -84, 86)

[2]libmpf._normalize. / x: (0, 1069560212849846842585070184689914, -108, 110, 88, 'd') / result: (0, 255003026211225233694331689, -86, 88)

[2]libmpf._normalize. / x: (0, 1081362188136143462483600697455327, -108, 110, 88, 'd') / result: (0, 257816836389575830098056959, -86, 88)

[2]libmpf._normalize. / x: (0, 1092749972487262132322162826065000, -108, 110, 88, 'd') / result: (0, 260531895753684552269497591, -86, 88)

[2]libmpf._normalize. / x: (0, 1103751655003830656441528956760327, -108, 110, 88, 'd') / result: (0, 263154901267011322126753081, -86, 88)

[2]libmpf._normalize. / x: (0, 1114392560881063724586709659212406, -108, 110, 88, 'd') / result: (0, 265691890926614695688893713, -86, 88)

[2]libmpf._normalize. / x: (0, 1124695602538649054231377328701755, -108, 110, 88, 'd') / result: (0, 8379635233720012413199077, -81, 83)

[2]libmpf._normalize. / x: (0, 1134681576702854752882595495583788, -108, 110, 88, 'd') / result: (0, 270529169250215233059548257, -86, 88)

[2]libmpf._normalize. / x: (0, 1144369417126607592269480320497812, -108, 110, 88, 'd') / result: (0, 136419465199304532083210983, -85, 87)

[2]libmpf._normalize. / x: (0, 1153776410666835738857946528764630, -108, 110, 88, 'd') / result: (0, 137540866216043917996638599, -85, 87)

[2]libmpf._normalize. / x: (0, 1162918382915357516749264387940644, -108, 110, 88, 'd') / result: (0, 8664417139555197333911541, -81, 83)

[2]libmpf._normalize. / x: (0, 1171809858390608982398566213337114, -108, 110, 88, 'd') / result: (0, 34922655176836519908862299, -83, 85)

[2]libmpf._normalize. / x: (0, 1180464199362317534354356129785183, -108, 110, 88, 'd') / result: (0, 281444597092227347935284645, -86, 88)

[2]libmpf._normalize. / x: (0, 1188893726640477812066736239188045, -108, 110, 88, 'd') / result: (0, 283454353008384182945903835, -86, 88)

[2]libmpf._normalize. / x: (0, 1197109825069341330605723160011058, -108, 110, 88, 'd') / result: (0, 285413223521552403117590703, -86, 88)

[2]libmpf._normalize. / x: (0, 1205123035993216547930927173891029, -108, 110, 88, 'd') / result: (0, 143661860942031925670019051, -85, 87)

[2]libmpf._normalize. / x: (0, 1212943138578362599165681959944947, -108, 110, 88, 'd') / result: (0, 289188179630842828551693429, -86, 88)

[2]libmpf._normalize. / x: (0, 7030822085959610432454, -73, 73, 73, 'd') / result: (0, 3515411042979805216227, -72, 72)

[2]libmpf._normalize. / x: (0, 2966283065462639419783, -73, 72, 73, 'd') / result: (0, 2966283065462639419783, -73, 72)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (1, 6703708186976009930559261, -83, 83, 83, 'd') / result: (1, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (1, 33518540934880049652796305, -82, 85, 83, 'd') / result: (1, 2094908808430003103299769, -78, 81)

[2]libmpf._normalize. / x: (0, 1237940039285380274899124301, -91, 91, 77, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize. / x: (0, 129340052636251115004738212439967, -107, 107, 77, 'd') / result: (0, 60228655411047448872001, -76, 76)

[2]libmpf._normalize. / x: (1, 97975628097966729340713714188608, -107, 107, 77, 'd') / result: (1, 45623457104883496342559, -76, 76)

[3]libmpf._normalize1 / x: (0, 60228655411047448872001, -77, 76, 73, 'd') / result: (0, 941072740797616388625, -71, 70)

[3]libmpf._normalize1 / x: (1, 45623457104883496342559, -77, 76, 73, 'd') / result: (1, 5702932138110437042819, -74, 73)

[2]libmpf._normalize1 / x: (0, 1420110500637206218223, -71, 71, 73, 'd') / result: (0, 1420110500637206218223, -71, 71)

[2]libmpf._normalize1 / x: (0, 5702932138110437042819, -74, 73, 73, 'd') / result: (0, 5702932138110437042819, -74, 73)

[3]libmpf._normalize1 / x: (0, 161593120349176495860397569817162285465241417, -148, 147, 63, 'd') / result: (0, 8354168517174183447, -64, 63)

[3]libmpf._normalize1 / x: (0, 96792865203825462942744185828392139889962213, -147, 147, 63, 'd') / result: (0, 2502036922814468261, -62, 62)

[3]libmpf._normalize1 / x: (1, 3198351699174599604200455481039507147401477, -146, 142, 63, 'd') / result: (1, 2645614517683262199, -66, 62)

[3]libmpf._normalize1 / x: (0, 345294946792488497, -58, 59, 53, 'n') / result: (0, 5395233543632633, -52, 53)

[3]libmpf._normalize1 / x: (1, 365109449739569863, -62, 59, 53, 'n') / result: (1, 5704835152180779, -56, 53)

[7]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (0, 5, 1, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5395233543632633, -52, 53), (1, 5704835152180779, -56, 53))

zeta_ / result: (1.19798250067418 - 0.0791704917205257j) / count: 1639
zeta / count: 0 / s: Complex { re: 2.0, im: 10.0 }
zeta__ / s: Complex { re: 2.0, im: 10.0 } / result: Complex { re: 1.1979825006741847, im: -0.07917049172052575 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (2.0, -10.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(2-10j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(2-10j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(2-10j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=-10.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -49, 53, 53, 'd') / result: (1, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -49, 53, 53, 'd') / result: (1, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 1, 1), (1, 5, 1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.0', imag='-10.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 1, 1), (1, 5, 1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 1, 3), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2-10j) / result: (2.0 - 10.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2-10j) / result: (2.0 - 10.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 1, 1), (1, 5, 1, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 1, 1), (1, 5, 1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 1, 1), y=(1, 5, 1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 1, 1), t=(0, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 1, 3), t=(1, 5, 1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 2, 1), t=(0, 25, 2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=26, exp=2, bc=5, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 26, 2, 5, 14, 'd') / result: (0, 13, 3, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 26, 2, 5, 14, 'd') / result: (0, 13, 3, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 13, 3, 4), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=27262976 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=27262976 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=27262976 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5221, exp=-9, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5221 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5221, exp=-9, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5221, -9, 13, 10, 'd') / result: (0, 163, -4, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5221, -9, 13, 10, 'd') / result: (0, 163, -4, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 163, -4, 8), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 163, -4, 8), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, 1, 1), (1, 5, 1, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, 1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, 1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=0, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 0, 1, 73, 'd') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 0, 1, 73, 'd') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(1, 5, 1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(1, 5, 1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 1, 3, 73, 'd') / result: (0, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 1, 3, 73, 'd') / result: (0, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 1, 0, 1), (0, 5, 1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 1, 0, 1), y=(0, 5, 1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 0, 1), t=(1, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, 1, 3), t=(0, 5, 1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 25, 2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=101 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=101, exp=0, bc=7, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 101, 0, 7, 14, 'd') / result: (0, 101, 0, 7)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 101, 0, 7, 14, 'd') / result: (0, 101, 0, 7)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 101, 0, 7), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26476544 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26476544 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26476544 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5145, exp=-9, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5145 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5145, exp=-9, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5145, -9, 13, 10, 'd') / result: (0, 643, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5145, -9, 13, 10, 'd') / result: (0, 643, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, 1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, 1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, 1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 5, 1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=42 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 42 / result: [1, 3529, 2076817, 488608401, 61478817681, 4799740409745, 254491767943057, 9737301077340049, 280787600504270737, 6304127587769397137, 113012350730582110097, 1650349868562966130577, 19953578432320987475857, 202422687806400954118033, 1742307499719932947738513, 12843638005836798078758801, 81734555945005570000695185, 452099989999431623684403089, 2186350832000315525854146449, 9291105348305501355511132049, 34850004287731592942713057169, 115831045294414958622024150929, 342338269928330588207073996689, 902588023612218522253187624849, 2129376048079597243081113743249, 4508844085740406908948176973713, 8596648150439746591335183036305, 14812624142603103089500190158737, 23167864599601900460410297134993, 33074864778499446042372674432913, 43407250275812931434634001264529, 52849007091972478107202786439057, 60370565349290053482274943676305, 65560265219140874720086968250257, 68635811674056857455401381408657, 70184409806221592447592820912017, 70837535309536766282327708151697, 71063868323643764693772304396177, 71126606246852371270979753881489, 71139976966417309069652004188049, 71142033349236473553878179393425, 71142236448774168811579530030993, 71142246120180725728612927680401]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 42 / result: [1, 3529, 2076817, 488608401, 61478817681, 4799740409745, 254491767943057, 9737301077340049, 280787600504270737, 6304127587769397137, 113012350730582110097, 1650349868562966130577, 19953578432320987475857, 202422687806400954118033, 1742307499719932947738513, 12843638005836798078758801, 81734555945005570000695185, 452099989999431623684403089, 2186350832000315525854146449, 9291105348305501355511132049, 34850004287731592942713057169, 115831045294414958622024150929, 342338269928330588207073996689, 902588023612218522253187624849, 2129376048079597243081113743249, 4508844085740406908948176973713, 8596648150439746591335183036305, 14812624142603103089500190158737, 23167864599601900460410297134993, 33074864778499446042372674432913, 43407250275812931434634001264529, 52849007091972478107202786439057, 60370565349290053482274943676305, 65560265219140874720086968250257, 68635811674056857455401381408657, 70184409806221592447592820912017, 70837535309536766282327708151697, 71063868323643764693772304396177, 71126606246852371270979753881489, 71139976966417309069652004188049, 71142033349236473553878179393425, 71142236448774168811579530030993, 71142246120180725728612927680401]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(1, 5, 1, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-13093180052687519395622, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=65465900263437596978110, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6122892862869806653298, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-20752199398699970189968, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5434160706675068601276, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=103760996993499850949840, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14746485892648165462622, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4121270805426706109090846998516806951430210445355440726477732333038873604738878546628913983835099978971701462468504999428096, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4121270805426706109090846998516806951430210445355440726477732333038873604738878546628913983835099978971701462468504999428096 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128958952749668971534133025916060141338470315143641182618824980754738142295599464795804868635928800557344781990609816989310530558224284745689820769193314069799563561557096619498928050492520592212741282671111507673723263193119709963850692869301167765155919147892172647 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128958952749668971534133025916060141338470315143641182618824980754738142295599464795804868635928800557344781990609816989310530558224284745689820769193314069799563561557096619498928050492520592212741282671111507673723263193119709963850692869301167765155919147892172647 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-26186360105375038791246, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697809, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=130931800526875193956230, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12245785725739613306606, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3418898838587066972704436983731987721612530469705891930987792988059817451550297741689650447742902488821135799691917681229824, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3418898838587066972704436983731987721612530469705891930987792988059817451550297741689650447742902488821135799691917681229824 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=119276099476074391716626845541718869570321929281885123601821803143711555773643051448935933558628952104776234321354002243359932573169441692185818643765917757693864066874922531780318905209407379039367164564598611591824126892379817160126872172894146324128090166947854960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=119276099476074391716626845541718869570321929281885123601821803143711555773643051448935933558628952104776234321354002243359932573169441692185818643765917757693864066874922531780318905209407379039367164564598611591824126892379817160126872172894146324128090166947854960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-30401422615753946480508, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2331527515964852008547, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=152007113078769732402540, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3649594577350256590510, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1012241952210068167145120315425180654737244670789055617029618467763933867830601748294820978485814029922874043413317017403392, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1012241952210068167145120315425180654737244670789055617029618467763933867830601748294820978485814029922874043413317017403392 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=70295770624356482191056731057011129221446903346222145471049663003694284676235173932322936852133090955814599714984645598633110298597465710279875304846401550393478695801788160801698126243561281414452325604307235763570149104468852666240231365625228776762841663734111 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=70295770624356482191056731057011129221446903346222145471049663003694284676235173932322936852133090955814599714984645598633110298597465710279875304846401550393478695801788160801698126243561281414452325604307235763570149104468852666240231365625228776762841663734111 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-33845379451387489585590, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5434160706675068601276, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=169226897256937447927950, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6033626905376024534717, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1683626920512664400455659300145963742062968176924653730365589900464502249554980458898528770338649866096208868126231365681152, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1683626920512664400455659300145963742062968176924653730365589900464502249554980458898528770338649866096208868126231365681152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2849627400900566851408053276489812074753097678152015971675185231978277333569560934758896352399400583571232767879842545895158653342590530377293635456790418738200152971484314220255869395447413529541909500787558138570720150702428937030689178598371328711612596314199567 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2849627400900566851408053276489812074753097678152015971675185231978277333569560934758896352399400583571232767879842545895158653342590530377293635456790418738200152971484314220255869395447413529541909500787558138570720150702428937030689178598371328711612596314199567 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-36757203466298747853786, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2522336691763810333080, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=183786017331493739268930, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5756995129790368294494, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1611323923926230959945293563329879409581736414725435472006331438481364116138508905448898700446806006816003579310994435866624, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1611323923926230959945293563329879409581736414725435472006331438481364116138508905448898700446806006816003579310994435866624 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2640749766430788280359187917339887678598413242111614404922065830270272440185362310752401190949161772088896958702217970536410937634662561616905940533933393798813675873842955736392701015847048530233449695297553863913522787608191864653938178179846320043545883960766695 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2640749766430788280359187917339887678598413242111614404922065830270272440185362310752401190949161772088896958702217970536410937634662561616905940533933393798813675873842955736392701015847048530233449695297553863913522787608191864653938178179846320043545883960766695 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-39279540158062558186870, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697807, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=196397700790312790934350, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3532926738467472378711, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=981254953673025264069249285361144512245288201275104934875650555485446096366399653959265234246452375945643205349644047482880, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=981254953673025264069249285361144512245288201275104934875650555485446096366399653959265234246452375945643205349644047482880 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=66254520372390300616768820001062979472884066396836243314544151200155560722326201546394328879831497560659179993563986503593369274256692130350229399658666434807172683099821302226006827517121288769953852441370311239715673164961849351631752553961328750447028346375580 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=66254520372390300616768820001062979472884066396836243314544151200155560722326201546394328879831497560659179993563986503593369274256692130350229399658666434807172683099821302226006827517121288769953852441370311239715673164961849351631752553961328750447028346375580 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-41504398797399940379936, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4321731387006377504741, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=207521993986999701899680, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14657219935154383344041, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4100612806402010840373599645140782856435572799012806938375087058186548423762743817071876821008858876320214237092723019481088, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4100612806402010840373599645140782856435572799012806938375087058186548423762743817071876821008858876320214237092723019481088 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128926494839562425995303667633918265310896589135752217494795041603734466932501725246323995387370812527855911520949013735567217224839521728744935890914514792218189598848410629368531254183783965634883662932057370369703491498690676190408539084180789853363085279139621872 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128926494839562425995303667633918265310896589135752217494795041603734466932501725246323995387370812527855911520949013735567217224839521728744935890914514792218189598848410629368531254183783965634883662932057370369703491498690676190408539084180789853363085279139621872 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-43494602668441465876132, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2331527515964852008545, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=217473013342207329380660, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9772487440220063243818, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2726855871259775470676650645635180539292169317227660029549176280506923888849784301528905493063825549996313749603221353005056, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2726855871259775470676650645635180539292169317227660029549176280506923888849784301528905493063825549996313749603221353005056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=94936204689650800525774224150537880501239672113822390714662574749314310478075643837864413676430676973986705929052002402042903068857183766914814926447714550269670870264903923577542996217049177349803210476652666597452785248954207206938802154900469370210198693464858460 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=94936204689650800525774224150537880501239672113822390714662574749314310478075643837864413676430676973986705929052002402042903068857183766914814926447714550269670870264903923577542996217049177349803210476652666597452785248954207206938802154900469370210198693464858460 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-45294961062778358193710, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=531169121627959690967, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=226474805313891790968550, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3938527561762577250505, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1094873948308849242014109728929277034715795256159590769440199567173234591735140666522969629790778440528822944916444937191424, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1094873948308849242014109728929277034715795256159590769440199567173234591735140666522969629790778440528822944916444937191424 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=81553948146635624641031049795505558365742922816925942038220505758112098932875984641364263156275730048773656393208210486414993202983635633638227743493227725123056147500070603327262984337631971475784623246565767856002199543132553238328211120400271882053847490487536 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=81553948146635624641031049795505558365742922816925942038220505758112098932875984641364263156275730048773656393208210486414993202983635633638227743493227725123056147500070603327262984337631971475784623246565767856002199543132553238328211120400271882053847490487536 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-46938559504075008981214, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5434160706675068601274, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=234692797520375044906070, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12156519768245831188025, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3398240839562371703987189630355963626617892823363258142885147713207492270574163012132613284916661386169648574316135701282816, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3398240839562371703987189630355963626617892823363258142885147713207492270574163012132613284916661386169648574316135701282816 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=118737902291978198949315817925706897320884765187094529029546374039768884203729859706405498659843946293529013104123571369546186340387101656807753635777873920816875835597412669409884325121484129743319940191051959863682412948174921931695109831933650040227072382553800220 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=118737902291978198949315817925706897320884765187094529029546374039768884203729859706405498659843946293529013104123571369546186340387101656807753635777873920816875835597412669409884325121484129743319940191051959863682412948174921931695109831933650040227072382553800220 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-48450523503737574474558, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3922196707012503107930, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=242252617518687872372790, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4880587916416711073542, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1363427935629887735338325322817590269646084658613830014774588140253461944424892150764452746531912774998156874801610676502528, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1363427935629887735338325322817590269646084658613830014774588140253461944424892150764452746531912774998156874801610676502528 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1959876221509209112024550815030159178288874197863070683626097215874394922782796295075098196986249517185226394220032199354805563475693724457032808149462382225375264670362657455603448356932676243259471544448079730691942871700513075673827066341025079982216270622088560 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1959876221509209112024550815030159178288874197863070683626097215874394922782796295075098196986249517185226394220032199354805563475693724457032808149462382225375264670362657455603448356932676243259471544448079730691942871700513075673827066341025079982216270622088560 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=449, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-49850383518986267249408, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2522336691763810333080, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=249251917594931336247040, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11879887992660174947792, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3325937842975938263476823893539879294136661061164039884525889251224354137157691458682983215024817526889443285500898771468288, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3325937842975938263476823893539879294136661061164039884525889251224354137157691458682983215024817526889443285500898771468288 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=116750806432520937456591612380834248351047306803214531423755307770543346711182364817573010237184988583622135083257357273658373440029654743127617643285231650078022716706044212971544219741044360243842796373588037276503389994859992782986599038647485600792313334894286716 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=116750806432520937456591612380834248351047306803214531423755307770543346711182364817573010237184988583622135083257357273658373440029654743127617643285231650078022716706044212971544219741044360243842796373588037276503389994859992782986599038647485600792313334894286716 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-51153622014453916670478, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1219098196296160912010, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=255768110072269583352390, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3560328619856474471939, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=991583953185372898427872962049156559742607024446421828926973192911608686854467018737783815659572927271386818037535037456384, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=991583953185372898427872962049156559742607024446421828926973192911608686854467018737783815659572927271386818037535037456384 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=67590381248848339267344884379609627183208431817492751452539487619058017625318122655458145428304480183350717928488528983228381962933921858691895656580059543494306806927175084560506002588985783761953911559123296223365731141794463476961952535322559561975631165905575 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=67590381248848339267344884379609627183208431817492751452539487619058017625318122655458145428304480183350717928488528983228381962933921858691895656580059543494306806927175084560506002588985783761953911559123296223365731141794463476961952535322559561975631165905575 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-52372720210750077582494, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697805, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=261863601053750387912470, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9655819601337279032019, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2695868872722732567600779615571144396800212847713709347395208368228436117385582207193349748824463896019082911539548383084544, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2695868872722732567600779615571144396800212847713709347395208368228436117385582207193349748824463896019082911539548383084544 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=93595565042435385307201557939852550462366870572500675984144025347316026296150364808415555217051403087821770922533092313268596569904383231677779844298984549364989952984223374184852199317387146517177235019048913159374297622155592361918527355020651230824591820699943100 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=93595565042435385307201557939852550462366870572500675984144025347316026296150364808415555217051403087821770922533092313268596569904383231677779844298984549364989952984223374184852199317387146517177235019048913159374297622155592361918527355020651230824591820699943100 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-53517886939160396660630, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5401423297933440619669, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=267589434695801983303150, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=545901393246926841496, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=144605993172866881020731473632168664962463524398436516718516923966276266832943106899260139783687718560410577630473859629056, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=144605993172866881020731473632168664962463524398436516718516923966276266832943106899260139783687718560410577630473859629056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=367501740107863281836387802053990800781930783847049256022654196197784600741571600087751173149768363752247296204085890618665479043833615650155129202110356772020673251337217202196643804723196863418753837806319535360624205491019912594493679529673996859732910012 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=367501740107863281836387802053990800781930783847049256022654196197784600741571600087751173149768363752247296204085890618665479043833615650155129202110356772020673251337217202196643804723196863418753837806319535360624205491019912594493679529673996859732910012 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-54597578850087459775560, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4321731387006377504739, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=272987894250437298877800, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5944360947882242416146, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1662968921487969131738411946769939647068330530582019942262944625612177068578845729341491607512408763444721642750449385734144, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1662968921487969131738411946769939647068330530582019942262944625612177068578845729341491607512408763444721642750449385734144 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2789560246066154960018852375321706412320576387249125621458010634011257961638158892605847980087261950571145402488650703426329140302437619862681502480278114603636616978812698768466691812327544155202351979429829418097315042091815852507089878364237204099310412142470287 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2789560246066154960018852375321706412320576387249125621458010634011257961638158892605847980087261950571145402488650703426329140302437619862681502480278114603636616978812698768466691812327544155202351979429829418097315042091815852507089878364237204099310412142470287 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-55618879784282047971388, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3300430452811789308911, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=278094398921410239856940, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11050865618855183395286, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3088370854191942673228479329715602201698328128223751321345468590422614555932142068777055842523044846397340193679406002077696, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3088370854191942673228479329715602201698328128223751321345468590422614555932142068777055842523044846397340193679406002077696 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=109156718491291563635434908335253204312458842209464344771370165964196315281416403254554494831784317755833969257061646486293495570184265121244938528499319616178671714117008304180259899978708728497511369436593590964024927825785468878650307992215862603819286415715834780 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=109156718491291563635434908335253204312458842209464344771370165964196315281416403254554494831784317755833969257061646486293495570184265121244938528499319616178671714117008304180259899978708728497511369436593590964024927825785468878650307992215862603819286415715834780 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-56587782721128985271756, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 7030822085959610432453, -73, 73, 73, 'd') / result: (0, 7030822085959610432453, -73, 73)

[2]libmpf._normalize. / x: (1, 2966283065462639419783, -73, 72, 73, 'd') / result: (1, 2966283065462639419783, -73, 72)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (1, 6703708186976009930559261, -83, 83, 83, 'd') / result: (1, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (0, 33518540934880049652796305, -82, 85, 83, 'd') / result: (0, 2094908808430003103299769, -78, 81)

[2]libmpf._normalize. / x: (0, 1237940039285380274899124301, -91, 91, 77, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize. / x: (0, 129340052636251115004738212439967, -107, 107, 77, 'd') / result: (0, 60228655411047448872001, -76, 76)

[2]libmpf._normalize. / x: (0, 97975628097966729340713714188608, -107, 107, 77, 'd') / result: (0, 45623457104883496342559, -76, 76)

[3]libmpf._normalize1 / x: (0, 60228655411047448872001, -77, 76, 73, 'd') / result: (0, 941072740797616388625, -71, 70)

[3]libmpf._normalize1 / x: (0, 45623457104883496342559, -77, 76, 73, 'd') / result: (0, 5702932138110437042819, -74, 73)

[2]libmpf._normalize1 / x: (0, 1420110500637206218223, -71, 71, 73, 'd') / result: (0, 1420110500637206218223, -71, 71)

[2]libmpf._normalize1 / x: (1, 5702932138110437042819, -74, 73, 73, 'd') / result: (1, 5702932138110437042819, -74, 73)

[3]libmpf._normalize1 / x: (0, 161593120349176495860397569817162285465241417, -148, 147, 63, 'd') / result: (0, 8354168517174183447, -64, 63)

[3]libmpf._normalize1 / x: (0, 96792865203825462942732824944387042240216429, -147, 147, 63, 'd') / result: (0, 2502036922814468261, -62, 62)

[3]libmpf._normalize1 / x: (0, 6396703398349199208395208029940903857760135, -147, 143, 63, 'd') / result: (0, 2645614517683262199, -66, 62)

[3]libmpf._normalize1 / x: (0, 345294946792488497, -58, 59, 53, 'n') / result: (0, 5395233543632633, -52, 53)

[3]libmpf._normalize1 / x: (0, 365109449739569863, -62, 59, 53, 'n') / result: (0, 5704835152180779, -56, 53)

[7]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (1, 5, 1, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5395233543632633, -52, 53), (0, 5704835152180779, -56, 53))

zeta_ / result: (1.19798250067418 + 0.0791704917205257j) / count: 653
zeta / count: 0 / s: Complex { re: 2.0, im: -10.0 }
zeta__ / s: Complex { re: 2.0, im: -10.0 } / result: Complex { re: 1.1979825006741847, im: 0.07917049172052575 } / z: Complex { re: NaN, im: NaN }

test_behavior_near_origin___¶

In [ ]:
inl test_behavior_near_origin___ log = run_test log (6u8, 5u8) fun zeta, gamma =>
    inl s = .^(0.01, 0.01)
    inl result = zeta s
    result |> re |> _assert_lt limit.max
    result |> im |> _assert_lt limit.max
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_behavior_near_origin___ true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (0.01, 0.01) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.01+0.01j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.01+0.01j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.01+0.01j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.01, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5764607523034235, exp=-59, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5764607523034235 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5764607523034235, exp=-59, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5764607523034235, -59, 53, 53, 'd') / result: (0, 5764607523034235, -59, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5764607523034235, -59, 53, 53, 'd') / result: (0, 5764607523034235, -59, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.01, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5764607523034235, exp=-59, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5764607523034235 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5764607523034235, exp=-59, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5764607523034235, -59, 53, 53, 'd') / result: (0, 5764607523034235, -59, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5764607523034235, -59, 53, 53, 'd') / result: (0, 5764607523034235, -59, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5764607523034235, -59, 53), (0, 5764607523034235, -59, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.01', imag='0.01') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5764607523034235, -59, 53), (0, 5764607523034235, -59, 53)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5764607523034235, -59, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5764607523034235, -59, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5764607523034235, -59, 53), prec=75 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=377789318629571624960, xbits=75, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000020816, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000020816, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5764607523034235, -59, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5764607523034235, -59, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5764607523034235, -59, 53), prec=75 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=377789318629571624960, xbits=75, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000020816, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000020816, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.01+0.01j) / result: (0.01 + 0.01j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.01+0.01j) / result: (0.01 + 0.01j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5764607523034235, -59, 53), (0, 5764607523034235, -59, 53)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 5764607523034235, -59, 53), (0, 5764607523034235, -59, 53)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 5764607523034235, -59, 53), y=(0, 5764607523034235, -59, 53), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5764607523034235, -59, 53), t=(0, 5764607523034235, -59, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5764607523034235, -59, 53), t=(0, 5764607523034235, -59, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 33230699894622898206100982035225, -118, 105), t=(0, 33230699894622898206100982035225, -118, 105), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=66461399789245796412201964070450 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=66461399789245796412201964070450, exp=-118, bc=106, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 66461399789245796412201964070450, -118, 106, 14, 'd') / result: (0, 13421, -26, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 66461399789245796412201964070450, -118, 106, 14, 'd') / result: (0, 13421, -26, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 13421, -26, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13743104 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13743104 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13743104 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3707, exp=-18, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3707 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3707, exp=-18, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3707, -18, 12, 10, 'd') / result: (0, 463, -15, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3707, -18, 12, 10, 'd') / result: (0, 463, -15, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 463, -15, 9), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 463, -15, 9), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 5764607523034235, -59, 53), (0, 5764607523034235, -59, 53)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 5764607523034235, -59, 53), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 5764607523034235, -59, 53), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=570696144780389253 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=570696144780389253, exp=-59, bc=59, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 570696144780389253, -59, 59, 73, 'd') / result: (0, 570696144780389253, -59, 59)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 570696144780389253, -59, 59, 73, 'd') / result: (0, 570696144780389253, -59, 59)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5764607523034235, -59, 53), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5764607523034235, -59, 53), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5764607523034235, -59, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5764607523034235, exp=-59, bc=53, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5764607523034235, -59, 53, 73, 'd') / result: (1, 5764607523034235, -59, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5764607523034235, -59, 53, 73, 'd') / result: (1, 5764607523034235, -59, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 570696144780389253, -59, 59), (1, 5764607523034235, -59, 53)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 570696144780389253, -59, 59), y=(1, 5764607523034235, -59, 53), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 570696144780389253, -59, 59), t=(0, 570696144780389253, -59, 59), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5764607523034235, -59, 53), t=(1, 5764607523034235, -59, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 325694089667199011621288250197898009, -118, 118), t=(0, 33230699894622898206100982035225, -118, 105), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=325727320367093634519494351179933234 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=325727320367093634519494351179933234, exp=-118, bc=118, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 325727320367093634519494351179933234, -118, 118, 14, 'd') / result: (0, 16059, -14, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 325727320367093634519494351179933234, -118, 118, 14, 'd') / result: (0, 16059, -14, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 16059, -14, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=16444416 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=16444416 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=16444416 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4055, exp=-12, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4055 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4055, exp=-12, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4055, -12, 12, 10, 'd') / result: (0, 1013, -10, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4055, -12, 12, 10, 'd') / result: (0, 1013, -10, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 5764607523034235, -59, 53), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5764607523034235, -59, 53), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 5764607523034235, -59, 53) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5764607523034235, -59, 53), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5764607523034235, -59, 53), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5764607523034235, -59, 53), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=86 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=86, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: pi_fixed / f_locals: prec=85, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=958288617897701126742203875414927711381592807340433735680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 0, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=0, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=0 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 1, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=108, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 689 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=123 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=123, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 224939120507729810846275465740351, -108, 108, 88, 'd') / result: (0, 214518661983232317777896371, -88, 88)

[2]libmpf._normalize. / x: (0, 356520070949948947528356728229971, -108, 109, 88, 'd') / result: (0, 85001008737075077898110563, -86, 87)

[2]libmpf._normalize. / x: (0, 449878241015459621692550931480702, -108, 109, 88, 'd') / result: (0, 214518661983232317777896371, -87, 88)

[2]libmpf._normalize. / x: (0, 522292463546151898066896762790005, -108, 109, 88, 'd') / result: (0, 124524227034128164784168425, -86, 87)

[2]libmpf._normalize. / x: (0, 581459191457678758374632193970322, -108, 109, 88, 'd') / result: (0, 8664417139555197333911541, -82, 83)

[2]libmpf._normalize. / x: (0, 631483947120683840791049765974625, -108, 109, 88, 'd') / result: (0, 301115010795919342418217547, -87, 88)

[2]libmpf._normalize. / x: (0, 674817361523189432538826397221053, -108, 110, 88, 'd') / result: (0, 80444498243712119166711139, -85, 87)

[2]libmpf._normalize. / x: (0, 713040141899897895056713456459942, -108, 110, 88, 'd') / result: (0, 85001008737075077898110563, -85, 87)

[2]libmpf._normalize. / x: (0, 747231584053881708913172228530356, -108, 110, 88, 'd') / result: (0, 89076946264968122114321259, -85, 87)

[2]libmpf._normalize. / x: (0, 778161505752905805354238767353817, -108, 110, 88, 'd') / result: (0, 92764080256570077580718847, -85, 87)

[2]libmpf._normalize. / x: (0, 806398311965408569220907659710673, -108, 110, 88, 'd') / result: (0, 192260339728691236787058749, -86, 88)

[2]libmpf._normalize. / x: (0, 832373655690528864538379510958074, -108, 110, 88, 'd') / result: (0, 198453344271309105047793271, -86, 88)

[2]libmpf._normalize. / x: (0, 856423067628413651637325231714976, -108, 110, 88, 'd') / result: (0, 102093585446883875326791433, -85, 87)

[2]libmpf._normalize. / x: (0, 878812534496100845595253491019976, -108, 110, 88, 'd') / result: (0, 52381308942800810670569747, -84, 86)

[2]libmpf._normalize. / x: (0, 899756482030919243385101862961404, -108, 110, 88, 'd') / result: (0, 214518661983232317777896371, -86, 88)

[2]libmpf._normalize. / x: (0, 919430296618877781423204854757461, -108, 110, 88, 'd') / result: (0, 219209264902800984721947873, -86, 88)

[2]libmpf._normalize. / x: (0, 937979262407627705902988922200293, -108, 110, 88, 'd') / result: (0, 223631682969958235240695219, -86, 88)

[2]libmpf._normalize. / x: (0, 955525078854587723508080664044832, -108, 110, 88, 'd') / result: (0, 28476866449552408561351319, -83, 85)

[2]libmpf._normalize. / x: (0, 972170704561611519759447694270707, -108, 110, 88, 'd') / result: (0, 231783558025744323673116611, -86, 88)

[2]libmpf._normalize. / x: (0, 988004018070632788319406494204596, -108, 110, 88, 'd') / result: (0, 235558514135034749107219337, -86, 88)

[2]libmpf._normalize. / x: (0, 1003100626260635616200514233094168, -108, 110, 88, 'd') / result: (0, 239157826008948234605911787, -86, 88)

[2]libmpf._normalize. / x: (0, 1017526047957690401622753083176439, -108, 110, 88, 'd') / result: (0, 242597114552900886922539015, -86, 88)

[2]libmpf._normalize. / x: (0, 1031337432473138380067183125451024, -108, 110, 88, 'd') / result: (0, 122945002612249658115766421, -85, 87)

[2]libmpf._normalize. / x: (0, 1044584927092303796133793525580010, -108, 110, 88, 'd') / result: (0, 124524227034128164784168425, -85, 87)

[2]libmpf._normalize. / x: (0, 1057312776198258675384654976698425, -108, 110, 88, 'd') / result: (0, 63020752441779296123066841, -84, 86)

[2]libmpf._normalize. / x: (0, 1069560212849846842585070184689914, -108, 110, 88, 'd') / result: (0, 255003026211225233694331689, -86, 88)

[2]libmpf._normalize. / x: (0, 1081362188136143462483600697455327, -108, 110, 88, 'd') / result: (0, 257816836389575830098056959, -86, 88)

[2]libmpf._normalize. / x: (0, 1092749972487262132322162826065000, -108, 110, 88, 'd') / result: (0, 260531895753684552269497591, -86, 88)

[2]libmpf._normalize. / x: (0, 1103751655003830656441528956760327, -108, 110, 88, 'd') / result: (0, 263154901267011322126753081, -86, 88)

[2]libmpf._normalize. / x: (0, 1114392560881063724586709659212406, -108, 110, 88, 'd') / result: (0, 265691890926614695688893713, -86, 88)

[2]libmpf._normalize. / x: (0, 1124695602538649054231377328701755, -108, 110, 88, 'd') / result: (0, 8379635233720012413199077, -81, 83)

[2]libmpf._normalize. / x: (0, 1134681576702854752882595495583788, -108, 110, 88, 'd') / result: (0, 270529169250215233059548257, -86, 88)

[2]libmpf._normalize. / x: (0, 4743691946304255818493, -73, 73, 73, 'd') / result: (0, 4743691946304255818493, -73, 73)

[2]libmpf._normalize. / x: (0, 21267676017570183338, -73, 65, 73, 'd') / result: (0, 10633838008785091669, -72, 64)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (0, 3825780418039941712240070734819307564022033, -142, 142, 83, 'd') / result: (0, 3318335552553124914929089, -82, 82)

[3]libmpf._normalize1 / x: (1, 38644246646868098916005747257893199300335, -142, 135, 83, 'd') / result: (1, 4290373239664646444869261, -89, 82)

[2]libmpf._normalize. / x: (0, 4917555851261362220636447919, -91, 92, 77, 'd') / result: (0, 37517973718729875340549, -74, 75)

[2]libmpf._normalize. / x: (0, 19806564812852808345339064974, -94, 94, 77, 'd') / result: (0, 75556048633013947850567, -76, 76)

[2]libmpf._normalize. / x: (1, 137290844299774290026052629, -94, 87, 77, 'd') / result: (1, 134073090136498330103567, -84, 77)

[3]libmpf._normalize1 / x: (0, 2834709846904493619311553158509805515687741283, -150, 151, 73, 'd') / result: (0, 9379268110290233332563, -72, 73)

[3]libmpf._normalize1 / x: (1, 5030150672130046023698348415630816782564638283, -158, 152, 73, 'd') / result: (1, 8321686228413110687863, -79, 73)

[2]libmpf._normalize1 / x: (1, 4656901627420588118867, -72, 72, 73, 'd') / result: (1, 4656901627420588118867, -72, 72)

[2]libmpf._normalize1 / x: (0, 8321686228413110687863, -79, 73, 73, 'd') / result: (0, 8321686228413110687863, -79, 73)

[3]libmpf._normalize1 / x: (0, 355384680123953962825214646610780093563838187345, -158, 158, 63, 'd') / result: (0, 8971170574856385441, -63, 63)

[3]libmpf._normalize1 / x: (1, 1413729540199165583149586384443439536590962237, -151, 150, 63, 'd') / result: (1, 9136013023798874605, -64, 63)

[3]libmpf._normalize1 / x: (1, 52152824748776890085947352676429512341320347, -152, 146, 63, 'd') / result: (1, 674059461282249525, -66, 60)

[3]libmpf._normalize1 / x: (1, 587053038040945225, -60, 60, 53, 'n') / result: (1, 4586351859694885, -53, 53)

[3]libmpf._normalize1 / x: (1, 346504457500387059, -65, 59, 53, 'n') / result: (1, 1353533037110887, -57, 51)

[7]gammazeta.mpc_zeta / s: ((0, 5764607523034235, -59, 53), (0, 5764607523034235, -59, 53)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 4586351859694885, -53, 53), (1, 1353533037110887, -57, 51))

zeta_ / result: (-0.509187343366567 - 0.00939202213994577j) / count: 1280
zeta / count: 0 / s: Complex { re: 0.01, im: 0.01 }
gamma_ / s: (0.99, -0.01) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.99-0.01j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.99-0.01j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.99, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8917127262193582, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8917127262193582 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8917127262193582, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8917127262193582, -53, 53, 53, 'd') / result: (0, 4458563631096791, -52, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8917127262193582, -53, 53, 53, 'd') / result: (0, 4458563631096791, -52, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-0.01, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5764607523034235, exp=-59, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5764607523034235 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5764607523034235, exp=-59, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5764607523034235, -59, 53, 53, 'd') / result: (1, 5764607523034235, -59, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5764607523034235, -59, 53, 53, 'd') / result: (1, 5764607523034235, -59, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 4458563631096791, -52, 52), (1, 5764607523034235, -59, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.98999999999999999', imag='-0.01') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 4458563631096791, -52, 52), (1, 5764607523034235, -59, 53)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 4458563631096791, -52, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 4458563631096791, -52, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 4458563631096791, -52, 52), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=584392852255118589952, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=989999999999999991118, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=989999999999999991118, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5764607523034235, -59, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5764607523034235, -59, 53), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5764607523034235, -59, 53), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5764607523034235, -59, 53), prec=75 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=377789318629571624960, xbits=75, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000020816, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000020816, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.99-0.01j) / result: (0.99 - 0.01j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.99-0.01j) / result: (0.99 - 0.01j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 4458563631096791, -52, 52), (1, 5764607523034235, -59, 53)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 4458563631096791, -52, 52), (1, 5764607523034235, -59, 53)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 4458563631096791, -52, 52), (1, 5764607523034235, -59, 53)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 4458563631096791, -52, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5764607523034235, -59, 53), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 4458563631096791, -52, 52), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 5764607523034235, -59, 53), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=796608921644692182364851193593963, exp=-73, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=796608921644692182364851193593963 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-26037684403584734292831692271292, exp=-73, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=26037684403584734292831692271292 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=141576547156431963422720, exp=-73, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=141576547156431963422720 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=141576547156431963422720, y=-94447329657392906240, prec=73 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: ln_sqrt2pi_fixed / f_locals: prec=86 / f_lineno: 298 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: f / f_locals: prec=96, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=116, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: pi_fixed / f_locals: prec=131, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=4, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=2, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=4, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=4, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=4745215397148051600231742279728834634022773541190589821807710732284603850946804449280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=260993306656486022426679778603972359 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=260993306656486022426679778603972359, exp=-116, bc=118, prec=96, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 260993306656486022426679778603972359, -116, 118, 96, 'd') / result: (0, 62225653328057771307630486155, -94, 96)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 260993306656486022426679778603972359, -116, 118, 96, 'd') / result: (0, 62225653328057771307630486155, -94, 96)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 62225653328057771307630486155, -94, 96), n=1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 62225653328057771307630486155, -93, 96), prec=96, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=62225653328057771307630486155, n=20 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=65248326664121505606669944650465280, prec=116 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=280153111556540953215542460800145041418878976, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=99961970518367115073231831877510988860191686310266891205533259355525058899519208482144256 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=112812380252346714256619501890993673050670816217087917444950810085789266016207277765165056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119844398375027416975362124250156558253081446922452215126903700549285702590021345940078592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123523112981967131966433631211306545068774826918748702154819251296018532790592798371872768 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125404601453928029720323931284714870129867852460400437921184426881038853667772148177960960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126356065534944591108671811195750949899937575479834920054591589616121392668525122285469696 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126834501251325580293361066030583655283751847122811260937259636407222732982902106993197056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127074398013868139835428851315650043196027587579164016306760379080409009090078308965548032 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=116, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=152684853092647189265388777477390849, exp=-116, prec=96, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=152684853092647189265388777477390849 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=152684853092647189265388777477390849, exp=-116, bc=117, prec=96, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 152684853092647189265388777477390849, -116, 117, 96, 'd') / result: (0, 17774856310878785940048841, -83, 84)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 152684853092647189265388777477390849, -116, 117, 96, 'd') / result: (0, 17774856310878785940048841, -83, 84)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 17774856310878785940048841, -83, 84), prec=85 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 67508958414283735, -52, 56), (1, 5764607523034235, -59, 53)), prec=73, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 67508958414283735, -52, 56), b=(1, 5764607523034235, -59, 53), prec=73, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 67508958414283735, -52, 56), t=(0, 67508958414283735, -52, 56), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5764607523034235, -59, 53), t=(1, 5764607523034235, -59, 53), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 4557459466181490704027273085550225, -104, 112), t=(0, 33230699894622898206100982035225, -118, 105), prec=93, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=74669449124617438317681048334636921625 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=74669449124617438317681048334636921625, exp=-118, bc=126, prec=93, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 74669449124617438317681048334636921625, -118, 126, 93, 'd') / result: (0, 1086583493810284392641639691, -82, 90)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 74669449124617438317681048334636921625, -118, 126, 93, 'd') / result: (0, 1086583493810284392641639691, -82, 90)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1086583493810284392641639691, -82, 90), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1081747790531825875942814987 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1081747790531825875942814987, exp=-82, bc=90, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 1081747790531825875942814987, -82, 90, 10, 'd') / result: (0, 447, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1081747790531825875942814987, -82, 90, 10, 'd') / result: (0, 447, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 1086583493810284392641639691, -82, 90), prec=73, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=1086583493810284392641639691, n=3 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=8692667950482275141133117528, prec=93 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=312907331066882805954673047013097322380787712, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=111649066573997101163883314708961278602552405854004562565384162812514307079313742807171072 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119224883449145228264949376443790190395460267521800013737630578008892309077173273326780416 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123203433611901331689246201196194132872739653489530765490595301341980329899582045410033664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125242221982889138200409066295863512174446730949851713118261484844013494787006448703373312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126274233301774349854743701844509464938187302869800354793299663942834247029712326915784704 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126793423557712711665327991690359609194497069322234318174427432959127136241893705982672896 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127053818653178755497656727415238831403797107892162240489259706521666117580943951273132032 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127184216671921089403978678078494305290693487682028834556178481636115327849466318878146560 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=93, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=53625255667592069166403885941, exp=-93, prec=73, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=53625255667592069166403885941 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=53625255667592069166403885941, exp=-93, bc=96, prec=73, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 53625255667592069166403885941, -93, 96, 73, 'd') / result: (0, 6392628630112656255531, -70, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 53625255667592069166403885941, -93, 96, 73, 'd') / result: (0, 6392628630112656255531, -70, 73)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 6392628630112656255531, -70, 73), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 67508958414283735, -52, 56), (1, 5764607523034235, -59, 53)), prec=73, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 5764607523034235, -59, 53), x=(0, 67508958414283735, -52, 56), prec=73, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5764607523034235, -59, 53), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5764607523034235, -59, 53), x=(0, 67508958414283735, -52, 56), prec=73, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5764607523034235, -59, 53), t=(0, 67508958414283735, -52, 56), prec=77, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6606751377106766118225083 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=6606751377106766118225083, exp=-93, bc=83, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 6606751377106766118225083, -93, 83, 77, 'd') / result: (0, 51615245133646610298633, -86, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 6606751377106766118225083, -93, 83, 77, 'd') / result: (0, 51615245133646610298633, -86, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 51615245133646610298633, -86, 76), prec=77, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 51615245133646610298633, -86, 76), prec=117 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=110842894912017670226942764253184, prec=117 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=0, prec=117 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=116 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=0, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=0, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: pi_fixed / f_locals: prec=216, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=6, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=6, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=4, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=6, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=5, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=5, b=6, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=7101583434157760683541000681561997427937677552418571477652645940236617263256392795779825646866410618589286160811223740454114930951454720 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=0, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=0, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=110842878468935637112357183968769, exp=-117, prec=77, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=110842878468935637112357183968769 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=110842878468935637112357183968769, exp=-117, bc=107, prec=77, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 110842878468935637112357183968769, -117, 107, 77, 'd') / result: (0, 103230474953479726903473, -87, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 110842878468935637112357183968769, -117, 107, 77, 'd') / result: (0, 103230474953479726903473, -87, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 103230474953479726903473, -87, 77), prec=73, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=103230474953479726903473, exp=-87, bc=77, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 103230474953479726903473, -87, 77, 73, 'd') / result: (0, 6451904684592482931467, -83, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 103230474953479726903473, -87, 77, 73, 'd') / result: (0, 6451904684592482931467, -83, 73)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 6451904684592482931467, -83, 73), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 6392628630112656255531, -71, 73), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 6451904684592482931467, -83, 73), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=237671772236103552811279, exp=-73, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=237671772236103552811279 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-252519775500656158899, exp=-73, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=252519775500656158899 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((0, 237671772236103552811279, -73, 78), (1, 252519775500656158899, -73, 68)), prec=73, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(0, 237671772236103552811279, -73, 78), prec=77, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=522854409890222228125767157, prec=91 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3058042894831173558448078484, exp=-55, prec=77, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3058042894831173558448078484 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3058042894831173558448078484, exp=-55, bc=92, prec=77, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3058042894831173558448078484, -55, 92, 77, 'd') / result: (0, 93324062952611497755373, -40, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3058042894831173558448078484, -55, 92, 77, 'd') / result: (0, 93324062952611497755373, -40, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 252519775500656158899, -73, 68), prec=77, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=252519775500656158899, exp=-73, mag=-5, wp=87 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=132393088057688016236838912, prec=92 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=61973997074085806151742060128072284983912939027901364307935824556975542928404188671111488478723307954461676127345939841024, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=61973997074085806151742060128072284983912939027901364307935824556975542928404188671111488478723307954461676127345939841024 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=4222205022429174152187510379661609655438819637948721054282259785337299626751970555181994033301932351696372108447240612847976350399177702889189747164272350586539362663309756153132630308536532609847310931733985460025394863440357004306952890061168630799130876 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4222205022429174152187510379661609655438819637948721054282259785337299626751970555181994033301932351696372108447240612847976350399177702889189747164272350586539362663309756153132630308536532609847310931733985460025394863440357004306952890061168630799130876 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=435, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4949990393957405306296819679, exp=-92, prec=77, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4949990393957405306296819679 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4949990393957405306296819679, exp=-92, bc=92, prec=77, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4949990393957405306296819679, -92, 92, 77, 'd') / result: (0, 75530859282797322178601, -76, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4949990393957405306296819679, -92, 92, 77, 'd') / result: (0, 75530859282797322178601, -76, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-132377315215384040753423527, exp=-92, prec=77, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=132377315215384040753423527 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=132377315215384040753423527, exp=-92, bc=87, prec=77, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 132377315215384040753423527, -92, 87, 77, 'd') / result: (1, 129274721890023477298265, -82, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 132377315215384040753423527, -92, 87, 77, 'd') / result: (1, 129274721890023477298265, -82, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 93324062952611497755373, -40, 77), t=(0, 75530859282797322178601, -76, 76), prec=73, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=7048846666572617816565609994434861621713373173, exp=-116, bc=153, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 7048846666572617816565609994434861621713373173, -116, 153, 73, 'd') / result: (0, 728833662930988153811, -33, 70)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 7048846666572617816565609994434861621713373173, -116, 153, 73, 'd') / result: (0, 728833662930988153811, -33, 70)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 93324062952611497755373, -40, 77), t=(1, 129274721890023477298265, -82, 77), prec=73, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=12064442283845894618403443924908441269927327845, exp=-122, bc=154, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 12064442283845894618403443924908441269927327845, -122, 154, 73, 'd') / result: (1, 4989736379231147644497, -41, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 12064442283845894618403443924908441269927327845, -122, 154, 73, 'd') / result: (1, 4989736379231147644497, -41, 73)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((0, 728833662930988153811, -33, 70), (1, 4989736379231147644497, -41, 73)), w=((0, 796608921644692182364851193593963, -73, 110), (1, 6509421100896183573207923067823, -71, 103)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 796608921644692182364851193593963, -73, 110), t=(0, 796608921644692182364851193593963, -73, 110), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 6509421100896183573207923067823, -71, 103), t=(1, 6509421100896183573207923067823, -71, 103), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 634585774043919328957226685311252503427755250461471467648510045369, -146, 219), t=(0, 42372563068792482522629243206615255335304706945290927857959329, -142, 205), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=635263735053020008677588753202558347513120125772596122494237394633 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=635263735053020008677588753202558347513120125772596122494237394633, exp=-146, bc=219, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 635263735053020008677588753202558347513120125772596122494237394633, -146, 219, 63, 'd') / result: (0, 6954641377898784393, 10, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 635263735053020008677588753202558347513120125772596122494237394633, -146, 219, 63, 'd') / result: (0, 6954641377898784393, 10, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 728833662930988153811, -33, 70), t=(0, 796608921644692182364851193593963, -73, 110), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 4989736379231147644497, -41, 73), t=(1, 6509421100896183573207923067823, -71, 103), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 580595398285805535407109848079396339124289363325042993, -106, 179), t=(0, 32480295274876554032009004871233623608061876423720031, -112, 175), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=37190585785566430820087039281952599327562581129226471583 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=37190585785566430820087039281952599327562581129226471583, exp=-112, bc=185, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 37190585785566430820087039281952599327562581129226471583, -112, 185, 63, 'd') / result: (0, 6994771759152800813, 10, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 37190585785566430820087039281952599327562581129226471583, -112, 185, 63, 'd') / result: (0, 6994771759152800813, 10, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 4989736379231147644497, -41, 73), t=(0, 796608921644692182364851193593963, -73, 110), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 728833662930988153811, -33, 70), t=(1, 6509421100896183573207923067823, -71, 103), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 3974868516350615370426266088713634652325140483289371611, -114, 182), t=(1, 4744285224526430888587080759332300917576254108923453, -104, 172), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 3974868516350615370426266088713634652325140483289371611, -114, 182), t=(1, 4744285224526430888587080759332300917576254108923453, -104, 172), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=883279553564449859486904608842641487272943724248244261 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=883279553564449859486904608842641487272943724248244261, exp=-114, bc=180, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 883279553564449859486904608842641487272943724248244261, -114, 180, 63, 'd') / result: (0, 5316045442108635717, 3, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 883279553564449859486904608842641487272943724248244261, -114, 180, 63, 'd') / result: (0, 5316045442108635717, 3, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 6994771759152800813, 10, 63), t=(0, 6954641377898784393, 10, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=579787104952092037 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=579787104952092037, exp=-59, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 579787104952092037, -59, 60, 53, 'n') / result: (0, 4529586757438219, -52, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 579787104952092037, -59, 60, 53, 'n') / result: (0, 4529586757438219, -52, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5316045442108635717, 3, 63), t=(0, 6954641377898784393, 10, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=440639766785934377 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=440639766785934377, exp=-66, bc=59, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 440639766785934377, -66, 59, 53, 'n') / result: (0, 6884996356030225, -60, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 440639766785934377, -66, 59, 53, 'n') / result: (0, 6884996356030225, -60, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 4529586757438219, -52, 53), (0, 6884996356030225, -60, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (1.00577030202902 + 0.0059717824054102j) / count: 241
gamma__ / s: Complex { re: 0.99, im: -0.01 } / result: Complex { re: 1.005770302029023, im: 0.005971782405410201 }
zeta__ / s: Complex { re: 0.01, im: 0.01 } / result: Complex { re: -0.5091873433665667, im: -0.00939202213994577 } / z: Complex { re: 0.0, im: 0.0 }

test_imaginary_axis¶

In [ ]:
inl test_imaginary_axis log = run_test log (3u8, 2u8) fun zeta, gamma =>
    (join a ;[10; 20; 30; 40; 50; 60; 70; 80; 90; 100] : _ i32 _)
    |> am.iter fun s =>
        inl s = .^(0, s)
        inl result = zeta s
        result |> re |> _assert_ne 0
        result |> im |> _assert_ne 0
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_imaginary_axis true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (0.0, 10.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=10j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=10j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=10j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=10.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -49, 53, 53, 'd') / result: (0, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -49, 53, 53, 'd') / result: (0, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 5, 1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='10.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 5, 1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 1, 3), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 10j / result: (0.0 + 10.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 10j / result: (0.0 + 10.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 5, 1, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 5, 1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 5, 1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 5, 1, 3), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=1, bc=3, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 1, 3, 10, 'd') / result: (0, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 1, 3, 10, 'd') / result: (0, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 5, 1, 3), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, 1, 3), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 0, 0, 0), (0, 5, 1, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5, 1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5, 1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5, 1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5, exp=1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5, 1, 3, 73, 'd') / result: (1, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5, 1, 3, 73, 'd') / result: (1, 5, 1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 0, 1), (1, 5, 1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 0, 1), y=(1, 5, 1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 1, 3), t=(1, 5, 1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 25, 2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=101 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=101, exp=0, bc=7, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 101, 0, 7, 14, 'd') / result: (0, 101, 0, 7)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 101, 0, 7, 14, 'd') / result: (0, 101, 0, 7)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 101, 0, 7), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26476544 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26476544 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26476544 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5145, exp=-9, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5145 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5145, exp=-9, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5145, -9, 13, 10, 'd') / result: (0, 643, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5145, -9, 13, 10, 'd') / result: (0, 643, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=42 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 42 / result: [1, 3529, 2076817, 488608401, 61478817681, 4799740409745, 254491767943057, 9737301077340049, 280787600504270737, 6304127587769397137, 113012350730582110097, 1650349868562966130577, 19953578432320987475857, 202422687806400954118033, 1742307499719932947738513, 12843638005836798078758801, 81734555945005570000695185, 452099989999431623684403089, 2186350832000315525854146449, 9291105348305501355511132049, 34850004287731592942713057169, 115831045294414958622024150929, 342338269928330588207073996689, 902588023612218522253187624849, 2129376048079597243081113743249, 4508844085740406908948176973713, 8596648150439746591335183036305, 14812624142603103089500190158737, 23167864599601900460410297134993, 33074864778499446042372674432913, 43407250275812931434634001264529, 52849007091972478107202786439057, 60370565349290053482274943676305, 65560265219140874720086968250257, 68635811674056857455401381408657, 70184409806221592447592820912017, 70837535309536766282327708151697, 71063868323643764693772304396177, 71126606246852371270979753881489, 71139976966417309069652004188049, 71142033349236473553878179393425, 71142236448774168811579530030993, 71142246120180725728612927680401]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 42 / result: [1, 3529, 2076817, 488608401, 61478817681, 4799740409745, 254491767943057, 9737301077340049, 280787600504270737, 6304127587769397137, 113012350730582110097, 1650349868562966130577, 19953578432320987475857, 202422687806400954118033, 1742307499719932947738513, 12843638005836798078758801, 81734555945005570000695185, 452099989999431623684403089, 2186350832000315525854146449, 9291105348305501355511132049, 34850004287731592942713057169, 115831045294414958622024150929, 342338269928330588207073996689, 902588023612218522253187624849, 2129376048079597243081113743249, 4508844085740406908948176973713, 8596648150439746591335183036305, 14812624142603103089500190158737, 23167864599601900460410297134993, 33074864778499446042372674432913, 43407250275812931434634001264529, 52849007091972478107202786439057, 60370565349290053482274943676305, 65560265219140874720086968250257, 68635811674056857455401381408657, 70184409806221592447592820912017, 70837535309536766282327708151697, 71063868323643764693772304396177, 71126606246852371270979753881489, 71139976966417309069652004188049, 71142033349236473553878179393425, 71142236448774168811579530030993, 71142246120180725728612927680401]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 1, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=86 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=86, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: pi_fixed / f_locals: prec=85, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=958288617897701126742203875414927711381592807340433735680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 0, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=0, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=0 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 1, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=108, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 689 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=123 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=123, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 224939120507729810846275465740351, -108, 108, 88, 'd') / result: (0, 214518661983232317777896371, -88, 88)

[2]libmpf._normalize. / x: (0, 356520070949948947528356728229971, -108, 109, 88, 'd') / result: (0, 85001008737075077898110563, -86, 87)

[2]libmpf._normalize. / x: (0, 449878241015459621692550931480702, -108, 109, 88, 'd') / result: (0, 214518661983232317777896371, -87, 88)

[2]libmpf._normalize. / x: (0, 522292463546151898066896762790005, -108, 109, 88, 'd') / result: (0, 124524227034128164784168425, -86, 87)

[2]libmpf._normalize. / x: (0, 581459191457678758374632193970322, -108, 109, 88, 'd') / result: (0, 8664417139555197333911541, -82, 83)

[2]libmpf._normalize. / x: (0, 631483947120683840791049765974625, -108, 109, 88, 'd') / result: (0, 301115010795919342418217547, -87, 88)

[2]libmpf._normalize. / x: (0, 674817361523189432538826397221053, -108, 110, 88, 'd') / result: (0, 80444498243712119166711139, -85, 87)

[2]libmpf._normalize. / x: (0, 713040141899897895056713456459942, -108, 110, 88, 'd') / result: (0, 85001008737075077898110563, -85, 87)

[2]libmpf._normalize. / x: (0, 747231584053881708913172228530356, -108, 110, 88, 'd') / result: (0, 89076946264968122114321259, -85, 87)

[2]libmpf._normalize. / x: (0, 778161505752905805354238767353817, -108, 110, 88, 'd') / result: (0, 92764080256570077580718847, -85, 87)

[2]libmpf._normalize. / x: (0, 806398311965408569220907659710673, -108, 110, 88, 'd') / result: (0, 192260339728691236787058749, -86, 88)

[2]libmpf._normalize. / x: (0, 832373655690528864538379510958074, -108, 110, 88, 'd') / result: (0, 198453344271309105047793271, -86, 88)

[2]libmpf._normalize. / x: (0, 856423067628413651637325231714976, -108, 110, 88, 'd') / result: (0, 102093585446883875326791433, -85, 87)

[2]libmpf._normalize. / x: (0, 878812534496100845595253491019976, -108, 110, 88, 'd') / result: (0, 52381308942800810670569747, -84, 86)

[2]libmpf._normalize. / x: (0, 899756482030919243385101862961404, -108, 110, 88, 'd') / result: (0, 214518661983232317777896371, -86, 88)

[2]libmpf._normalize. / x: (0, 919430296618877781423204854757461, -108, 110, 88, 'd') / result: (0, 219209264902800984721947873, -86, 88)

[2]libmpf._normalize. / x: (0, 937979262407627705902988922200293, -108, 110, 88, 'd') / result: (0, 223631682969958235240695219, -86, 88)

[2]libmpf._normalize. / x: (0, 955525078854587723508080664044832, -108, 110, 88, 'd') / result: (0, 28476866449552408561351319, -83, 85)

[2]libmpf._normalize. / x: (0, 972170704561611519759447694270707, -108, 110, 88, 'd') / result: (0, 231783558025744323673116611, -86, 88)

[2]libmpf._normalize. / x: (0, 988004018070632788319406494204596, -108, 110, 88, 'd') / result: (0, 235558514135034749107219337, -86, 88)

[2]libmpf._normalize. / x: (0, 1003100626260635616200514233094168, -108, 110, 88, 'd') / result: (0, 239157826008948234605911787, -86, 88)

[2]libmpf._normalize. / x: (0, 1017526047957690401622753083176439, -108, 110, 88, 'd') / result: (0, 242597114552900886922539015, -86, 88)

[2]libmpf._normalize. / x: (0, 1031337432473138380067183125451024, -108, 110, 88, 'd') / result: (0, 122945002612249658115766421, -85, 87)

[2]libmpf._normalize. / x: (0, 1044584927092303796133793525580010, -108, 110, 88, 'd') / result: (0, 124524227034128164784168425, -85, 87)

[2]libmpf._normalize. / x: (0, 1057312776198258675384654976698425, -108, 110, 88, 'd') / result: (0, 63020752441779296123066841, -84, 86)

[2]libmpf._normalize. / x: (0, 1069560212849846842585070184689914, -108, 110, 88, 'd') / result: (0, 255003026211225233694331689, -86, 88)

[2]libmpf._normalize. / x: (0, 1081362188136143462483600697455327, -108, 110, 88, 'd') / result: (0, 257816836389575830098056959, -86, 88)

[2]libmpf._normalize. / x: (0, 1092749972487262132322162826065000, -108, 110, 88, 'd') / result: (0, 260531895753684552269497591, -86, 88)

[2]libmpf._normalize. / x: (0, 1103751655003830656441528956760327, -108, 110, 88, 'd') / result: (0, 263154901267011322126753081, -86, 88)

[2]libmpf._normalize. / x: (0, 1114392560881063724586709659212406, -108, 110, 88, 'd') / result: (0, 265691890926614695688893713, -86, 88)

[2]libmpf._normalize. / x: (0, 1124695602538649054231377328701755, -108, 110, 88, 'd') / result: (0, 8379635233720012413199077, -81, 83)

[2]libmpf._normalize. / x: (0, 1134681576702854752882595495583788, -108, 110, 88, 'd') / result: (0, 270529169250215233059548257, -86, 88)

[2]libmpf._normalize. / x: (0, 1144369417126607592269480320497812, -108, 110, 88, 'd') / result: (0, 136419465199304532083210983, -85, 87)

[2]libmpf._normalize. / x: (0, 1153776410666835738857946528764630, -108, 110, 88, 'd') / result: (0, 137540866216043917996638599, -85, 87)

[2]libmpf._normalize. / x: (0, 1162918382915357516749264387940644, -108, 110, 88, 'd') / result: (0, 8664417139555197333911541, -81, 83)

[2]libmpf._normalize. / x: (0, 1171809858390608982398566213337114, -108, 110, 88, 'd') / result: (0, 34922655176836519908862299, -83, 85)

[2]libmpf._normalize. / x: (0, 1180464199362317534354356129785183, -108, 110, 88, 'd') / result: (0, 281444597092227347935284645, -86, 88)

[2]libmpf._normalize. / x: (0, 1188893726640477812066736239188045, -108, 110, 88, 'd') / result: (0, 283454353008384182945903835, -86, 88)

[2]libmpf._normalize. / x: (0, 1197109825069341330605723160011058, -108, 110, 88, 'd') / result: (0, 285413223521552403117590703, -86, 88)

[2]libmpf._normalize. / x: (0, 1205123035993216547930927173891029, -108, 110, 88, 'd') / result: (0, 143661860942031925670019051, -85, 87)

[2]libmpf._normalize. / x: (0, 1212943138578362599165681959944947, -108, 110, 88, 'd') / result: (0, 289188179630842828551693429, -86, 88)

[2]libmpf._normalize. / x: (1, 8700226655003081599103, -73, 73, 73, 'd') / result: (1, 8700226655003081599103, -73, 73)

[2]libmpf._normalize. / x: (0, 20603771379382025534245, -73, 75, 73, 'd') / result: (0, 5150942844845506383561, -71, 73)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -83, 83, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (1, 33518540934880049652796305, -82, 85, 83, 'd') / result: (1, 2094908808430003103299769, -78, 81)

[2]libmpf._normalize. / x: (0, 4951760157141521099596496574, -91, 92, 77, 'd') / result: (0, 151115727451828646838271, -76, 77)

[2]libmpf._normalize. / x: (0, 129340052636251115004738212439967, -107, 107, 77, 'd') / result: (0, 60228655411047448872001, -76, 76)

[2]libmpf._normalize. / x: (1, 97975628097966729340713714188608, -107, 107, 77, 'd') / result: (1, 45623457104883496342559, -76, 76)

[3]libmpf._normalize1 / x: (0, 9101497075885950943049838525391595154027150271, -152, 153, 73, 'd') / result: (0, 941072740797616388625, -69, 70)

[3]libmpf._normalize1 / x: (1, 6894421909271769687891055476365178507687275489, -152, 153, 73, 'd') / result: (1, 5702932138110437042819, -72, 73)

[2]libmpf._normalize1 / x: (1, 350776930438910736913, -69, 69, 73, 'd') / result: (1, 350776930438910736913, -69, 69)

[2]libmpf._normalize1 / x: (0, 5702932138110437042819, -72, 73, 73, 'd') / result: (0, 5702932138110437042819, -72, 73)

[3]libmpf._normalize1 / x: (0, 40398280087294123965090256000551418488719177, -144, 145, 63, 'd') / result: (0, 8354168517174183447, -62, 63)

[3]libmpf._normalize1 / x: (0, 35479155091768986887869343958815400334276537, -143, 145, 63, 'd') / result: (0, 7336917310418335345, -61, 63)

[3]libmpf._normalize1 / x: (1, 8201819239735529702967596966261843447798819, -145, 143, 63, 'd') / result: (1, 6784385862773643201, -65, 63)

[3]libmpf._normalize1 / x: (0, 506267603251841447, -58, 59, 53, 'n') / result: (0, 7910431300810023, -52, 53)

[3]libmpf._normalize1 / x: (1, 468141403938795205, -62, 59, 53, 'n') / result: (1, 7314709436543675, -56, 53)

[7]gammazeta.mpc_zeta / s: ((0, 0, 0, 0), (0, 5, 1, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7910431300810023, -52, 53), (1, 7314709436543675, -56, 53))

zeta_ / result: (1.75646859297496 - 0.101511985436171j) / count: 1621
zeta / count: 0 / s: Complex { re: 0.0, im: 10.0 }
gamma_ / s: (1.0, -10.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-10j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-10j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-10.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -49, 53, 53, 'd') / result: (1, 5, 1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -49, 53, 53, 'd') / result: (1, 5, 1, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 5, 1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-10.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 5, 1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, 1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 1, 3), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-10j) / result: (1.0 - 10.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-10j) / result: (1.0 - 10.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 5, 1, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 5, 1, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 5, 1, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5, 1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=40 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 5, 1, 3), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1738090059391754815135185004134400, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1738090059391754815135185004134400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=26957663733409247151875200699596800, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=26957663733409247151875200699596800 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=6649092007880460460883968, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6649092007880460460883968 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=6649092007880460460883968, y=-6044629098073145873530880, prec=79 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=79, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: ln_sqrt2pi_fixed / f_locals: prec=92 / f_lineno: 298 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: f / f_locals: prec=102, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=16703571626015105435307505830654230989 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=16703571626015105435307505830654230989, exp=-122, bc=124, prec=102, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 16703571626015105435307505830654230989, -122, 124, 102, 'd') / result: (0, 124451306656115542615260972311, -95, 97)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 16703571626015105435307505830654230989, -122, 124, 102, 'd') / result: (0, 124451306656115542615260972311, -95, 97)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 124451306656115542615260972311, -95, 97), n=1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 124451306656115542615260972311, -94, 97), prec=102, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=124451306656115542615260972311, n=25 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=4175892906503776358826876457663332352, prec=122 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=280153111556540953215542460800145041418878976, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=99961970518367115073231831877510988860191686310266891205533259355525058899519208482144256 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=112812380252346714256619501890993673050670816217087917444950810085789266016207277765165056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119844398375027416975362124250156558253081446922452215126903700549285702590021345940078592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123523112981967131966433631211306545068774826918748702154819251296018532790592798371872768 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125404601453928029720323931284714870129867852460400437921184426881038853667772148177960960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126356065534944591108671811195750949899937575479834920054591589616121392668525122285469696 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126834501251325580293361066030583655283751847122811260937259636407222732982902106993197056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127074398013868139835428851315650043196027587579164016306760379080409009090078308965548032 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=9771830597929420112984881758595737588, exp=-122, prec=102, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9771830597929420112984881758595737588 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=9771830597929420112984881758595737588, exp=-122, bc=123, prec=102, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9771830597929420112984881758595737588, -122, 123, 102, 'd') / result: (0, 291223245797438028841760210949, -97, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9771830597929420112984881758595737588, -122, 123, 102, 'd') / result: (0, 291223245797438028841760210949, -97, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 291223245797438028841760210949, -97, 98), prec=91 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 11, 0, 4), (1, 5, 1, 3)), prec=79, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 11, 0, 4), b=(1, 5, 1, 3), prec=79, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 11, 0, 4), t=(0, 11, 0, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 1, 3), t=(1, 5, 1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 121, 0, 7), t=(0, 25, 2, 5), prec=99, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=221 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=221, exp=0, bc=8, prec=99, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 221, 0, 8, 99, 'd') / result: (0, 221, 0, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 221, 0, 8, 99, 'd') / result: (0, 221, 0, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 221, 0, 8), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=220 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=220, exp=0, bc=8, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 220, 0, 8, 10, 'd') / result: (0, 55, 2, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 220, 0, 8, 10, 'd') / result: (0, 55, 2, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 221, 0, 8), prec=79, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=221, n=91 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=547169497364138081505412907008, prec=99 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=308029043054704232142462108640955493301354496, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=109908435246562847916339476840447405662200809326213845554342538893388248839769875992805376 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=118291862753709150131263922608705831074205530275510602606549069337890412719234621720494080 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=122720408891748459164239261578246212302744442144292613417064195351058734854083809741111296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=124996471935953598871863436722714642911588073555186052405117832278561625162408481934802944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126150284940329561435124428392252052834497874367950658167900095639683070482042430267850752 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126731179285204378289163486700286049719768939159446710895966856920116539608818485483798528 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127022628773197607380650969840788501219422493759435890392803195212456762670331997345284096 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127168604768330981706003894812035001972279098572598673423059029498049177655013356632801280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3421492094354309855393719464287, exp=-99, prec=79, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3421492094354309855393719464287 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3421492094354309855393719464287, exp=-99, bc=102, prec=79, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3421492094354309855393719464287, -99, 102, 79, 'd') / result: (0, 203936820885795942270381, -75, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3421492094354309855393719464287, -99, 102, 79, 'd') / result: (0, 203936820885795942270381, -75, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 203936820885795942270381, -75, 78), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 11, 0, 4), (1, 5, 1, 3)), prec=79, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 5, 1, 3), x=(0, 11, 0, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5, 1, 3), x=(0, 11, 0, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5, 1, 3), t=(0, 11, 0, 4), prec=83, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=562700017856991034045056465 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=562700017856991034045056465, exp=-89, bc=89, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 562700017856991034045056465, -89, 89, 83, 'd') / result: (0, 8792187779015484906954007, -83, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 562700017856991034045056465, -89, 89, 83, 'd') / result: (0, 8792187779015484906954007, -83, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 8792187779015484906954007, -83, 83), prec=83, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 8792187779015484906954007, -83, 83), prec=113 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=9440539742790595688237265760288768, prec=113 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=116, prec=113 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=112 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=323360805378694035552267914953401241836716032, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=62633855149231220398318583293929324544, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: pi_fixed / f_locals: prec=141, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=4, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=2, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=4, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=4, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=4975718980279915354764599392708942505205063788727463912991842088816060767610396422208225280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=62633855149231220398318583293929324544, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=1941851908321355259421251217346264929495938756207576081648655836118567011756664578361493305666663649239799185323506115018752, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1941851908321355259421251217346264929495938756207576081648655836118567011756664578361493305666663649239799185323506115018752 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=3619976286560776085918574864892616653164043340614317721071912438365374793987916950565526802919294720159380545413320504443060245025882973954924242318325345206780117781708389182276453085057433959151321394395987385260121130257475431575108541839867590372406919752288700 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3619976286560776085918574864892616653164043340614317721071912438365374793987916950565526802919294720159380545413320504443060245025882973954924242318325345206780117781708389182276453085057433959151321394395987385260121130257475431575108541839867590372406919752288700 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=323360805378694035552267914953401241836716032, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=295780018249642137187780669996057826630868969532716568543232, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: pi_fixed / f_locals: prec=216, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=6, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=6, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=4, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=6, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=5, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=5, b=6, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=7101583434157760683541000681561997427937677552418571477652645940236617263256392795779825646866410618589286160811223740454114930951454720 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=295780018249642137187780669996057826630868969532716568543232, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=323360805378694035552267914953401241836716032, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=295780018249642137187780669995878986041004079241103370019469, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7661909637686349904784111761883384, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7661909637686349904784111761883384 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7661909637686349904784111761883384, exp=-113, bc=113, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7661909637686349904784111761883384, -113, 113, 83, 'd') / result: (0, 3567854705120599784322135, -82, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7661909637686349904784111761883384, -113, 113, 83, 'd') / result: (0, 3567854705120599784322135, -82, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 3567854705120599784322135, -82, 82), prec=79, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3567854705120599784322135, exp=-82, bc=82, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3567854705120599784322135, -82, 82, 79, 'd') / result: (0, 222990919070037486520133, -78, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3567854705120599784322135, -82, 82, 79, 'd') / result: (0, 222990919070037486520133, -78, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 222990919070037486520133, -78, 78), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 203936820885795942270381, -76, 78), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 222990919070037486520133, -78, 78), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=6579754329665770566980316, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6579754329665770566980316 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-14950847010811600931400267, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=14950847010811600931400267 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((0, 1644938582416442641745079, -77, 81), (1, 14950847010811600931400267, -79, 84)), prec=79, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(0, 1644938582416442641745079, -77, 81), prec=83, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=77339794964679558976243823664, prec=97 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=258155399902223834737301376586, exp=-82, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=258155399902223834737301376586 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=258155399902223834737301376586, exp=-82, bc=98, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 258155399902223834737301376586, -82, 98, 83, 'd') / result: (0, 7878277584906733237832683, -67, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 258155399902223834737301376586, -82, 98, 83, 'd') / result: (0, 7878277584906733237832683, -67, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 14950847010811600931400267, -79, 84), prec=83, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=14950847010811600931400267, exp=-79, mag=5, wp=93 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=117, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=12172370845285091646056852561448041, prec=113 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=3098699853704290307587103006403614249195646951395068215396791227848777146420209433555574423936165397723083806367296992051200, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3098699853704290307587103006403614249195646951395068215396791227848777146420209433555574423936165397723083806367296992051200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=109518749919556303121581747285590908436343924577850808564547178036039270031157495363538651925742629958981704686168434856827691958556114310943045713840192151765556190163334022836038671280422256481649022524123829789727230721066856535629184071767006792300818056793579255 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=109518749919556303121581747285590908436343924577850808564547178036039270031157495363538651925742629958981704686168434856827691958556114310943045713840192151765556190163334022836038671280422256481649022524123829789727230721066856535629184071767006792300818056793579255 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=9570336542451826037551145472633440, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9570336542451826037551145472633440 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=9570336542451826037551145472633440, exp=-113, bc=113, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9570336542451826037551145472633440, -113, 113, 83, 'd') / result: (0, 4456535234326415712736149, -82, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9570336542451826037551145472633440, -113, 113, 83, 'd') / result: (0, 4456535234326415712736149, -82, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4030936011996939022962878130262610, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4030936011996939022962878130262610 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4030936011996939022962878130262610, exp=-113, bc=112, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4030936011996939022962878130262610, -113, 112, 83, 'd') / result: (0, 7508203409606477288460131, -84, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4030936011996939022962878130262610, -113, 112, 83, 'd') / result: (0, 7508203409606477288460131, -84, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 7878277584906733237832683, -67, 83), t=(0, 4456535234326415712736149, -82, 82), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35109821642940876871250811535525549324612587757767, exp=-149, bc=165, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 35109821642940876871250811535525549324612587757767, -149, 165, 79, 'd') / result: (0, 453783808956802859976927, -63, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 35109821642940876871250811535525549324612587757767, -149, 165, 79, 'd') / result: (0, 453783808956802859976927, -63, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 7878277584906733237832683, -67, 83), t=(0, 7508203409606477288460131, -84, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=59151710624823017870779423322657291655060894261473, exp=-151, bc=166, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 59151710624823017870779423322657291655060894261473, -151, 166, 79, 'd') / result: (0, 382258970532816713324613, -64, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 59151710624823017870779423322657291655060894261473, -151, 166, 79, 'd') / result: (0, 382258970532816713324613, -64, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((0, 453783808956802859976927, -63, 79), (0, 382258970532816713324613, -64, 79)), w=((1, 44928575, 6, 26), (0, 696839275, 6, 30)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 44928575, 6, 26), t=(1, 44928575, 6, 26), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 696839275, 6, 30), t=(0, 696839275, 6, 30), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 2018576851530625, 12, 51), t=(0, 485584975182525625, 12, 59), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=487603552034056250 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=487603552034056250, exp=12, bc=59, prec=63, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 487603552034056250, 12, 59, 63, 'd') / result: (0, 243801776017028125, 13, 58)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 487603552034056250, 12, 59, 63, 'd') / result: (0, 243801776017028125, 13, 58)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 453783808956802859976927, -63, 79), t=(1, 44928575, 6, 26), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 382258970532816713324613, -64, 79), t=(0, 696839275, 6, 30), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 20387859894501389054687862989025, -57, 105), t=(0, 266373063888334362221006162575575, -58, 108), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=225597344099331584111630436597525 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=225597344099331584111630436597525, exp=-58, bc=108, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 225597344099331584111630436597525, -58, 108, 63, 'd') / result: (0, 6411862162262070345, -13, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 225597344099331584111630436597525, -58, 108, 63, 'd') / result: (0, 6411862162262070345, -13, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 382258970532816713324613, -64, 79), t=(1, 44928575, 6, 26), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 453783808956802859976927, -63, 79), t=(0, 696839275, 6, 30), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 17174350827006445665858374516475, -58, 104), t=(0, 316214380440197011264248327407925, -57, 108), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 17174350827006445665858374516475, -58, 104), t=(0, 316214380440197011264248327407925, -57, 108), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=649603111707400468194355029332325 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=649603111707400468194355029332325, exp=-58, bc=110, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 649603111707400468194355029332325, -58, 110, 63, 'd') / result: (1, 4615707721508502943, -11, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 649603111707400468194355029332325, -58, 110, 63, 'd') / result: (1, 4615707721508502943, -11, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 6411862162262070345, -13, 63), t=(0, 243801776017028125, 13, 58), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=473769478081203007 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=473769478081203007, exp=-80, bc=59, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 473769478081203007, -80, 59, 53, 'n') / result: (0, 7402648095018797, -74, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 473769478081203007, -80, 59, 53, 'n') / result: (0, 7402648095018797, -74, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 4615707721508502943, -11, 63), t=(0, 243801776017028125, 13, 58), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=341052471630640525 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=341052471630640525, exp=-78, bc=59, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 341052471630640525, -78, 59, 53, 'n') / result: (1, 2664472434614379, -71, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 341052471630640525, -78, 59, 53, 'n') / result: (1, 2664472434614379, -71, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 7402648095018797, -74, 53), (1, 2664472434614379, -71, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (3.91892927088138e-7 - 1.12844796958463e-6j) / count: 247
gamma__ / s: Complex { re: 1.0, im: -10.0 } / result: Complex { re: 3.918929270881377e-7, im: -1.1284479695846292e-6 }
zeta__ / s: Complex { re: 0.0, im: 10.0 } / result: Complex { re: 1.756468592974963, im: -0.10151198543617117 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.0, 20.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=20j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=20j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=20j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=20.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -48, 53, 53, 'd') / result: (0, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -48, 53, 53, 'd') / result: (0, 5, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 5, 2, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='20.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 5, 2, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 2, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 2, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 2, 3), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 20j / result: (0.0 + 20.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 20j / result: (0.0 + 20.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 5, 2, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 5, 2, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 5, 2, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 5, 2, 3), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=2, bc=3, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 2, 3, 10, 'd') / result: (0, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 2, 3, 10, 'd') / result: (0, 5, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 5, 2, 3), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, 2, 3), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 0, 0, 0), (0, 5, 2, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5, 2, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5, 2, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5, 2, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5, exp=2, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5, 2, 3, 73, 'd') / result: (1, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5, 2, 3, 73, 'd') / result: (1, 5, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 0, 1), (1, 5, 2, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 0, 1), y=(1, 5, 2, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 2, 3), t=(1, 5, 2, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 25, 4, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=401 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=401, exp=0, bc=9, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 401, 0, 9, 14, 'd') / result: (0, 401, 0, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 401, 0, 9, 14, 'd') / result: (0, 401, 0, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 401, 0, 9), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26279936 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26279936 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26279936 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5126, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5126 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5126, exp=-8, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5126, -8, 13, 10, 'd') / result: (0, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5126, -8, 13, 10, 'd') / result: (0, 5, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 2, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=51 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 51 / result: [1, 5203, 4513603, 1565622243, 290593736163, 33496712602083, 2625586476196323, 148751086335959523, 6363955680371220963, 212481263589749760483, 5680014062870106808803, 124072217794473336054243, 2251700226884154557276643, 34421435724320134622159331, 448372741172808513023189475, 5025627406017013340859867619, 48878680162750201530133848547, 415493327986419814021568733667, 3106328457409671065069814620643, 20537428285849907476554468631011, 120654514479968188404056071152099, 632519106148387088105405727711715, 2969998002562308490547087034622435, 12532206357554137686622525347144163, 47661454073056035016885483119387107, 163803048561041899659795670039863779, 509950545858568398203371129096970723, 1441234867728223897429622364156273123, 3705344284013931812431625366793953763, 8682823787209492951643530334480179683, 18581540087349817929059296145923973603, 36389807064122628914341387785549455843, 65363574764427599168173362278590915043, 107966494730283951699915109388638822883, 164521029399620918361893618282749829603, 232199126788599731468774732445888881123, 305066937435888344015776620621537812963, 375479742245004700456974298569869435363, 436355935595763543359118536627655090659, 483264863805439188539125785001186894307, 515329194480407351067232005408411165155, 534658550099584183762585408978198274531, 544861078596223705322955535934138687971, 549533864561579261846090855366216458723, 551369776288824496174929810545381810659, 551979454839944636413969962951946084835, 552147240241495138457776521855998173667, 552184474704891154697193671738617831907, 552190876419650469769935567683348931043, 552191676465635538811216587290159423971, 552191741115816150450916063622022898147, 552191743651117350907374866615429308899]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 51 / result: [1, 5203, 4513603, 1565622243, 290593736163, 33496712602083, 2625586476196323, 148751086335959523, 6363955680371220963, 212481263589749760483, 5680014062870106808803, 124072217794473336054243, 2251700226884154557276643, 34421435724320134622159331, 448372741172808513023189475, 5025627406017013340859867619, 48878680162750201530133848547, 415493327986419814021568733667, 3106328457409671065069814620643, 20537428285849907476554468631011, 120654514479968188404056071152099, 632519106148387088105405727711715, 2969998002562308490547087034622435, 12532206357554137686622525347144163, 47661454073056035016885483119387107, 163803048561041899659795670039863779, 509950545858568398203371129096970723, 1441234867728223897429622364156273123, 3705344284013931812431625366793953763, 8682823787209492951643530334480179683, 18581540087349817929059296145923973603, 36389807064122628914341387785549455843, 65363574764427599168173362278590915043, 107966494730283951699915109388638822883, 164521029399620918361893618282749829603, 232199126788599731468774732445888881123, 305066937435888344015776620621537812963, 375479742245004700456974298569869435363, 436355935595763543359118536627655090659, 483264863805439188539125785001186894307, 515329194480407351067232005408411165155, 534658550099584183762585408978198274531, 544861078596223705322955535934138687971, 549533864561579261846090855366216458723, 551369776288824496174929810545381810659, 551979454839944636413969962951946084835, 552147240241495138457776521855998173667, 552184474704891154697193671738617831907, 552190876419650469769935567683348931043, 552191676465635538811216587290159423971, 552191741115816150450916063622022898147, 552191743651117350907374866615429308899]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 2, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-130931800526875193956220, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2589966124402334274607, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-207521993986999701899680, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=178531914987564237162, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-261863601053750387912460, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5179932248804668549194, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-304014226157539464805080, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7536562695441434400183, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-338453794513874895855900, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2768498039389898511769, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-367572034662987478537860, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3321761590561210992215, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=929609956111287092276130901921084274758694085418520464619037368354633143926062830066672327180849619316925141910189097615360, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=929609956111287092276130901921084274758694085418520464619037368354633143926062830066672327180849619316925141910189097615360 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=59746794588905236910765977525584940823971034097807218298408054811603641981328586723955533926572023511735877411765673559892304120848944242031102008145028388466880664131356950135079087639442333516298936860524888577632956659667734589439349880378495918378548633495447 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=59746794588905236910765977525584940823971034097807218298408054811603641981328586723955533926572023511735877411765673559892304120848944242031102008145028388466880664131356950135079087639442333516298936860524888577632956659667734589439349880378495918378548633495447 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-392795401580625581868700, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7769898373207002823781, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2169089897593003215310972104482529974436952865976547750777753859494144002494146603488902096755315778406158664457107894435840, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2169089897593003215310972104482529974436952865976547750777753859494144002494146603488902096755315778406158664457107894435840 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4311787910361773909996404667941546608815450721895937528775402010530350020654224937952732133491925400558570679641017808484957101533211174333318378098863363505913178984456216894958130948461813006989814712161386071078987559723250031319464392578103119179333998226564092 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4311787910361773909996404667941546608815450721895937528775402010530350020654224937952732133491925400558570679641017808484957101533211174333318378098863363505913178984456216894958130948461813006989814712161386071078987559723250031319464392578103119179333998226564092 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-415043987973999403799360, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=357063829975128474324, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=92960995611128709227613090192108427475869408541852046461903736835463314392606283006667232718084961931692514191018909761536, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=92960995611128709227613090192108427475869408541852046461903736835463314392606283006667232718084961931692514191018909761536 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=151964592821161256362817132569602909163692577192404380374686244720866533018675680134507837334600689001346580164602223204197656205422684050331958320654414320551976719155465884678906404925632580588706899859408343546298836410655532897086749966905803890171880591 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=151964592821161256362817132569602909163692577192404380374686244720866533018675680134507837334600689001346580164602223204197656205422684050331958320654414320551976719155465884678906404925632580588706899859408343546298836410655532897086749966905803890171880591 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-434946026684414658761320, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10126528819843768674770, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2830145866383251814262887412515301014265357548940828970062402654768549793730457949314091307195031063253749876482131252740096, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2830145866383251814262887412515301014265357548940828970062402654768549793730457949314091307195031063253749876482131252740096 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=99280149635882160368162407015798443222641189554406445373196466423186645492665787714755247682188280825190654819137321244640841709522246583916973405382240090866107740055817251701388199798831048025209607410618102196801384448818110406617921175013839164961637932186178716 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=99280149635882160368162407015798443222641189554406445373196466423186645492665787714755247682188280825190654819137321244640841709522246583916973405382240090866107740055817251701388199798831048025209607410618102196801384448818110406617921175013839164961637932186178716 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-452949610627783581937100, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6958696726616793080193, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-469385595040750089812140, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5358464163792232786356, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1497704929290406982000433119761746887111229359840949637441782426793575620769767892885194304902479942232823839744193546158080, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1497704929290406982000433119761746887111229359840949637441782426793575620769767892885194304902479942232823839744193546158080 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2321145469279060164373136913650582993961459064064500815565600999363197199446308528627583619958571332945556408737690891570586553511352753217215593230040737053370391332738816015380276448175336183339774831326480666755057961681574015410895537744289189726695369504613975 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2321145469279060164373136913650582993961459064064500815565600999363197199446308528627583619958571332945556408737690891570586553511352753217215593230040737053370391332738816015380276448175336183339774831326480666755057961681574015410895537744289189726695369504613975 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-484505235037375744745580, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5074576017308525434119, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-498503835189862672494080, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5911727714963545266822, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1652639921975621497379788270081927599571011707410703048211621988186014478090778364562973026099288212118978030062558395760640, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1652639921975621497379788270081927599571011707410703048211621988186014478090778364562973026099288212118978030062558395760640 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2759639370250446046035618699433101836681269827216438157437785627638180799859584813895530658709571582911419845219503459802621716728298352345712539886775941221002314688075463505341699920263448730067265230020115887634670014860347232971446215485181468042223966857778951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2759639370250446046035618699433101836681269827216438157437785627638180799859584813895530658709571582911419845219503459802621716728298352345712539886775941221002314688075463505341699920263448730067265230020115887634670014860347232971446215485181468042223966857778951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-511536220144539166704780, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7715094610428998637325, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2158760898080655580952348427794517926939634042805230856726431222067981412006079238710383515342195227080415051769216904462336, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2158760898080655580952348427794517926939634042805230856726431222067981412006079238710383515342195227080415051769216904462336 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4280367579121198027479293172962589372023726345441106627213251618829068115051893272547921412784271723933743425373412546677442823038595541704931586746756230499585622719500386451397471109850611583217429020283316063172822901726132219475500343140730707560906068116278151 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4280367579121198027479293172962589372023726345441106627213251618829068115051893272547921412784271723933743425373412546677442823038595541704931586746756230499585622719500386451397471109850611583217429020283316063172822901726132219475500343140730707560906068116278151 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-523727202107500775824940, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10359864497609337098368, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2892119863457337620414629472643373299249270487968730334370338479325525336658862137985202795673754371208211552609477192581120, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2892119863457337620414629472643373299249270487968730334370338479325525336658862137985202795673754371208211552609477192581120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=101786285428711556364796266260398890728169015415543836698438131307860059409926717867272821166177076936180960152977606799651777606996856413318757830360739563036549007729436879005191084828565626441347681127564623491314105482681641063169529294467945621087579894778091807 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=101786285428711556364796266260398890728169015415543836698438131307860059409926717867272821166177076936180960152977606799651777606996856413318757830360739563036549007729436879005191084828565626441347681127564623491314105482681641063169529294467945621087579894778091807 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-535178869391603966606300, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13743949063648093898211, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3842387818593319981408007727940481669002602219729884587092021122532483661561059697608912285680845093176623919895448270143488, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3842387818593319981408007727940481669002602219729884587092021122532483661561059697608912285680845093176623919895448270143488 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=127200483306278410437392628028079116521157840480236212236641183886391056107444734045696392736614197618922363313265100448344290928214909066244138501098594287553073036957984609046079673604337935558137202100642186359891763279721548876979682320409213077816340560289455127 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=127200483306278410437392628028079116521157840480236212236641183886391056107444734045696392736614197618922363313265100448344290928214909066244138501098594287553073036957984609046079673604337935558137202100642186359891763279721548876979682320409213077816340560289455127 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-545975788500874597755600, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2947029954377462748911, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=815990961475463114331270458352951752288187030534034630054488356666844648557321817502967931636523554733745402343388207906816, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=815990961475463114331270458352951752288187030534034630054488356666844648557321817502967931636523554733745402343388207906816 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=46475113219809865191779838456892814609704958414107697121361246326898149305792255610045665163243608191029430511455240154957557912528067270118370234602982278687502841915305219853852304202478531410178664525979665466986244260529722533146963314649087570302243703296700 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=46475113219809865191779838456892814609704958414107697121361246326898149305792255610045665163243608191029430511455240154957557912528067270118370234602982278687502841915305219853852304202478531410178664525979665466986244260529722533146963314649087570302243703296700 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-556188797842820479713880, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7569772462573528371834, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2117444900031265043517853721042469736950358750119963280521140672363331050053809779596309189689713021777440601017652944568320, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2117444900031265043517853721042469736950358750119963280521140672363331050053809779596309189689713021777440601017652944568320 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4154552979615420050536478423752187419793882432674079951778984941499626982888569234403826893034695626685766600683907094266140934921169744167166210011377611380769907693040338772747315550579906182376870085774149123330568770091643966358596027294151678832159588890185152 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4154552979615420050536478423752187419793882432674079951778984941499626982888569234403826893034695626685766600683907094266140934921169744167166210011377611380769907693040338772747315550579906182376870085774149123330568770091643966358596027294151678832159588890185152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-565877827211289852717560, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12716494944246102949357, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3553175832247586219366544780676144339077675170933011553654987274599931127895173483810392006113469656055802764634500550885376, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3553175832247586219366544780676144339077675170933011553654987274599931127895173483810392006113469656055802764634500550885376 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=122442795294276829041817208246865990346753089002237073883958560233881601634170981756294920694749241676773214483153367525378066107421794074918692875276015320764585864952915261146530843568366246457723110821730000619098706995497020440245373965027587474590378662209358287 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=122442795294276829041817208246865990346753089002237073883958560233881601634170981756294920694749241676773214483153367525378066107421794074918692875276015320764585864952915261146530843568366246457723110821730000619098706995497020440245373965027587474590378662209358287 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-575094028649987180437540, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3500293505548775229377, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=970925954160677629710625608673132464747969378103788040824327918059283505878332289180746652833331824619899592661753057509376, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=970925954160677629710625608673132464747969378103788040824327918059283505878332289180746652833331824619899592661753057509376 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=64929990977759383465373428044568061762477902676461186198293219801123688818587960512193816046945022909138319699717591540770309132928920245514833595742306991979233936835594229973664719516680798560244651577938990669663490223777730480611013669695818803046384827258352 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=64929990977759383465373428044568061762477902676461186198293219801123688818587960512193816046945022909138319699717591540770309132928920245514833595742306991979233936835594229973664719516680798560244651577938990669663490223777730480611013669695818803046384827258352 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-583881411154658775893320, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9548662851019127354800, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2664881874185689664524908585507108254308256378199758665241240455949948345921380112857794004585102242041852073475875413164032, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2664881874185689664524908585507108254308256378199758665241240455949948345921380112857794004585102242041852073475875413164032 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=92238937456528038556476385330924934194160525388450375935851700086795493953899719787294438849109205048569688387078873173347273784774233864026802055700044212042778698868844140060080780629497504271069520981498606792012694149132575114514273130789100283735136476151633791 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=92238937456528038556476385330924934194160525388450375935851700086795493953899719787294438849109205048569688387078873173347273784774233864026802055700044212042778698868844140060080780629497504271069520981498606792012694149132575114514273130789100283735136476151633791 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-592278111701418180963220, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1151962304259722284900, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=320198984882776665117333977328373472416883518310823715591001760211040305130088308134076023806737091098051993324620689178624, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=320198984882776665117333977328373472416883518310823715591001760211040305130088308134076023806737091098051993324620689178624 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=28718110839128371638488876187214713838860438558843351647319359346081140020806476638376093905861366427717706038606472152558138629925800202468494318930527478976964721669758086241537166935712525542701688393612332302587886265627222986709313369683907762525337980912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=28718110839128371638488876187214713838860438558843351647319359346081140020806476638376093905861366427717706038606472152558138629925800202468494318930527478976964721669758086241537166935712525542701688393612332302587886265627222986709313369683907762525337980912 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=441, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-600317395567625283768380, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7948430288194567060943, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2220734895154741387104090487922590211923546981833132221034367046624956954934483427381495003820918535034876727896562844303360, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 1220579221564782150033120128189249, -108, 110, 88, 'd') / result: (0, 291008763686366593845634491, -86, 88)

[2]libmpf._normalize. / x: (0, 1228039746768365427046789698834519, -108, 110, 88, 'd') / result: (0, 36598436438094539256298235, -83, 85)

[2]libmpf._normalize. / x: (0, 1235332605446049793123610219249947, -108, 110, 88, 'd') / result: (0, 294526244508278320580389551, -86, 88)

[2]libmpf._normalize. / x: (0, 1242465168465420212469028548916790, -108, 110, 88, 'd') / result: (0, 74056695012177241591753277, -84, 86)

[2]libmpf._normalize. / x: (0, 1249444331078408621166331932414016, -108, 110, 88, 'd') / result: (0, 297890742082216410914977057, -86, 88)

[2]libmpf._normalize. / x: (0, 1256276552980868190913458591191375, -108, 110, 88, 'd') / result: (0, 149759835360153697838003467, -85, 87)

[2]libmpf._normalize. / x: (0, 1262967894241367681582099531949250, -108, 110, 88, 'd') / result: (0, 301115010795919342418217547, -86, 88)

[2]libmpf._normalize. / x: (0, 1269524047600033606980068991320361, -108, 110, 88, 'd') / result: (0, 302678119564064409012810943, -86, 88)

[2]libmpf._normalize. / x: (0, 1275950367568826728951561582987432, -108, 110, 88, 'd') / result: (0, 304210273639876062620058437, -86, 88)

[2]libmpf._normalize. / x: (0, 31236536667936894013261, -73, 75, 73, 'd') / result: (0, 7809134166984223503315, -71, 73)

[2]libmpf._normalize. / x: (1, 8472474217761468126739, -73, 73, 73, 'd') / result: (1, 8472474217761468126739, -73, 73)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -83, 83, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (1, 33518540934880049652796305, -81, 85, 83, 'd') / result: (1, 2094908808430003103299769, -77, 81)

[2]libmpf._normalize. / x: (0, 4951760157141521099596496574, -91, 92, 77, 'd') / result: (0, 151115727451828646838271, -76, 77)

[2]libmpf._normalize. / x: (0, 43939709667641601545665774827174, -107, 106, 77, 'd') / result: (0, 40922043535524608144225, -77, 76)

[2]libmpf._normalize. / x: (1, 156196590332384208073409055586734, -107, 107, 77, 'd') / result: (1, 36367352663628805445835, -75, 75)

[3]libmpf._normalize1 / x: (0, 6183964377686203042617580680628503263017634975, -153, 153, 73, 'd') / result: (0, 1278813860485144004507, -71, 71)

[3]libmpf._normalize1 / x: (1, 5495678953261465136186508842926836759295551285, -151, 152, 73, 'd') / result: (1, 4545919082953600680729, -71, 72)

[2]libmpf._normalize1 / x: (0, 1082369380949678602341, -71, 70, 73, 'd') / result: (0, 1082369380949678602341, -71, 70)

[2]libmpf._normalize1 / x: (0, 4545919082953600680729, -71, 72, 73, 'd') / result: (0, 4545919082953600680729, -71, 72)

[2]libmpf._normalize. / x: (0, 21836903785579096268109734684747167402651722, -142, 144, 63, 'd') / result: (0, 2257882931202105719, -59, 61)

[3]libmpf._normalize1 / x: (1, 4705711370067446126156207608501339725871071, -144, 142, 63, 'd') / result: (1, 7784946427180274371, -65, 63)

[3]libmpf._normalize1 / x: (1, 151169114798344799414573307766524373722562539, -144, 147, 63, 'd') / result: (1, 7815260061124613239, -60, 63)

[3]libmpf._normalize1 / x: (1, 496894237964865629, -63, 59, 53, 'n') / result: (1, 7763972468201025, -57, 53)

[3]libmpf._normalize1 / x: (1, 498829083654506923, -58, 59, 53, 'n') / result: (1, 7794204432101671, -52, 53)

[7]gammazeta.mpc_zeta / s: ((0, 0, 0, 0), (0, 5, 2, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 7763972468201025, -57, 53), (1, 7794204432101671, -52, 53))

zeta_ / result: (-0.0538733812297036 - 1.73066104383094j) / count: 852
zeta / count: 0 / s: Complex { re: 0.0, im: 20.0 }
gamma_ / s: (1.0, -20.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-20j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-20j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-20.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -48, 53, 53, 'd') / result: (1, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -48, 53, 53, 'd') / result: (1, 5, 2, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 5, 2, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-20.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 5, 2, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 2, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, 2, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 2, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 2, 3), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-20j) / result: (1.0 - 20.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-20j) / result: (1.0 - 20.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 5, 2, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 5, 2, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 5, 2, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5, 2, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=100 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 5, 2, 3), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1208925819614629174706176, y=-24178516392292583494123520, prec=80 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=80, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 5, 2, 3)), prec=80, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 5, 2, 3), prec=80, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 2, 3), t=(1, 5, 2, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 25, 4, 5), prec=100, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=401 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=401, exp=0, bc=9, prec=100, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 401, 0, 9, 100, 'd') / result: (0, 401, 0, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 401, 0, 9, 100, 'd') / result: (0, 401, 0, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 401, 0, 9), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=400, exp=0, bc=9, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 400, 0, 9, 10, 'd') / result: (0, 25, 4, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 400, 0, 9, 10, 'd') / result: (0, 25, 4, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 401, 0, 9), prec=80, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=401, n=91 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=992827911506874980469097627648, prec=100 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=279456213269086871242369469604124780121817088, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=99713308900162221752154140753437578440141458234868217346813027367078479151012941794377728 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=112671978977967319291392025605980458448567356475818439894225788607360998996422754366914560 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119769798651131775528497549904931295684686607287742375117877848591832274600513449091923968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123484662187934556628167612605022054105983126588637769420661073063715403894217287772667904 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125385081698923981867780564134555826160557602299686251374155575778022057074088278046539776 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126346231225041620948081393389578298170954607794078264949783994947886684220490122432348160 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126829565381973681577952415367548555525232411716995126936544599453354939152107204935417856 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127071925387245573178304259840525121569090075924877292977688565590712984260843286680305664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7598248801070027041533628037978, exp=-100, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7598248801070027041533628037978 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7598248801070027041533628037978, exp=-100, bc=103, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7598248801070027041533628037978, -100, 103, 80, 'd') / result: (0, 226445460351408333824087, -75, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7598248801070027041533628037978, -100, 103, 80, 'd') / result: (0, 226445460351408333824087, -75, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 226445460351408333824087, -75, 78), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 5, 2, 3)), prec=80, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 5, 2, 3), x=(0, 1, 0, 1), prec=80, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 2, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5, 2, 3), x=(0, 1, 0, 1), prec=80, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5, 2, 3), t=(0, 1, 0, 1), prec=84, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=2, bc=3, prec=84, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 2, 3, 84, 'd') / result: (0, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 2, 3, 84, 'd') / result: (0, 5, 2, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 5, 2, 3), prec=84, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 5, 2, 3), prec=119, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=68056473384187692692674921486353642291 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=68056473384187692692674921486353642291, exp=-130, bc=126, prec=119, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 68056473384187692692674921486353642291, -130, 126, 119, 'd') / result: (0, 265845599156983174580761412056068915, -122, 118)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 68056473384187692692674921486353642291, -130, 126, 119, 'd') / result: (0, 265845599156983174580761412056068915, -122, 118)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 265845599156983174580761412056068915, -122, 118), prec=119 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=33230699894622896822595176507008614, prec=119 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=6, prec=119 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=118 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=16725558898897967356151788704486271129485312, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=3984767164827557007503315120896868352, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=3984767164827557007503315120896868352, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=113618994635823977944860443568132522470507054884485834564549011687788495368741012563704395544326064583179739566800889708544, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=113618994635823977944860443568132522470507054884485834564549011687788495368741012563704395544326064583179739566800889708544 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=226962651076638736862078094983733621221002484551169252392790683659566414522531436421955623615145629575401158891465639631742292128228447512059916400045764363292872475750142599412203270947651021382460249488967137923288411410172039404926351241647357358957521327 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=226962651076638736862078094983733621221002484551169252392790683659566414522531436421955623615145629575401158891465639631742292128228447512059916400045764363292872475750142599412203270947651021382460249488967137923288411410172039404926351241647357358957521327 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=16725558898897967356151788704486271129485312, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=18817530901221275227161158210837578826759537201993249456128, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=18817530901221275227161158210837578826759537201993249456128, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=16725558898897967356151788704486271129485312, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=18817530901221275227161158210835981217646934302329405211186, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=119, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1010770177516890243686344838049531628, exp=-119, prec=84, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1010770177516890243686344838049531628 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=1010770177516890243686344838049531628, exp=-119, bc=120, prec=84, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1010770177516890243686344838049531628, -119, 120, 84, 'd') / result: (0, 1838580242323387653753061, -80, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1010770177516890243686344838049531628, -119, 120, 84, 'd') / result: (0, 1838580242323387653753061, -80, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 1838580242323387653753061, -80, 81), prec=80, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1838580242323387653753061, exp=-80, bc=81, prec=80, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 1838580242323387653753061, -80, 81, 80, 'd') / result: (0, 459645060580846913438265, -78, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1838580242323387653753061, -80, 81, 80, 'd') / result: (0, 459645060580846913438265, -78, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 459645060580846913438265, -78, 79), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 226445460351408333824087, -76, 78), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 459645060580846913438265, -78, 79), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-35057787169857334157930637, exp=-80, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=35057787169857334157930637 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-49198295998180234777622917, exp=-80, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=49198295998180234777622917 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 35057787169857334157930637, -80, 85), (1, 49198295998180234777622917, -80, 86)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 35057787169857334157930637, -80, 85), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=76, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=266954710481871049815, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2643814034172169067008, exp=-113, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2643814034172169067008 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2643814034172169067008, exp=-113, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2643814034172169067008, -113, 72, 57, 'n') / result: (0, 80682801335820589, -98, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2643814034172169067008, -113, 72, 57, 'n') / result: (0, 80682801335820589, -98, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 49198295998180234777622917, -80, 86), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=49198295998180234777622917, exp=-80, mag=6, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=92, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=220657929948928322274943712, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=3770084822006886540897641991124397336521370457530666328732762660549345528144588144159282215789001233896418631080211340328960, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3770084822006886540897641991124397336521370457530666328732762660549345528144588144159282215789001233896418631080211340328960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126284786941024818271813865467493432578101688261742183076805788878457714137448474498297292959927303159887273519609701203985859924557793492533712815191835902397338954863391641982668876843839940262969375085399345945618061903186159896158649220183296398028996659002632167 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=126284786941024818271813865467493432578101688261742183076805788878457714137448474498297292959927303159887273519609701203985859924557793492533712815191835902397338954863391641982668876843839940262969375085399345945618061903186159896158649220183296398028996659002632167 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-153122468764329237451048816, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=153122468764329237451048816 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=153122468764329237451048816, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 153122468764329237451048816, -87, 87, 57, 'n') / result: (1, 142606411841073295, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 153122468764329237451048816, -87, 87, 57, 'n') / result: (1, 142606411841073295, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-22332764843308819955178287, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=22332764843308819955178287 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=22332764843308819955178287, exp=-87, bc=85, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 22332764843308819955178287, -87, 85, 57, 'n') / result: (1, 83196032208609655, -59, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 22332764843308819955178287, -87, 85, 57, 'n') / result: (1, 83196032208609655, -59, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 80682801335820589, -98, 57), t=(1, 142606411841073295, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=11505884795787529506545103319070755, exp=-155, bc=114, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 11505884795787529506545103319070755, -155, 114, 53, 'n') / result: (1, 2494941058392155, -93, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 11505884795787529506545103319070755, -155, 114, 53, 'n') / result: (1, 2494941058392155, -93, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 80682801335820589, -98, 57), t=(1, 83196032208609655, -59, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=6712488938615783819801920213186795, exp=-157, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 6712488938615783819801920213186795, -157, 113, 53, 'n') / result: (1, 5822156072025721, -97, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 6712488938615783819801920213186795, -157, 113, 53, 'n') / result: (1, 5822156072025721, -97, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 2494941058392155, -93, 52), (1, 5822156072025721, -97, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-2.51924667109927e-13 - 3.67429704745298e-14j) / count: 164
gamma__ / s: Complex { re: 1.0, im: -20.0 } / result: Complex { re: -2.51924667109927e-13, im: -3.6742970474529765e-14 }
zeta__ / s: Complex { re: 0.0, im: 20.0 } / result: Complex { re: -0.05387338122970365, im: -1.7306610438309435 } / z: Complex { re: -0.0, im: 0.0 }
zeta_ / s: (0.0, 30.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=30j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=30j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=30j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=30.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8444249301319680, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8444249301319680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8444249301319680, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8444249301319680, -48, 53, 53, 'd') / result: (0, 15, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8444249301319680, -48, 53, 53, 'd') / result: (0, 15, 1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 15, 1, 4)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='30.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 15, 1, 4)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 15, 1, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 15, 1, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 1, 4), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=553402322211286548480, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 30j / result: (0.0 + 30.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 30j / result: (0.0 + 30.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 15, 1, 4)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 15, 1, 4)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 15, 1, 4), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 15, 1, 4), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15, exp=1, bc=4, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 15, 1, 4, 10, 'd') / result: (0, 15, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 15, 1, 4, 10, 'd') / result: (0, 15, 1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 15, 1, 4), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 15, 1, 4), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 0, 0, 0), (0, 15, 1, 4)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 15, 1, 4), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 15, 1, 4), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 15, 1, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=15, exp=1, bc=4, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 15, 1, 4, 73, 'd') / result: (1, 15, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 15, 1, 4, 73, 'd') / result: (1, 15, 1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 0, 1), (1, 15, 1, 4)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 0, 1), y=(1, 15, 1, 4), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 15, 1, 4), t=(1, 15, 1, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 225, 2, 8), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=901 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=901, exp=0, bc=10, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 901, 0, 10, 14, 'd') / result: (0, 901, 0, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 901, 0, 10, 14, 'd') / result: (0, 901, 0, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 901, 0, 10), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=14761984 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=14761984 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=14761984 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3842, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3842 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3842, exp=-7, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3842, -7, 12, 10, 'd') / result: (0, 15, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3842, -7, 12, 10, 'd') / result: (0, 15, 1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 15, 1, 4), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=60 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 60 / result: [1, 7201, 8644801, 4150086081, 1066429774401, 170275781016129, 18501288832203329, 1454363497940580929, 86433475240338061889, 4014356862444488292929, 149512908436880326851137, 4558559925844026949827137, 115711274226999556669635137, 2479673001148805776433674817, 45393708371882758898181929537, 717023025162587937870278752833, 9857139735519966885575225440833, 118821668360956955124881256544833, 1264159935912772409284697983482433, 11938777758102665518324696838240833, 100592847312136162390582533480708673, 759577801023883409756959019557124673, 5160705641986694307072779991048452673, 31661023231242962434678766748859038273, 175956192232317429491200017339703556673, 888362055186193655415967791685358778945, 4085055029979228002514284727851760417345, 17148828975883955369272466029529689684545, 65858043259900153122470827740071683095105, 231817084305017652061377768546951602567745, 749196738817423504685608559152806628358721, 2226642605748672369926669515933143560813121, 6094677965700622524064724937503886779808321, 15385175949137660843001443600409466763147841, 35866686428865846285363252698351443355040321, 77321602878104508994375477489548288730266177, 154360277813113760898838727786177794024602177, 285790938346443132530000022627669375067290177, 491560625118273187343418162130383562650614337, 787024790739362496819095490647101370462566977, 1175803271958504695806394962790301574539180609, 1644070036450094215815186859379521934763948609, 2159620191963209699978624409324854046795692609, 2677568255176386186393984924618769098883398209, 3151406843831700725429144936259127121979308609, 3545148372681859723159235452798231117201078849, 3841442165294855624461143032133677267451574849, 4042631819029783978399386385020340313423542849, 4165375156023330180297674325312159741909072449, 4232311981078510435993100864600271662513846849, 4264739154105242204307774165855401437384604225, 4278588849437956219118933409256932306092751425, 4283755333992616899027950617680430938594409025, 4285419007006444740608715907436928611450288705, 4285874515955540560162328003040040296887810625, 4285978458614817137501667677232710319519758913, 4285997688675654985625902012065652810836802113, 4286000459285258699809924595938494082680027713, 4286000750884650275125844214211167931680619073, 4286000770823070211899582307768273835885787713, 4286000771487684209792040244220177366025960001]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 60 / result: [1, 7201, 8644801, 4150086081, 1066429774401, 170275781016129, 18501288832203329, 1454363497940580929, 86433475240338061889, 4014356862444488292929, 149512908436880326851137, 4558559925844026949827137, 115711274226999556669635137, 2479673001148805776433674817, 45393708371882758898181929537, 717023025162587937870278752833, 9857139735519966885575225440833, 118821668360956955124881256544833, 1264159935912772409284697983482433, 11938777758102665518324696838240833, 100592847312136162390582533480708673, 759577801023883409756959019557124673, 5160705641986694307072779991048452673, 31661023231242962434678766748859038273, 175956192232317429491200017339703556673, 888362055186193655415967791685358778945, 4085055029979228002514284727851760417345, 17148828975883955369272466029529689684545, 65858043259900153122470827740071683095105, 231817084305017652061377768546951602567745, 749196738817423504685608559152806628358721, 2226642605748672369926669515933143560813121, 6094677965700622524064724937503886779808321, 15385175949137660843001443600409466763147841, 35866686428865846285363252698351443355040321, 77321602878104508994375477489548288730266177, 154360277813113760898838727786177794024602177, 285790938346443132530000022627669375067290177, 491560625118273187343418162130383562650614337, 787024790739362496819095490647101370462566977, 1175803271958504695806394962790301574539180609, 1644070036450094215815186859379521934763948609, 2159620191963209699978624409324854046795692609, 2677568255176386186393984924618769098883398209, 3151406843831700725429144936259127121979308609, 3545148372681859723159235452798231117201078849, 3841442165294855624461143032133677267451574849, 4042631819029783978399386385020340313423542849, 4165375156023330180297674325312159741909072449, 4232311981078510435993100864600271662513846849, 4264739154105242204307774165855401437384604225, 4278588849437956219118933409256932306092751425, 4283755333992616899027950617680430938594409025, 4285419007006444740608715907436928611450288705, 4285874515955540560162328003040040296887810625, 4285978458614817137501667677232710319519758913, 4285997688675654985625902012065652810836802113, 4286000459285258699809924595938494082680027713, 4286000750884650275125844214211167931680619073, 4286000770823070211899582307768273835885787713, 4286000771487684209792040244220177366025960001]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 1, 4), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-196397700790312790934330, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11302825111674475202512, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-311282990980499552849520, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=267797872481346355743, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-392795401580625581868690, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7769898373207002823791, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-456021339236309197207620, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3886968118091177809673, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1084544948796501607655486052241264987218476432988273875388876929747072001247073301744451048377657889203079332228553947217920, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1084544948796501607655486052241264987218476432988273875388876929747072001247073301744451048377657889203079332228553947217920 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=80109368445631761928395964105155809451065999499428805461558986193258771765376983163107282178428147749157322554820924784010311629140429077843876137698009854280041603577984423329098874784655665850358798340655982527316182680190696802722740232974447731394493545355100 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=80109368445631761928395964105155809451065999499428805461558986193258771765376983163107282178428147749157322554820924784010311629140429077843876137698009854280041603577984423329098874784655665850358798340655982527316182680190696802722740232974447731394493545355100 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-507680691770812343783850, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11570622984155821558255, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3232976847364809554249210803347770866660791652622187838063985514388890822765085175676315982306732564957750771309879861706752, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3232976847364809554249210803347770866660791652622187838063985514388890822765085175676315982306732564957750771309879861706752 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=113967245797131349282990588132685894894903833082209209885757961604440797668965067637803409996803057508668777161748759976513169057879952773139372539947012544434351587495835773915052170787682993608236822523624077701403801074325122554829232924220473777017913263111046912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=113967245797131349282990588132685894894903833082209209885757961604440797668965067637803409996803057508668777161748759976513169057879952773139372539947012544434351587495835773915052170787682993608236822523624077701403801074325122554829232924220473777017913263111046912 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-551358051994481217806790, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12400518310912790278924, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3470543836148805144497555367172047959099124585562476401244406175190630403990634565582243354808505245449853863131372631097344, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3470543836148805144497555367172047959099124585562476401244406175190630403990634565582243354808505245449853863131372631097344 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=120562795396402743936932116080121647578261382883293037853342269970590170383335966586641152400468391100187060551909042766153497663946666577282030487810543173794895440760777960850990238939740219340478290192406392124909183327509445467857467944169817309975118656283309852 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=120562795396402743936932116080121647578261382883293037853342269970590170383335966586641152400468391100187060551909042766153497663946666577282030487810543173794895440760777960850990238939740219340478290192406392124909183327509445467857467944169817309975118656283309852 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-589193102370938372803050, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4236971634739530445070, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1177505944407630316883099142433373414694345841530125921850780666582535315639679584751118281095742851134771846419572856979456, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1177505944407630316883099142433373414694345841530125921850780666582535315639679584751118281095742851134771846419572856979456 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=93477364213445395674486584006672159009349578834116038418346307598933757089764905705753957410338063415411683564056931495176489629478493565113272041128563300977300636534135255003477278175347280633168128240323507519288257651602240552345475774780715975148167786059120 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=93477364213445395674486584006672159009349578834116038418346307598933757089764905705753957410338063415411683564056931495176489629478493565113272041128563300977300636534135255003477278175347280633168128240323507519288257651602240552345475774780715975148167786059120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-622565981960999105699040, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=535595744962692711486, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-652419040026621988141980, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=354041379623705430952, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-679424415941675372905650, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3020169164854215829688, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=836648960500158383048517811728975847282824676876668418157133631519169829533456547060005094462764657385232627719170187853824, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=836648960500158383048517811728975847282824676876668418157133631519169829533456547060005094462764657385232627719170187853824 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=48778091743787732406228703341497673701287949857783959858323768055271712268778369367511097380879413519225407070589529588450909421111186730224287589114795077027700087754629897032676127505705061795004962816435061957404001236521799133794925286782060369059109099605692 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=48778091743787732406228703341497673701287949857783959858323768055271712268778369367511097380879413519225407070589529588450909421111186730224287589114795077027700087754629897032676127505705061795004962816435061957404001236521799133794925286782060369059109099605692 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-704078392561125134718210, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8037696245688349179534, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2241392894179436655821337841298614306918184628175766009137012321477282135910618156938532166647159637686363953272344824250368, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2241392894179436655821337841298614306918184628175766009137012321477282135910618156938532166647159637686363953272344824250368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4531142383613209974926789520925099185639640139180924290395083198013952789300885344899226529202703015689596416577392026132613140196888191087229556811111409546870851899498407278357174573806529967892407232811366846936570388498759941356368941572757281154212112648443951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4531142383613209974926789520925099185639640139180924290395083198013952789300885344899226529202703015689596416577392026132613140196888191087229556811111409546870851899498407278357174573806529967892407232811366846936570388498759941356368941572757281154212112648443951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-726757852556063617118370, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=193988100891814360577, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=51644997561738171793118383440060237486594115856584470256613187130812952440336823892592907065602756628718063439454949867520, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=51644997561738171793118383440060237486594115856584470256613187130812952440336823892592907065602756628718063439454949867520 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2932250877823344031590164297300035005339451631471122489624666816482794516476673849503938045930594544997561542187873752242809079789063635013772122060431700669865372276397804789821409549608548428853293402360607355750420111902516795568074847901955747764935680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2932250877823344031590164297300035005339451631471122489624666816482794516476673849503938045930594544997561542187873752242809079789063635013772122060431700669865372276397804789821409549608548428853293402360607355750420111902516795568074847901955747764935680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=435, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-747755752784794008741120, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8867591572445317900233, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2478959882963432246069682405122891399356517561116054572317432982279021717136167546844459539148932318178467045093837593640960, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2478959882963432246069682405122891399356517561116054572317432982279021717136167546844459539148932318178467045093837593640960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5237857394008698967001428739644590290398211325006871772991834406191952557032950618508930144363090238390959916106805761541842354950781365556908198368374942587359851150692102940438697008851094517136911888314324450239566571781503963291064909878789205588155277119447951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5237857394008698967001428739644590290398211325006871772991834406191952557032950618508930144363090238390959916106805761541842354950781365556908198368374942587359851150692102940438697008851094517136911888314324450239566571781503963291064909878789205588155277119447951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-767304330216808750057170, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4154765990572524165386, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1156847945382935048165851789057349319699708195187492133748135391730210134663544855194081118269501748483284621043790877032448, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1156847945382935048165851789057349319699708195187492133748135391730210134663544855194081118269501748483284621043790877032448 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=90436647650164069431450621593622515585575853981153668073268004498916800324852816836241993952071821853922561469827499448279169976834534470094767886596850604933186241636380364795281526721887920971640504784815162364783232489105768077986424481885164644822550302508911 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=90436647650164069431450621593622515585575853981153668073268004498916800324852816836241993952071821853922561469827499448279169976834534470094767886596850604933186241636380364795281526721887920971640504784815162364783232489105768077986424481885164644822550302508911 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-785590803161251163737410, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=704044896272058066349, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=196250990734605052813849857072228902449057640255020986975130111097089219273279930791853046849290475189128641069928809496576, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=196250990734605052813849857072228902449057640255020986975130111097089219273279930791853046849290475189128641069928809496576 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=10820963578124274489569824335364898086715439858362007077141486226269770864244212009433709964644459561450451344507044621514904573938673392037636816031185251844342251177318587508076317217357906850281343234697802865942499444684233793992260826534058595778416865775 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=10820963578124274489569824335364898086715439858362007077141486226269770864244212009433709964644459561450451344507044621514904573938673392037636816031185251844342251177318587508076317217357906850281343234697802865942499444684233793992260826534058595778416865775 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=441, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-802768304087405949909450, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13198047670401167056715, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3687452825908105466028652577620300956542819872160131176322181561140044804240049225931133564484036823290469729577083420540928, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3687452825908105466028652577620300956542819872160131176322181561140044804240049225931133564484036823290469729577083420540928 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125012215589616169129047439350188706347077343470506649052860341803702889049095535073737559466407674790245104480041262693881616032712800807155278755897213326315129381975055121597429116767706037159121709452245026426331708270265236383847658483568791995019977574710346791 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125012215589616169129047439350188706347077343470506649052860341803702889049095535073737559466407674790245104480041262693881616032712800807155278755897213326315129381975055121597429116767706037159121709452245026426331708270265236383847658483568791995019977574710346791 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-818963682751311896633400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11838420856637167913968, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3305279843951242994759576540163855199142023414821406096423243976372028956181556729125946052198576424237956060125116791521280, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3305279843951242994759576540163855199142023414821406096423243976372028956181556729125946052198576424237956060125116791521280 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=116154092026777862266256328228916690039394090955332273473518075249838405881034798064783069880954952192587125336790609142671777011428204196658053558940635374698578435559507558560165307959245945035857600810632068584417423036878226136989947854143099063001454457803232112 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=116154092026777862266256328228916690039394090955332273473518075249838405881034798064783069880954952192587125336790609142671777011428204196658053558940635374698578435559507558560165307959245945035857600810632068584417423036878226136989947854143099063001454457803232112 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-834283196764230719570820, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11354658693860292557751, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3171002850290723748097468743219698581676878713594286473756049689831915279836680987005204493828009257003289095182533921865728, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3171002850290723748097468743219698581676878713594286473756049689831915279836680987005204493828009257003289095182533921865728 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=111974799202032889090682339960849568089268768228632346416682560311318413075704328808069269907903098061552141802137994120663167680331527548662574095264163015293196297233503491594414687018751661251437130229767200089600888194404125465782029785365497183752543465298887135 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=111974799202032889090682339960849568089268768228632346416682560311318413075704328808069269907903098061552141802137994120663167680331527548662574095264163015293196297233503491594414687018751661251437130229767200089600888194404125465782029785365497183752543465298887135 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-848816740816934779076340, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11656866491298180633434, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3253634846389504822966458156723794961655429298964821626166630789241216003741219905233353145132973667609237996685661841653760, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3253634846389504822966458156723794961655429298964821626166630789241216003741219905233353145132973667609237996685661841653760 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=114607449189666963595179401621590121371463138915743507602811995318982411675892247518077532364569566875548223300018421533837994315356967307878713876427642136366439921389414239069559796601954724520278676015201065048935606073227869913028834856813451548796999718666106087 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=114607449189666963595179401621590121371463138915743507602811995318982411675892247518077532364569566875548223300018421533837994315356967307878713876427642136366439921389414239069559796601954724520278676015201065048935606073227869913028834856813451548796999718666106087 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-862641042974980770656310, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12668316183394136634667, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3542846832735238585007921103988132291580356347761694659603664637173768537407106119031873424700349104730059151946609560911872, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3542846832735238585007921103988132291580356347761694659603664637173768537407106119031873424700349104730059151946609560911872 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=122220029356724178543890402551442291095079152696641938119413270184338845438885638934242198054362234034851866731766082055047600729917892130811909672138482263309740633808500735210035213864910973348985709688190644268041699665060751476030149728386282786661134419597340400 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=122220029356724178543890402551442291095079152696641938119413270184338845438885638934242198054362234034851866731766082055047600729917892130811909672138482263309740633808500735210035213864910973348985709688190644268041699665060751476030149728386282786661134419597340400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-875822116731988163839980, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14322994276528691032200, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4007651810790882131145986554948674428959703390470954891913183321351085109370137534065209588290773914388521722901704109719552, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4007651810790882131145986554948674428959703390470954891913183321351085109370137534065209588290773914388521722901704109719552 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128585961762639639178533948869796845548392477695087378572914211698137004665938730903710768937797264405471586841690456270613003495559621546049791723529223989055702877072079097806868998595912198566336317567464246534200588680865529282807922013158294840992682831458862727 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128585961762639639178533948869796845548392477695087378572914211698137004665938730903710768937797264405471586841690456270613003495559621546049791723529223989055702877072079097806868998595912198566336317567464246534200588680865529282807922013158294840992682831458862727 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-888417167552127271444830, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1727943456389583427350, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=475133977567991180496689127648554184876665865880577126360841321603479162451098779811854745003545360984206183642985538781184, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=475133977567991180496689127648554184876665865880577126360841321603479162451098779811854745003545360984206183642985538781184 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 1282251896705988486230930442438776, -108, 110, 88, 'd') / result: (0, 305712675262925263936741457, -86, 88)

[2]libmpf._normalize. / x: (0, 1288433389387681976710025743103290, -108, 110, 88, 'd') / result: (0, 307186457964821333100801883, -86, 88)

[2]libmpf._normalize. / x: (0, 1294499333357576653431345650430265, -108, 110, 88, 'd') / result: (0, 154316345853516656569402891, -85, 87)

[2]libmpf._normalize. / x: (0, 1300453969299057703421135530143822, -108, 111, 88, 'd') / result: (0, 155026193773634159972803059, -85, 88)

[2]libmpf._normalize. / x: (0, 1306301308643873273329876163195678, -108, 111, 88, 'd') / result: (0, 77861625471345977385632763, -84, 87)

[2]libmpf._normalize. / x: (0, 1312045149804536671036437392274803, -108, 111, 88, 'd') / result: (0, 156407970166747173194460557, -85, 88)

[2]libmpf._normalize. / x: (0, 1317689092994991943168438291805351, -108, 111, 88, 'd') / result: (0, 78540390312373157928492921, -84, 87)

[2]libmpf._normalize. / x: (0, 1323236553784362377064475134718151, -108, 111, 88, 'd') / result: (0, 9858880592766123839203083, -81, 84)

[2]libmpf._normalize. / x: (0, 1328690775511560467287804422500678, -108, 111, 88, 'd') / result: (0, 158392283381409700785613587, -85, 88)

[2]libmpf._normalize. / x: (1, 10090134886176012290223, -73, 74, 73, 'd') / result: (1, 5045067443088006145111, -72, 73)

[2]libmpf._normalize. / x: (1, 32091083200153707632880, -73, 75, 73, 'd') / result: (1, 2005692700009606727055, -69, 71)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -83, 83, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (1, 100555622804640148958388915, -82, 87, 83, 'd') / result: (1, 6284726425290009309899307, -78, 83)

[2]libmpf._normalize. / x: (0, 4951760157141521099596496574, -91, 92, 77, 'd') / result: (0, 151115727451828646838271, -76, 77)

[2]libmpf._normalize. / x: (1, 59289643534327240265891443587834, -107, 106, 77, 'd') / result: (1, 110435566928847209114379, -78, 77)

[2]libmpf._normalize. / x: (1, 151039104495199205176269441089207, -107, 107, 77, 'd') / result: (1, 140666127666085218243551, -77, 77)

[3]libmpf._normalize1 / x: (1, 16688551033007856045518754698573401532353598709, -154, 154, 73, 'd') / result: (1, 431388933315809410603, -69, 69)

[3]libmpf._normalize1 / x: (1, 21256864210092267118174632210952068544185740321, -153, 154, 73, 'd') / result: (1, 8791632979130326140221, -72, 73)

[2]libmpf._normalize1 / x: (0, 1021684743674515062315, -69, 70, 73, 'd') / result: (0, 1021684743674515062315, -69, 70)

[2]libmpf._normalize1 / x: (0, 8791632979130326140221, -72, 73, 73, 'd') / result: (0, 8791632979130326140221, -72, 73)

[3]libmpf._normalize1 / x: (0, 144098552228996584546559554519850637076119241, -144, 147, 63, 'd') / result: (0, 3724860271899557695, -59, 62)

[2]libmpf._normalize. / x: (1, 22787782524817416971966714563673883901971120, -141, 145, 63, 'd') / result: (1, 1178100744225228159, -57, 61)

[3]libmpf._normalize1 / x: (1, 86793499139757084719889858843861331512059269, -144, 146, 63, 'd') / result: (1, 2243559368251404559, -59, 61)

[3]libmpf._normalize1 / x: (1, 364646613151458957, -58, 59, 53, 'n') / result: (1, 2848801665245773, -51, 52)

[3]libmpf._normalize1 / x: (1, 694428153998939151, -60, 60, 53, 'n') / result: (1, 678152494139589, -50, 50)

[7]gammazeta.mpc_zeta / s: ((0, 0, 0, 0), (0, 15, 1, 4)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 2848801665245773, -51, 52), (1, 678152494139589, -50, 50))

zeta_ / result: (-1.26512208053854 - 0.602320410560599j) / count: 922
zeta / count: 0 / s: Complex { re: 0.0, im: 30.0 }
gamma_ / s: (1.0, -30.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-30j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-30j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-30.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-8444249301319680, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8444249301319680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=8444249301319680, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 8444249301319680, -48, 53, 53, 'd') / result: (1, 15, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 8444249301319680, -48, 53, 53, 'd') / result: (1, 15, 1, 4)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 15, 1, 4)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-30.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 15, 1, 4)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 15, 1, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 15, 1, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 15, 1, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 1, 4), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=553402322211286548480, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-30j) / result: (1.0 - 30.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-30j) / result: (1.0 - 30.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 15, 1, 4)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 15, 1, 4)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 15, 1, 4)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 15, 1, 4), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=150 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 15, 1, 4), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=2417851639229258349412352, y=-72535549176877750482370560, prec=81 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=81, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 15, 1, 4)), prec=81, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 15, 1, 4), prec=81, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 15, 1, 4), t=(1, 15, 1, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 225, 2, 8), prec=101, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=901 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=901, exp=0, bc=10, prec=101, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 901, 0, 10, 101, 'd') / result: (0, 901, 0, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 901, 0, 10, 101, 'd') / result: (0, 901, 0, 10)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 901, 0, 10), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=900 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=900, exp=0, bc=10, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 900, 0, 10, 10, 'd') / result: (0, 225, 2, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 900, 0, 10, 10, 'd') / result: (0, 225, 2, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 901, 0, 10), prec=81, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=901, n=91 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=2230767950792255255368221851648, prec=101 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=313604229354336887927846038209117583677849600, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=111897728192201994484961005833034689022602633929403236424104394800960886827820009494937600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119357576738348794117291739555237001624109476191363452185711354454358279283008010127933440 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123271975187012974918684567613646898239087823740746628648487618350403079221681300812333056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125277055044448761582732562882727711015886980792904012080482548361826530661012345970491392 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126291792126106179870363957651221308174809224603678234578854038067245240826971643063566336 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126802238760952744186572070151248398713368498411223916284013542732796545013617587315015680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127058235229907468136431974442264862697839708320738085003879408797798004315937818699366400 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127186427207488259263700476044756808518666546113852920544137519184154575040149838710702080 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=17248935046926248110415864045777, exp=-101, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=17248935046926248110415864045777 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=17248935046926248110415864045777, exp=-101, bc=104, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 17248935046926248110415864045777, -101, 104, 81, 'd') / result: (0, 514058323112912419748779, -76, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 17248935046926248110415864045777, -101, 104, 81, 'd') / result: (0, 514058323112912419748779, -76, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 514058323112912419748779, -76, 79), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 15, 1, 4)), prec=81, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 15, 1, 4), x=(0, 1, 0, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 15, 1, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 15, 1, 4), x=(0, 1, 0, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 15, 1, 4), t=(0, 1, 0, 1), prec=85, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15, exp=1, bc=4, prec=85, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 15, 1, 4, 85, 'd') / result: (0, 15, 1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 15, 1, 4, 85, 'd') / result: (0, 15, 1, 4)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 15, 1, 4), prec=85, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 15, 1, 4), prec=120, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=90741964512250256923566561981804856389 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=90741964512250256923566561981804856389, exp=-131, bc=127, prec=120, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 90741964512250256923566561981804856389, -131, 127, 120, 'd') / result: (0, 88615199718994391526920470685356305, -121, 117)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 90741964512250256923566561981804856389, -131, 127, 120, 'd') / result: (0, 88615199718994391526920470685356305, -121, 117)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 88615199718994391526920470685356305, -121, 117), prec=120 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=44307599859497195763460235342678152, prec=120 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=4, prec=120 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=119 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=11150372599265311570767859136324180752990208, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=2657591115466876494748452675385294848, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=2657591115466876494748452675385294848, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=11150372599265311570767859136324180752990208, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=12550119208852981826595344689587405458603505207066625048576, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=12550119208852981826595344689587405458603505207066625048576, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=11150372599265311570767859136324180752990208, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=12550119208852981826595344689587202373952393784069633544244, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=120, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2043655252683088214857403645389482648, exp=-120, prec=85, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2043655252683088214857403645389482648 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2043655252683088214857403645389482648, exp=-120, bc=121, prec=85, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2043655252683088214857403645389482648, -120, 121, 85, 'd') / result: (0, 29739097993050937873448181, -84, 85)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2043655252683088214857403645389482648, -120, 121, 85, 'd') / result: (0, 29739097993050937873448181, -84, 85)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 29739097993050937873448181, -84, 85), prec=81, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=29739097993050937873448181, exp=-84, bc=85, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 29739097993050937873448181, -84, 85, 81, 'd') / result: (0, 1858693624565683617090511, -80, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 29739097993050937873448181, -84, 85, 81, 'd') / result: (0, 1858693624565683617090511, -80, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1858693624565683617090511, -80, 81), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 514058323112912419748779, -77, 79), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 1858693624565683617090511, -80, 81), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-107604921837933257272903163, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=107604921837933257272903163 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-176064430494380915832250556, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=176064430494380915832250556 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 107604921837933257272903163, -81, 87), (1, 44016107623595228958062639, -79, 86)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 107604921837933257272903163, -81, 87), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1299156445729398533871, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4093404514626623174641, exp=-136, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4093404514626623174641 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4093404514626623174641, exp=-136, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4093404514626623174641, -136, 72, 57, 'n') / result: (0, 62460396036172839, -120, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4093404514626623174641, -136, 72, 57, 'n') / result: (0, 62460396036172839, -120, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 44016107623595228958062639, -79, 86), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=44016107623595228958062639, exp=-79, mag=7, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=93, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=86951469254997831424182603, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=1477046930265711713283185766385722792116591713498315849339137151941250439793633163328157142076238839581336614368411566211072, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1477046930265711713283185766385722792116591713498315849339137151941250439793633163328157142076238839581336614368411566211072 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=2264323385480277198733401447535470687480321155817130945312002428059009230979378920959604429337339637837466190596936405775702316769367085607326638993184728453399142299750038318267758095118202049847709762804389530313447213705107527416308400862771984784373337665485020 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2264323385480277198733401447535470687480321155817130945312002428059009230979378920959604429337339637837466190596936405775702316769367085607326638993184728453399142299750038318267758095118202049847709762804389530313447213705107527416308400862771984784373337665485020 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-130949084985653502350462846, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=130949084985653502350462846 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=130949084985653502350462846, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 130949084985653502350462846, -87, 87, 57, 'n') / result: (1, 121955838972379921, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 130949084985653502350462846, -87, 87, 57, 'n') / result: (1, 121955838972379921, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=82447437603903797077807500, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=82447437603903797077807500 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=82447437603903797077807500, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 82447437603903797077807500, -87, 87, 57, 'n') / result: (0, 76785159859716703, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 82447437603903797077807500, -87, 87, 57, 'n') / result: (0, 76785159859716703, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 62460396036172839, -120, 56), t=(1, 121955838972379921, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=7617410001138571856366540329165719, exp=-177, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 7617410001138571856366540329165719, -177, 113, 53, 'n') / result: (1, 6607049977557799, -117, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 7617410001138571856366540329165719, -177, 113, 53, 'n') / result: (1, 6607049977557799, -117, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 62460396036172839, -120, 56), t=(0, 76785159859716703, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4796031494538746942389182883229817, exp=-177, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4796031494538746942389182883229817, -177, 112, 53, 'n') / result: (0, 519986776568781, -114, 49)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4796031494538746942389182883229817, -177, 112, 53, 'n') / result: (0, 519986776568781, -114, 49)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 6607049977557799, -117, 53), (0, 519986776568781, -114, 49)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-3.97647356120049e-20 + 2.50364525919803e-20j) / count: 159
gamma__ / s: Complex { re: 1.0, im: -30.0 } / result: Complex { re: -3.9764735612004937e-20, im: 2.503645259198026e-20 }
zeta__ / s: Complex { re: 0.0, im: 30.0 } / result: Complex { re: -1.265122080538538, im: -0.6023204105605986 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.0, 40.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=40j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=40j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=40j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=40.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -47, 53, 53, 'd') / result: (0, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -47, 53, 53, 'd') / result: (0, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 5, 3, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='40.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 5, 3, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 3, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 3, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 3, 3), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 40j / result: (0.0 + 40.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 40j / result: (0.0 + 40.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 5, 3, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 5, 3, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 5, 3, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 5, 3, 3), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=3, bc=3, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 3, 3, 10, 'd') / result: (0, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 3, 3, 10, 'd') / result: (0, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 5, 3, 3), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, 3, 3), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 5, 3, 3), t=(0, 53, 0, 6), prec=5, rnd='f' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 711 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 5, 3, 3), t=(0, 53, 0, 6), prec=5, rnd='f', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=13 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=13, exp=0, bc=4, prec=5, rnd='f' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 13, 0, 4, 5, 'f') / result: (1, 13, 0, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 13, 0, 4, 5, 'f') / result: (1, 13, 0, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 0, 0, 0), (0, 5, 3, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5, 3, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5, 3, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5, 3, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5, exp=3, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5, 3, 3, 73, 'd') / result: (1, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5, 3, 3, 73, 'd') / result: (1, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 0, 1), (1, 5, 3, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 0, 1), y=(1, 5, 3, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 3, 3), t=(1, 5, 3, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 25, 6, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1601 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1601, exp=0, bc=11, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1601, 0, 11, 14, 'd') / result: (0, 1601, 0, 11)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1601, 0, 11, 14, 'd') / result: (0, 1601, 0, 11)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 1601, 0, 11), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26230784 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26230784 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26230784 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5121, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5121 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5121, exp=-7, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5121, -7, 13, 10, 'd') / result: (0, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5121, -7, 13, 10, 'd') / result: (0, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 3, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=69 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 69 / result: [1, 9523, 15117763, 9597770787, 3262223997219, 689204954860323, 99132379905395491, 10322077470922509091, 813164031952133163811, 50106610570491302382371, 2478457450574315638623011, 100474503037222153138342691, 3395414006820163935737613091, 97012249015840731383496575779, 2371554610716488592336455076643, 50110800041353074731418089818915, 923276998724286763146233796234019, 14946855341207767213444789081082659, 214037148508147845225302373950425891, 2727162698384998844197171802301139747, 31080374030328958832597749968309193507, 318300709962053951885826371064618421027, 2941539296061529575543220965432601217827, 24621909214414103956959021313474847443747, 187301564346449733003327225343465602812707, 1298835207983297255548716505123892233374499, 8232927440384505933147102721069359117241123, 47821700004128653309791977203441451668736803, 255122909065188915936586956311135318120205091, 1252626730524156447051848458926136536362781475, 5670948741958227319336396583503317073663232803, 23713403830426707105577158412157462028202674979, 91730595632192801537833998639226659277458508579, 328728493779698531042117273164688281767406340899, 1092781419150761778399209620888564557257387412259, 3373866964461472342972557789455499524662258436899, 9685227283881403920696625961640696742771510348579, 25878387970138392381869448039850032811448709810979, 64423792214197132634710298909524466457029804952355, 149575377880226331048744999099141580278137026120483, 324190021904235573366132612146204522544204998642467, 656594050666592221945031886365876886593010094181155, 1243974663740636098951922170127546927482464881478435, 2207246727972050325704124731240392406303639161932579, 3672789178882122545297862379077699634269814451735331, 5740283522862623928744708249310105586331959367437091, 8442942158854335245089940117898668742013769443576611, 11713833072694681358900573058835181918302210373061411, 15374935534151068763481597297988682631411026711677731, 19160051775597878716376853580589209141871098979289891, 22769293929058271237117380783392135430633026474871587, 25937803542327130677767480571991404053770560183864099, 28493434895822551287104379579972890321872529120168739, 30382719242323927816630345890635214581885377314949923, 31659245045152133765275097098116300409349925489478435, 32444963179003022831246595339251447482468221196569379, 32883832767280096003230675437903511613399161141070627, 33105277599123053278335202735003217936256722827086627, 33205674776258450999462052891889201732406837750401827, 33246310690051917786776035122562740588910303069211427, 33260880429451256018642112785101152279757483911809827, 33265463945896895278145301016020294936057057670990627, 33266714105116267119184722930564199568249965279054627, 33267005253307800827942348300884646691480669095332643, 33267061992817568223940389465573080284393739327245091, 33267070992644400738749858129739522345046617491639075, 33267072108514671899503472565083777016457661372304163, 33267072209946039831296809754246479999719129843108643, 33267072215956787560588266772863529065393883530267427, 33267072216131012132451787266156776864398948854532899]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 69 / result: [1, 9523, 15117763, 9597770787, 3262223997219, 689204954860323, 99132379905395491, 10322077470922509091, 813164031952133163811, 50106610570491302382371, 2478457450574315638623011, 100474503037222153138342691, 3395414006820163935737613091, 97012249015840731383496575779, 2371554610716488592336455076643, 50110800041353074731418089818915, 923276998724286763146233796234019, 14946855341207767213444789081082659, 214037148508147845225302373950425891, 2727162698384998844197171802301139747, 31080374030328958832597749968309193507, 318300709962053951885826371064618421027, 2941539296061529575543220965432601217827, 24621909214414103956959021313474847443747, 187301564346449733003327225343465602812707, 1298835207983297255548716505123892233374499, 8232927440384505933147102721069359117241123, 47821700004128653309791977203441451668736803, 255122909065188915936586956311135318120205091, 1252626730524156447051848458926136536362781475, 5670948741958227319336396583503317073663232803, 23713403830426707105577158412157462028202674979, 91730595632192801537833998639226659277458508579, 328728493779698531042117273164688281767406340899, 1092781419150761778399209620888564557257387412259, 3373866964461472342972557789455499524662258436899, 9685227283881403920696625961640696742771510348579, 25878387970138392381869448039850032811448709810979, 64423792214197132634710298909524466457029804952355, 149575377880226331048744999099141580278137026120483, 324190021904235573366132612146204522544204998642467, 656594050666592221945031886365876886593010094181155, 1243974663740636098951922170127546927482464881478435, 2207246727972050325704124731240392406303639161932579, 3672789178882122545297862379077699634269814451735331, 5740283522862623928744708249310105586331959367437091, 8442942158854335245089940117898668742013769443576611, 11713833072694681358900573058835181918302210373061411, 15374935534151068763481597297988682631411026711677731, 19160051775597878716376853580589209141871098979289891, 22769293929058271237117380783392135430633026474871587, 25937803542327130677767480571991404053770560183864099, 28493434895822551287104379579972890321872529120168739, 30382719242323927816630345890635214581885377314949923, 31659245045152133765275097098116300409349925489478435, 32444963179003022831246595339251447482468221196569379, 32883832767280096003230675437903511613399161141070627, 33105277599123053278335202735003217936256722827086627, 33205674776258450999462052891889201732406837750401827, 33246310690051917786776035122562740588910303069211427, 33260880429451256018642112785101152279757483911809827, 33265463945896895278145301016020294936057057670990627, 33266714105116267119184722930564199568249965279054627, 33267005253307800827942348300884646691480669095332643, 33267061992817568223940389465573080284393739327245091, 33267070992644400738749858129739522345046617491639075, 33267072108514671899503472565083777016457661372304163, 33267072209946039831296809754246479999719129843108643, 33267072215956787560588266772863529065393883530267427, 33267072216131012132451787266156776864398948854532899]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 3, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-261863601053750387912440, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5179932248804668549214, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-415043987973999403799360, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=357063829975128474324, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-523727202107500775824920, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10359864497609337098388, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-608028452315078929610160, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=237373540740921219163, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-676907589027749791711800, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5536996078779797023538, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-735144069325974957075720, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6643523181122421984430, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-785590803161251163737400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=704044896272058066359, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-830087975947998807598720, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=714127659950256948648, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-869892053368829317522640, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5417305789545589768337, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1508033928802754616359056796449758934608548183012266531493105064219738211257835257663712886315600493558567452432084536131584, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1508033928802754616359056796449758934608548183012266531493105064219738211257835257663712886315600493558567452432084536131584 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2349713881285313240563063445515056032024544871336657651186040530154498810736901508472199736791780648267829076900526271745125734225240786883212134275271974118245959237017815564452295127834143055468859347083633434314906701384747282141222217782387363484545341652174076 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2349713881285313240563063445515056032024544871336657651186040530154498810736901508472199736791780648267829076900526271745125734225240786883212134275271974118245959237017815564452295127834143055468859347083633434314906701384747282141222217782387363484545341652174076 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-905899221255567163874200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13917393453233586160386, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-938771190081500179624280, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10716928327584465572712, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2995409858580813964000866239523493774222458719681899274883564853587151241539535785770388609804959884465647679488387092316160, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2995409858580813964000866239523493774222458719681899274883564853587151241539535785770388609804959884465647679488387092316160 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=105778458786457081043780612795497558406816031522581720473319957079705218851735529447128878423280085019000547087296665931408318606906844215757878678748307056745775334300653727741690961274980320121989475731194876163148278527598340665203382974278854890882937647178792927 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=105778458786457081043780612795497558406816031522581720473319957079705218851735529447128878423280085019000547087296665931408318606906844215757878678748307056745775334300653727741690961274980320121989475731194876163148278527598340665203382974278854890882937647178792927 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-969010470074751489491160, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10149152034617050868238, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-997007670379725344988160, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11823455429927090533644, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1023072440289078333409560, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=594437370716049693447, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1047454404215001551649880, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5883977145076726615533, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1642310922463273863021164593393915552073692884239386154160299350759851887602710999784454444686167660793234417374667405787136, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1642310922463273863021164593393915552073692884239386154160299350759851887602710999784454444686167660793234417374667405787136 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2729796065331479329239046209421871667470854267480199694238183669290562587427779466795750692971111908478708287119599859008038990880142059291428850949598487367956051194073877708680956762867570003368247824191218527085247228257450157369426537297097534081664704400313247 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2729796065331479329239046209421871667470854267480199694238183669290562587427779466795750692971111908478708287119599859008038990880142059291428850949598487367956051194073877708680956762867570003368247824191218527085247228257450157369426537297097534081664704400313247 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1070357738783207933212600, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12652146277154240215219, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3532517833222890950649297427300120244083037524590377765552341999747605946919038754253354843287228553404315539258718570938368, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3532517833222890950649297427300120244083037524590377765552341999747605946919038754253354843287228553404315539258718570938368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=121993739819488010621504856972494914760068900307617932251424948962893821366869510160938846041425545669265279581983505676788350788261440913757017951691121393656447049738356033862630722737837914961785551429383809209833422823326245850402221984433300740442300363173319047 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=121993739819488010621504856972494914760068900307617932251424948962893821366869510160938846041425545669265279581983505676788350788261440913757017951691121393656447049738356033862630722737837914961785551429383809209833422823326245850402221984433300740442300363173319047 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1091951577001749195511200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5894059908754925497822, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1112377595685640959427760, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=303793075005109162465, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=82631996098781074868989413504096379978550585370535152410581099409300723904538918228148651304964410605948901503127919788032, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=82631996098781074868989413504096379978550585370535152410581099409300723904538918228148651304964410605948901503127919788032 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=120081172701730746092896413144227018867976327457729029430899963621940730359508344543165148824051912340863044293334325245042446606830289981585040087213953849835475175942178721427253004097683481614914435020887570808601409085167552235519264353720751592683477775 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=120081172701730746092896413144227018867976327457729029430899963621940730359508344543165148824051912340863044293334325245042446606830289981585040087213953849835475175942178721427253004097683481614914435020887570808601409085167552235519264353720751592683477775 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=437, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1131755654422579705435120, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10597238038350258317511, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2964422860043771060924995209459457631730502250167948592729596941308663470075333691434832865565598230488416841424714122395648, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2964422860043771060924995209459457631730502250167948592729596941308663470075333691434832865565598230488416841424714122395648 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=104606174738217088212724373898153549101930770523173494221954724361369897437024110391277924994095335592448264752966221544753165349207029445549572500623654076393904948138421690991410314097543996563279497800822799441152319963519672142142352419548340134251962176147208220 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=104606174738217088212724373898153549101930770523173494221954724361369897437024110391277924994095335592448264752966221544753165349207029445549572500623654076393904948138421690991410314097543996563279497800822799441152319963519672142142352419548340134251962176147208220 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1150188057299974360875080, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7000587011097550458754, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1952180907833702893779874894034276976993257579378892975699978473544729602244731943140011887079784200565542798011397104992256, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1952180907833702893779874894034276976993257579378892975699978473544729602244731943140011887079784200565542798011397104992256 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3651313494575526501374259722398326922481050598141752423064419591062392095511977554937868293007042968079408413831913192616693734317111376724063792844146193495054624088096317345532606807246195722664983253762594018227029995222776675939969191737834168830860446505566076 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3651313494575526501374259722398326922481050598141752423064419591062392095511977554937868293007042968079408413831913192616693734317111376724063792844146193495054624088096317345532606807246195722664983253762594018227029995222776675939969191737834168830860446505566076 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1167762822309317551786640, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4261573851896307128397, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1187834943919977951241722819121385462191664664701442815902103304008697906127746949529636862508863402460515459107463846952960, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1187834943919977951241722819121385462191664664701442815902103304008697906127746949529636862508863402460515459107463846952960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=95012273951100171539691734580727118632213178753315586957227260561312151208625669609086672797633452246408902189880964517583599491415532870270179743045158155594351283359138441861042358680418101430793296603397496633948949649334298039797435020706453112319536748107911 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=95012273951100171539691734580727118632213178753315586957227260561312151208625669609086672797633452246408902189880964517583599491415532870270179743045158155594351283359138441861042358680418101430793296603397496633948949649334298039797435020706453112319536748107911 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1184556223402836361926440, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2303924608519444569800, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=640397969765553330234667954656746944833767036621647431182003520422080610260176616268152047613474182196103986649241378357248, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=640397969765553330234667954656746944833767036621647431182003520422080610260176616268152047613474182196103986649241378357248 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1811139297567446088424855369437216669317848823230590146432981196349870049441767752916673713571674165216277298414226242754823393078287356150224155617318346402131653422448604831770843389052308405834982584833848227837283386376202285703809976556739239400222825086071 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1811139297567446088424855369437216669317848823230590146432981196349870049441767752916673713571674165216277298414226242754823393078287356150224155617318346402131653422448604831770843389052308405834982584833848227837283386376202285703809976556739239400222825086071 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1200634791135250567536760, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1061108726247186540683, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=289211986345733762041462947264337329924927048796873033437033847932552533665886213798520279567375437120821155260947719258112, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=289211986345733762041462947264337329924927048796873033437033847932552533665886213798520279567375437120821155260947719258112 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=23449839333604173867707070011994123602141335958075255614775980615168530722627014321975075441252370778557578412430777528356662176332258448962510445444119503522833016119034620158302469735858206723955529826980243004485616814221488238536537307191596006086180253212 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=23449839333604173867707070011994123602141335958075255614775980615168530722627014321975075441252370778557578412430777528356662176332258448962510445444119503522833016119034620158302469735858206723955529826980243004485616814221488238536537307191596006086180253212 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=441, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1216056904630157859220360, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=474747081481842438286, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1230874071128501877403640, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=493332433279771836209, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=134276993660519246662107796944156617465144701227119622667194286540113676344875742120741558370567167234666964942582869655552, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=134276993660519246662107796944156617465144701227119622667194286540113676344875742120741558370567167234666964942582869655552 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=316920027834410827028638536111825295036500546036149365022861314450339470249574037132547234375141151655317960737083459305162993711477159543831231444437443418008020624354908428199688478248118865172810489913514372995729853313169923357477939722209002610797272615 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=316920027834410827028638536111825295036500546036149365022861314450339470249574037132547234375141151655317960737083459305162993711477159543831231444437443418008020624354908428199688478248118865172810489913514372995729853313169923357477939722209002610797272615 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 1334054840673750730269481487234902, -108, 111, 88, 'd') / result: (0, 159031729778498498233494935, -85, 88)

[2]libmpf._normalize. / x: (0, 1339331681388793535432985124952757, -108, 111, 88, 'd') / result: (0, 159660778211211387566683903, -85, 88)

[2]libmpf._normalize. / x: (0, 1344524089020581735847763222434568, -108, 111, 88, 'd') / result: (0, 80139880718027456751332475, -84, 87)

[2]libmpf._normalize. / x: (0, 1349634723046378865077652794442106, -108, 111, 88, 'd') / result: (0, 80444498243712119166711139, -84, 87)

[2]libmpf._normalize. / x: (0, 1354666119236680762605276273748079, -108, 111, 88, 'd') / result: (0, 10093049103294914682248803, -81, 84)

[2]libmpf._normalize. / x: (0, 1359620697210584563728870961324139, -108, 111, 88, 'd') / result: (0, 162079417373011656252011175, -85, 88)

[2]libmpf._normalize. / x: (0, 1364500767423018045471131657860044, -108, 111, 88, 'd') / result: (0, 10166322942249611358874527, -81, 84)

[2]libmpf._normalize. / x: (0, 1369308537634337403115755786238163, -108, 111, 88, 'd') / result: (0, 163234297947208571805448029, -85, 88)

[2]libmpf._normalize. / x: (0, 1374046118907639349151109811406411, -108, 111, 88, 'd') / result: (0, 163799061644987982410324789, -85, 88)

[2]libmpf._normalize. / x: (0, 39787321631062772746884, -73, 76, 73, 'd') / result: (0, 310838450242677912085, -66, 69)

[2]libmpf._normalize. / x: (1, 54979550099894834915194, -73, 76, 73, 'd') / result: (1, 6872443762486854364399, -70, 73)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -83, 83, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (1, 33518540934880049652796305, -80, 85, 83, 'd') / result: (1, 2094908808430003103299769, -76, 81)

[2]libmpf._normalize. / x: (0, 4951760157141521099596496574, -91, 92, 77, 'd') / result: (0, 151115727451828646838271, -76, 77)

[2]libmpf._normalize. / x: (1, 138461585585848576977346659393056, -107, 107, 77, 'd') / result: (1, 128952400373153925852241, -77, 77)

[2]libmpf._normalize. / x: (1, 84595875988088368838235150550161, -107, 107, 77, 'd') / result: (1, 78786049027078197187031, -77, 77)

[3]libmpf._normalize1 / x: (1, 19486735789048615355214583974813561673769915311, -153, 154, 73, 'd') / result: (1, 8059525023322120365765, -72, 73)

[3]libmpf._normalize1 / x: (1, 11905811111782358375405963811652092924195663401, -153, 154, 73, 'd') / result: (1, 4924128064192387324189, -72, 73)

[3]libmpf._normalize1 / x: (0, 12781891506191765579461, -72, 74, 73, 'd') / result: (0, 3195472876547941394865, -70, 72)

[2]libmpf._normalize1 / x: (0, 4924128064192387324189, -72, 73, 73, 'd') / result: (0, 4924128064192387324189, -72, 73)

[3]libmpf._normalize1 / x: (0, 187623787668624269438953512933686232958399321, -144, 148, 63, 'd') / result: (0, 2424980618957059741, -58, 62)

[3]libmpf._normalize1 / x: (0, 29728860350829703866314760358099507435238189, -142, 145, 63, 'd') / result: (0, 6147784228875682917, -60, 63)

[3]libmpf._normalize1 / x: (1, 28083140983707983029779210981722127201107395, -140, 145, 63, 'd') / result: (1, 2903728720164575699, -57, 62)

[3]libmpf._normalize1 / x: (0, 730718483659673509, -60, 60, 53, 'n') / result: (0, 5708738153591199, -53, 53)

[3]libmpf._normalize1 / x: (1, 690267637368184937, -58, 60, 53, 'n') / result: (1, 5392715916938945, -51, 53)

[7]gammazeta.mpc_zeta / s: ((0, 0, 0, 0), (0, 5, 3, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5708738153591199, -53, 53), (1, 5392715916938945, -51, 53))

zeta_ / result: (0.633797253967305 - 2.39484695049927j) / count: 954
zeta / count: 0 / s: Complex { re: 0.0, im: 40.0 }
gamma_ / s: (1.0, -40.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-40j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-40j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-40.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -47, 53, 53, 'd') / result: (1, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -47, 53, 53, 'd') / result: (1, 5, 3, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 5, 3, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-40.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 5, 3, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 3, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, 3, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 3, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 3, 3), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-40j) / result: (1.0 - 40.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-40j) / result: (1.0 - 40.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 5, 3, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 5, 3, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 5, 3, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5, 3, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=240 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 5, 3, 3), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=2417851639229258349412352, y=-96714065569170333976494080, prec=81 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=81, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 5, 3, 3)), prec=81, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 5, 3, 3), prec=81, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 3, 3), t=(1, 5, 3, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 25, 6, 5), prec=101, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1601 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1601, exp=0, bc=11, prec=101, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1601, 0, 11, 101, 'd') / result: (0, 1601, 0, 11)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1601, 0, 11, 101, 'd') / result: (0, 1601, 0, 11)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1601, 0, 11), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1600 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=1600, exp=0, bc=11, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1600, 0, 11, 10, 'd') / result: (0, 25, 6, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1600, 0, 11, 10, 'd') / result: (0, 25, 6, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 1601, 0, 11), prec=81, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=1601, n=90 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=1981942002895893820113497882624, prec=101 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=18706425084988954537461373151783, exp=-101, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18706425084988954537461373151783 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=18706425084988954537461373151783, exp=-101, bc=104, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 18706425084988954537461373151783, -101, 104, 81, 'd') / result: (0, 1114989822208223017302833, -77, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 18706425084988954537461373151783, -101, 104, 81, 'd') / result: (0, 1114989822208223017302833, -77, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 1114989822208223017302833, -77, 80), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 5, 3, 3)), prec=81, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 5, 3, 3), x=(0, 1, 0, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 3, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5, 3, 3), x=(0, 1, 0, 1), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5, 3, 3), t=(0, 1, 0, 1), prec=85, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=3, bc=3, prec=85, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 3, 3, 85, 'd') / result: (0, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 3, 3, 85, 'd') / result: (0, 5, 3, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 5, 3, 3), prec=85, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 5, 3, 3), prec=121, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=272225893536750770770699685945414569165 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=272225893536750770770699685945414569165, exp=-133, bc=128, prec=121, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 272225893536750770770699685945414569165, -133, 128, 121, 'd') / result: (0, 2126764793255865396646091296448551321, -126, 121)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 272225893536750770770699685945414569165, -133, 128, 121, 'd') / result: (0, 2126764793255865396646091296448551321, -126, 121)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2126764793255865396646091296448551321, -126, 121), prec=121 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=66461399789245793645190353014017228, prec=121 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=3, prec=121 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=8362779449448983678075894352243135564742656, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=1993477030585071344571090990819966976, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=1993477030585071344571090990819966976, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=8362779449448983678075894352243135564742656, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=9413929113605522350681717820528704292477991030026380771328, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=9413929113605522350681717820528704292477991030026380771328, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=8362779449448983678075894352243135564742656, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=9413929113605522350681717820528377636417130829421108177080, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=121, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4109445347649506662964890043124120392, exp=-121, prec=85, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4109445347649506662964890043124120392 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4109445347649506662964890043124120392, exp=-121, bc=122, prec=85, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4109445347649506662964890043124120392, -121, 122, 85, 'd') / result: (0, 29900150167301083732781189, -84, 85)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4109445347649506662964890043124120392, -121, 122, 85, 'd') / result: (0, 29900150167301083732781189, -84, 85)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 29900150167301083732781189, -84, 85), prec=81, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=29900150167301083732781189, exp=-84, bc=85, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 29900150167301083732781189, -84, 85, 81, 'd') / result: (0, 233594923182039716662353, -77, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 29900150167301083732781189, -84, 85, 81, 'd') / result: (0, 233594923182039716662353, -77, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 233594923182039716662353, -77, 78), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1114989822208223017302833, -78, 80), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 233594923182039716662353, -77, 78), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-145236660289069438690301254, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=145236660289069438690301254 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-261946402773713052517416438, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=261946402773713052517416438 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 72618330144534719345150627, -80, 86), (1, 130973201386856526258708219, -80, 87)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 72618330144534719345150627, -80, 86), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=555657009432399706408, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2987666846987475130912, exp=-158, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2987666846987475130912 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2987666846987475130912, exp=-158, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2987666846987475130912, -158, 72, 57, 'n') / result: (0, 91176356414412693, -143, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2987666846987475130912, -158, 72, 57, 'n') / result: (0, 91176356414412693, -143, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 130973201386856526258708219, -80, 87), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=130973201386856526258708219, exp=-80, mag=7, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=93, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=235880612252289857525304147, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=4028309809815577399863233908324698523954341036813588680015828596203410290346272263622246751117015017040008948277486089666560, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4028309809815577399863233908324698523954341036813588680015828596203410290346272263622246751117015017040008948277486089666560 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=128689093469457473707903497659895515032745447280920967541792578317704248347638030012637421789323576217929836572387955827315166176484917082089955710002572416066443820739381600532653378452421154233065934361286123173189845395706676293358240465895072071412658132880141916 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=128689093469457473707903497659895515032745447280920967541792578317704248347638030012637421789323576217929836572387955827315166176484917082089955710002572416066443820739381600532653378452421154233065934361286123173189845395706676293358240465895072071412658132880141916 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7185761006701323420893275, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7185761006701323420893275 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7185761006701323420893275, exp=-87, bc=83, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7185761006701323420893275, -87, 83, 57, 'n') / result: (0, 107076183061321429, -61, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7185761006701323420893275, -87, 83, 57, 'n') / result: (0, 107076183061321429, -61, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-154575572665230919385825093, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=154575572665230919385825093 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=154575572665230919385825093, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 154575572665230919385825093, -87, 87, 57, 'n') / result: (1, 35989930076811211, -55, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 154575572665230919385825093, -87, 87, 57, 'n') / result: (1, 35989930076811211, -55, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 91176356414412693, -143, 57), t=(0, 107076183061321429, -61, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=9762816230293941819535921530498297, exp=-204, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 9762816230293941819535921530498297, -204, 113, 53, 'n') / result: (0, 2116973313292287, -142, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 9762816230293941819535921530498297, -204, 113, 53, 'n') / result: (0, 2116973313292287, -142, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 91176356414412693, -143, 57), t=(1, 35989930076811211, -55, 55), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3281430692013130162940146803101223, exp=-198, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 3281430692013130162940146803101223, -198, 112, 53, 'n') / result: (1, 5692374856225997, -139, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 3281430692013130162940146803101223, -198, 112, 53, 'n') / result: (1, 5692374856225997, -139, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 2116973313292287, -142, 51), (1, 5692374856225997, -139, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (3.79713465975437e-28 - 8.16815733185607e-27j) / count: 150
gamma__ / s: Complex { re: 1.0, im: -40.0 } / result: Complex { re: 3.79713465975437e-28, im: -8.168157331856068e-27 }
zeta__ / s: Complex { re: 0.0, im: 40.0 } / result: Complex { re: 0.6337972539673052, im: -2.394846950499272 } / z: Complex { re: -0.0, im: 0.0 }
zeta_ / s: (0.0, 50.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=50j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=50j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=50j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=50.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7036874417766400, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7036874417766400, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7036874417766400, -47, 53, 53, 'd') / result: (0, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7036874417766400, -47, 53, 53, 'd') / result: (0, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 25, 1, 5)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='50.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 25, 1, 5)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 25, 1, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 1, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 1, 5), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 50j / result: (0.0 + 50.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 50j / result: (0.0 + 50.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 25, 1, 5)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 25, 1, 5)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 25, 1, 5), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 25, 1, 5), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=1, bc=5, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 1, 5, 10, 'd') / result: (0, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 1, 5, 10, 'd') / result: (0, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 25, 1, 5), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 25, 1, 5), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 25, 1, 5), t=(0, 53, 0, 6), prec=5, rnd='f' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 711 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 25, 1, 5), t=(0, 53, 0, 6), prec=5, rnd='f', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3, exp=0, bc=2, prec=5, rnd='f' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 3, 0, 2, 5, 'f') / result: (1, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 3, 0, 2, 5, 'f') / result: (1, 3, 0, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 0, 0, 0), (0, 25, 1, 5)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 73, 'd') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 25, 1, 5), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 25, 1, 5), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 25, 1, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=25, exp=1, bc=5, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 25, 1, 5, 73, 'd') / result: (1, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 25, 1, 5, 73, 'd') / result: (1, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 0, 1), (1, 25, 1, 5)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 0, 1), y=(1, 25, 1, 5), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 25, 1, 5), t=(1, 25, 1, 5), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 625, 2, 10), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2501 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2501, exp=0, bc=12, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 2501, 0, 12, 14, 'd') / result: (0, 2501, 0, 12)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 2501, 0, 12, 14, 'd') / result: (0, 2501, 0, 12)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 2501, 0, 12), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=10244096 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=10244096 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=10244096 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3200, exp=-6, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3200, exp=-6, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3200, -6, 12, 10, 'd') / result: (0, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3200, -6, 12, 10, 'd') / result: (0, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 25, 1, 5), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=78 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 78 / result: [1, 12169, 24684817, 20025978129, 8699158611729, 2349364795086609, 432109761504216849, 57557184031763990289, 5803387571048726202129, 457958929137612288493329, 29029429624127939282536209, 1509303720869341071164376849, 65472170378080978066899273489, 2403560957724770970403301033745, 75577080413574883693524022789905, 2056476770326427590423339239802641, 48855231944517572786915223741728529, 1021201560483505074409570135959996177, 18909287191859481493150158124229396241, 312039794266470076576921955599141898001, 4613542081415178885972886050339973302033, 61407360897102196011656184341877454604049, 738970827233089167766901115122312987346705, 8071058578888213886277764134195625032484625, 80286922870455975963100182699713795973515025, 729699135960995132729039580999916384615466769, 6076820208753232322450401836385747352030873361, 46492237066419785393048762531181797487296448273, 327563090667464449929482816454081600700734310161, 2129953319446093272728152490732809921367667967761, 12807842550504116908811118707956959735217083975441, 71352715923116273999719735175529664796026573752081, 368897742002374290643295967480465148949327184987921, 1772699916325027497371963319893494099826437761074961, 7928970206704002710374328047991017901082949901158161, 33053690696134718941989775981791926632008077707642641, 128578743010801268370330512687847181345282878968760081, 467248828521814551349149799876734674545697353932277521, 1587830900931939203450997476435053643275489809688758033, 5050701907247609124032131821576978395127795500471355153, 15051385705866850799735749553781157282913916302396032785, 42057146713399931000792673318432490094014768862366074641, 110276518897087912713502733752029632014426159465663891217, 271539275577543223793616255543077321807135985679752300305, 628356294669355262677775484793383991750775543682189297425, 1367470899010347191412603191624980529541645399659272275729, 2800851777663040090951382772145501478845582688436615710481, 5403302167273603085858670521175667174035709964514629322513, 9826326404002081860098030182356321590203141190305112983313, 16861475410875067244749736270832178393532781431621346199313, 27330345629991513778758719512794433184103716788699199506193, 41898557963640647685917793843678813370244750498567973046033, 60845937933058098544257993953637848541390837284032102336273, 83861982603904813333544562281279012558811780081828600809233, 109953206659641397250094756560623011228612260408164195305233, 137528518689190520802265237120076485052107813927373924534033, 164669084808363869884018615508547584288296005116325842716433, 189513173899909602873619286053249587253140839031876302210833, 210632512003217594785318806591249640747993943724705553385233, 227275884345966468608242954313503775328900924679216798697233, 239411093928088406580531905719954058890273717795349227702033, 247579055072104364830949398009243451754777177516382408476433, 252640920318186113938144922341682695221554433042425263490833, 255520559213734842319127265073025909282654382852796309899025, 257019190184228336542989877001370126246046704173892462249745, 257729811142926265348485135800069781183011268225493929363217, 258035396237124611323367320881444441957431144369821277816593, 258153912911521366310371341938702979454501629383264810108689, 258195096810358582912609122676464933116337669382489741264657, 258207818378601963054208014007710559340029749864636869052177, 258211277912987572905664403161099657694386301247551699486481, 258212096230580732842558692394465493765020235287581898114833, 258212262024141273987504446798195207638693738240913579771665, 258212290217661252642289742776155858084854560660941640894225, 258212294131268089171865565255170436332115347740758001649425, 258212294557124546730699050725817570752577908554096408332049, 258212294591190094660204901166916740271398458469279804753681, 258212294592971299780701939098477481161271428399485472540433, 258212294593016971706868529814671346312293812243849720432401]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 78 / result: [1, 12169, 24684817, 20025978129, 8699158611729, 2349364795086609, 432109761504216849, 57557184031763990289, 5803387571048726202129, 457958929137612288493329, 29029429624127939282536209, 1509303720869341071164376849, 65472170378080978066899273489, 2403560957724770970403301033745, 75577080413574883693524022789905, 2056476770326427590423339239802641, 48855231944517572786915223741728529, 1021201560483505074409570135959996177, 18909287191859481493150158124229396241, 312039794266470076576921955599141898001, 4613542081415178885972886050339973302033, 61407360897102196011656184341877454604049, 738970827233089167766901115122312987346705, 8071058578888213886277764134195625032484625, 80286922870455975963100182699713795973515025, 729699135960995132729039580999916384615466769, 6076820208753232322450401836385747352030873361, 46492237066419785393048762531181797487296448273, 327563090667464449929482816454081600700734310161, 2129953319446093272728152490732809921367667967761, 12807842550504116908811118707956959735217083975441, 71352715923116273999719735175529664796026573752081, 368897742002374290643295967480465148949327184987921, 1772699916325027497371963319893494099826437761074961, 7928970206704002710374328047991017901082949901158161, 33053690696134718941989775981791926632008077707642641, 128578743010801268370330512687847181345282878968760081, 467248828521814551349149799876734674545697353932277521, 1587830900931939203450997476435053643275489809688758033, 5050701907247609124032131821576978395127795500471355153, 15051385705866850799735749553781157282913916302396032785, 42057146713399931000792673318432490094014768862366074641, 110276518897087912713502733752029632014426159465663891217, 271539275577543223793616255543077321807135985679752300305, 628356294669355262677775484793383991750775543682189297425, 1367470899010347191412603191624980529541645399659272275729, 2800851777663040090951382772145501478845582688436615710481, 5403302167273603085858670521175667174035709964514629322513, 9826326404002081860098030182356321590203141190305112983313, 16861475410875067244749736270832178393532781431621346199313, 27330345629991513778758719512794433184103716788699199506193, 41898557963640647685917793843678813370244750498567973046033, 60845937933058098544257993953637848541390837284032102336273, 83861982603904813333544562281279012558811780081828600809233, 109953206659641397250094756560623011228612260408164195305233, 137528518689190520802265237120076485052107813927373924534033, 164669084808363869884018615508547584288296005116325842716433, 189513173899909602873619286053249587253140839031876302210833, 210632512003217594785318806591249640747993943724705553385233, 227275884345966468608242954313503775328900924679216798697233, 239411093928088406580531905719954058890273717795349227702033, 247579055072104364830949398009243451754777177516382408476433, 252640920318186113938144922341682695221554433042425263490833, 255520559213734842319127265073025909282654382852796309899025, 257019190184228336542989877001370126246046704173892462249745, 257729811142926265348485135800069781183011268225493929363217, 258035396237124611323367320881444441957431144369821277816593, 258153912911521366310371341938702979454501629383264810108689, 258195096810358582912609122676464933116337669382489741264657, 258207818378601963054208014007710559340029749864636869052177, 258211277912987572905664403161099657694386301247551699486481, 258212096230580732842558692394465493765020235287581898114833, 258212262024141273987504446798195207638693738240913579771665, 258212290217661252642289742776155858084854560660941640894225, 258212294131268089171865565255170436332115347740758001649425, 258212294557124546730699050725817570752577908554096408332049, 258212294591190094660204901166916740271398458469279804753681, 258212294592971299780701939098477481161271428399485472540433, 258212294593016971706868529814671346312293812243849720432401]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 1, 5), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-327329501317187984890550, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13892791236076809477119, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-518804984967499254749200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=446329787468910592905, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-654659002634375969781150, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12949830622011671372985, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-760035565393848662012700, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11423530813532612209856, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3191660849315419016814716096595722676671516359936920261858694964684240460812815716562241656654250359654776320558315901812736, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3191660849315419016814716096595722676671516359936920261858694964684240460812815716562241656654250359654776320558315901812736 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=112650760102763699775103561484095249447416505792352339743440103029182206198259964767448853902267236784637899544167284172395452118516166979654089501289913783344536981741401686240010920037848922846947456422317250019794168564734419100361218434184588427640874115911437212 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=112650760102763699775103561484095249447416505792352339743440103029182206198259964767448853902267236784637899544167284172395452118516166979654089501289913783344536981741401686240010920037848922846947456422317250019794168564734419100361218434184588427640874115911437212 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-846134486284687239639750, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14339121023545720070024, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-918930086657468696344650, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=886528051332053689936, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=247895988296343224606968240512289139935651756111605457231743298227902171713616754684445953914893231817846704509383759364096, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=247895988296343224606968240512289139935651756111605457231743298227902171713616754684445953914893231817846704509383759364096 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=17246702383335606251482879396313995097189390389628902377464841979748723333788581861602242251588426260595798721165701937597212488836172612895061948594289273511784367242297426223757642414934185716421368919646366778756686407219926274814140521500069718643782621007 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=17246702383335606251482879396313995097189390389628902377464841979748723333788581861602242251588426260595798721165701937597212488836172612895061948594289273511784367242297426223757642414934185716421368919646366778756686407219926274814140521500069718643782621007 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=441, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-981988503951563954671750, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12006870007946533268851, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1037609969934998509498400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=892659574937821185810, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1087365066711036646903300, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10480570199467474105722, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1132374026569458954842750, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9978865891471008909881, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1173463987601875224530350, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13396160409480581965890, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1211263087593439361863950, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5268564118200339794696, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1246259587974656681235200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14779319287408863167055, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4131599804939053743449470675204818998927529268526757620529054970465036195226945911407432565248220530297445075156395989401600, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4131599804939053743449470675204818998927529268526757620529054970465036195226945911407432565248220530297445075156395989401600 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128969279776709178283614004824098921198520420919709897774674134060110518337631236115713670154718233727498369037980392829102862357394629304374416262734619985975736480129284161168868088958383718084423102976682756013331911879737416386899375079639754495182975856670958615 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128969279776709178283614004824098921198520420919709897774674134060110518337631236115713670154718233727498369037980392829102862357394629304374416262734619985975736480129284161168868088958383718084423102976682756013331911879737416386899375079639754495182975856670958615 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1278840550361347916761950, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11869860601001522802711, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3315608843463590629118200216851867246639342237992722990474566613798191546669624093904464633611696975563699672813007781494784, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3315608843463590629118200216851867246639342237992722990474566613798191546669624093904464633611696975563699672813007781494784 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=116454035066204927635563955407649652218324268303629100279619700885633805329808556946554010953231137604781845900121414512265147004906941323529286715147812408944782576591958171892514577901019810908548746062321023375575757987752448799030075545358758714895063170375424316 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=116454035066204927635563955407649652218324268303629100279619700885633805329808556946554010953231137604781845900121414512265147004906941323529286715147812408944782576591958171892514577901019810908548746062321023375575757987752448799030075545358758714895063170375424316 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1309318005268751939562350, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11063909393881395164717, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1337947173479009916515750, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12106244883907313373723, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1364939471252186494389000, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14785450811014630662879, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1390471994607051199284700, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4088679306291873348382, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1136189946358239779448604435681325224705070548844858345645490116877884953687410125637043955443260645831797395668008897085440, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1136189946358239779448604435681325224705070548844858345645490116877884953687410125637043955443260645831797395668008897085440 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=87435352603021505874049389481895737501588992871041067858076406753177887979874849560714310887221447170618664798926702177266610300206817902360999829445090249378416250607919056307561016518478241297142561338693380324713793113706661141277987468284781229569010267395911 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=87435352603021505874049389481895737501588992871041067858076406753177887979874849560714310887221447170618664798926702177266610300206817902360999829445090249378416250607919056307561016518478241297142561338693380324713793113706661141277987468284781229569010267395911 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1414694568028224631793900, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9537609585402336001588, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1437735071624967951093850, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1332857838800964282841, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=371843982444514836910452360768433709903477634167408185847614947341853257570425132026668930872339847726770056764075639046144, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=371843982444514836910452360768433709903477634167408185847614947341853257570425132026668930872339847726770056764075639046144 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=618609548779102830397947016513883224188892252749636703983171586690312983947688127256795370591460285922354236164742790972942446235978123002825350656199699118586726461929525490427432553646116009416609750593284064676123555764453475968009774637829754671902231760732 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=618609548779102830397947016513883224188892252749636703983171586690312983947688127256795370591460285922354236164742790972942446235978123002825350656199699118586726461929525490427432553646116009416609750593284064676123555764453475968009774637829754671902231760732 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1459703527886646939733300, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9035905277405870805797, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2520275881012822783504177111874939589345792853801322148522723531983672079088437005958533864801414523481441495845401553534976, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2520275881012822783504177111874939589345792853801322148522723531983672079088437005958533864801414523481441495845401553534976 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5357420482066937733272467823576923305377601012415964755183450745096336422356812244168484986551563634322374245148537240836454769938693280018311850067721909172965304893882552203373939483739943253381321367538703873552539638369999905994456710375024137893316051615084887 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5357420482066937733272467823576923305377601012415964755183450745096336422356812244168484986551563634322374245148537240836454769938693280018311850067721909172965304893882552203373939483739943253381321367538703873552539638369999905994456710375024137893316051615084887 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1480695279253545452408050, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2879905760649305712250, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=805661961963115479972646781664939704790868207362717736003165719240682058069254452724449350223403003408001789655497217933312, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=805661961963115479972646781664939704790868207362717736003165719240682058069254452724449350223403003408001789655497217933312 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=45342397079933526679894068620837852596430270173956918066204950452459823722820060192036880507396866597344968040975187592234020838195936669534346732494016104840221953523576808560389809387882344434389193323804271521298320881313875693034028880013591786809517464377072 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=45342397079933526679894068620837852596430270173956918066204950452459823722820060192036880507396866597344968040975187592234020838195936669534346732494016104840221953523576808560389809387882344434389193323804271521298320881313875693034028880013591786809517464377072 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1500793488919063209420950, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12453199795415443861756, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3480872835661152778856179043860060006596443408733793295295728812616792994478701930360761936221625796775597475819263621070848, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3480872835661152778856179043860060006596443408733793295295728812616792994478701930360761936221625796775597475819263621070848 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=120809929021809730120498752791152010150692202668572189727033402382702927374861856937825859679329665203557079157335933313256766174385949040831510970783417790084429626366071744758690471619344685851849020214917269601769580320992608692935393447443905954632497041831276912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=120809929021809730120498752791152010150692202668572189727033402382702927374861856937825859679329665203557079157335933313256766174385949040831510970783417790084429626366071744758690471619344685851849020214917269601769580320992608692935393447443905954632497041831276912 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1520071130787697324025450, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8011309776923276838459, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1538592588910627346754550, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4325603504135201690562, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1208492942944673219958970172497409557186302311044076604004748578861023087103881679086674025335104505112002684483245826899968, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1208492942944673219958970172497409557186302311044076604004748578861023087103881679086674025335104505112002684483245826899968 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=98110727929260026551265395769232750119118031243662015922499797853864897763482397740102550431328061028263360946492124708372536030112109989770126283313158210328692295521090053749203957193327076002339987034943212790119497035046405208490472124155783070583610375989820 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=98110727929260026551265395769232750119118031243662015922499797853864897763482397740102550431328061028263360946492124708372536030112109989770126283313158210328692295521090053749203957193327076002339987034943212790119497035046405208490472124155783070583610375989820 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1556414954902497764247600, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1338989362406731778715, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=28, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 1378715531174565549704221994504981, -108, 111, 88, 'd') / result: (0, 164355698963947957718875645, -85, 88)

[2]libmpf._normalize. / x: (0, 1383318708406327960511159210263844, -108, 111, 88, 'd') / result: (0, 41226110112855671659444547, -83, 86)

[2]libmpf._normalize. / x: (0, 1387857503423087327595539853680995, -108, 111, 88, 'd') / result: (0, 82722753490393598532410851, -84, 87)

[2]libmpf._normalize. / x: (0, 1392333692371617713722231363803599, -108, 111, 88, 'd') / result: (0, 165979110285236562934187813, -85, 88)

[2]libmpf._normalize. / x: (0, 1396748978898338793244841679077465, -108, 111, 88, 'd') / result: (0, 83252726727625059678843121, -84, 87)

[2]libmpf._normalize. / x: (0, 1401104998042252743662150253809981, -108, 111, 88, 'd') / result: (0, 83512365701332851866611853, -84, 87)

[2]libmpf._normalize. / x: (0, 1405403319870047345200631595525534, -108, 111, 88, 'd') / result: (0, 167537131294017713689879369, -85, 88)

[2]libmpf._normalize. / x: (0, 1409645452873589646145288533328442, -108, 111, 88, 'd') / result: (0, 84021416477774956592636617, -84, 87)

[2]libmpf._normalize. / x: (0, 1413832847148207622913011704928396, -108, 111, 88, 'd') / result: (0, 42135502313024032798797241, -83, 86)

[2]libmpf._normalize. / x: (1, 41321340220053654625463, -73, 76, 73, 'd') / result: (1, 2582583763753353414091, -69, 72)

[2]libmpf._normalize. / x: (0, 6158241444374707001625, -73, 73, 73, 'd') / result: (0, 6158241444374707001625, -73, 73)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -83, 83, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (1, 167592704674400248263981525, -82, 88, 83, 'd') / result: (1, 2618636010537503879124711, -76, 82)

[2]libmpf._normalize. / x: (0, 4951760157141521099596496574, -91, 92, 77, 'd') / result: (0, 151115727451828646838271, -76, 77)

[2]libmpf._normalize. / x: (1, 161451248668985620488063376684550, -107, 107, 77, 'd') / result: (1, 18795399073160442114815, -74, 74)

[2]libmpf._normalize. / x: (0, 16173039923423969067332284162021, -107, 104, 77, 'd') / result: (0, 120498537446737058962377, -80, 77)

[3]libmpf._normalize1 / x: (1, 2840280403688066127833061673460514962518084865, -150, 151, 73, 'd') / result: (1, 9397699536580221057407, -72, 73)

[3]libmpf._normalize1 / x: (0, 18209224143145085563491397956085686004992730167, -156, 154, 73, 'd') / result: (0, 1882789647605266546287, -73, 71)

[3]libmpf._normalize1 / x: (0, 14120066019449866271103, -72, 74, 73, 'd') / result: (0, 7060033009724933135551, -71, 73)

[2]libmpf._normalize1 / x: (1, 1882789647605266546287, -73, 71, 73, 'd') / result: (1, 1882789647605266546287, -73, 71)

[3]libmpf._normalize1 / x: (0, 801049954431620728809677821084437065754663985, -146, 150, 63, 'd') / result: (0, 5176663999940022971, -59, 63)

[3]libmpf._normalize1 / x: (1, 1178514777077535738812348250924316651379461399, -146, 150, 63, 'd') / result: (1, 3807986621897620589, -58, 62)

[3]libmpf._normalize1 / x: (0, 24027539981268545176860542245116405984149907, -144, 145, 63, 'd') / result: (0, 621097351245252447, -59, 60)

[3]libmpf._normalize1 / x: (1, 848096315637216463, -59, 60, 53, 'n') / result: (1, 3312876232957877, -51, 52)

[3]libmpf._normalize1 / x: (0, 553311161561422773, -62, 59, 53, 'n') / result: (0, 8645486899397231, -56, 53)

[7]gammazeta.mpc_zeta / s: ((0, 0, 0, 0), (0, 25, 1, 5)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((1, 3312876232957877, -51, 52), (0, 8645486899397231, -56, 53))

zeta_ / result: (-1.47121258862532 + 0.119980232685075j) / count: 1001
zeta / count: 0 / s: Complex { re: 0.0, im: 50.0 }
gamma_ / s: (1.0, -50.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-50j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-50j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-50.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7036874417766400, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7036874417766400, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7036874417766400, -47, 53, 53, 'd') / result: (1, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7036874417766400, -47, 53, 53, 'd') / result: (1, 25, 1, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 25, 1, 5)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-50.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 25, 1, 5)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 25, 1, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 25, 1, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 1, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 1, 5), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-50j) / result: (1.0 - 50.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-50j) / result: (1.0 - 50.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 25, 1, 5)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 25, 1, 5)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 25, 1, 5)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 25, 1, 5), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=300 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 25, 1, 5), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=4835703278458516698824704, y=-241785163922925834941235200, prec=82 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=82, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 25, 1, 5)), prec=82, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 25, 1, 5), prec=82, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 25, 1, 5), t=(1, 25, 1, 5), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 625, 2, 10), prec=102, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2501 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2501, exp=0, bc=12, prec=102, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 2501, 0, 12, 102, 'd') / result: (0, 2501, 0, 12)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 2501, 0, 12, 102, 'd') / result: (0, 2501, 0, 12)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 2501, 0, 12), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2500 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2500, exp=0, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2500, 0, 12, 10, 'd') / result: (0, 625, 2, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2500, 0, 12, 10, 'd') / result: (0, 625, 2, 10)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 2501, 0, 12), prec=82, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=2501, n=90 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=3096088038252736067522709684224, prec=102 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=102, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=39674654322921363721881385330077, exp=-102, prec=82, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=39674654322921363721881385330077 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=39674654322921363721881385330077, exp=-102, bc=105, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 39674654322921363721881385330077, -102, 105, 82, 'd') / result: (0, 2364793677504143936746203, -78, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 39674654322921363721881385330077, -102, 105, 82, 'd') / result: (0, 2364793677504143936746203, -78, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 2364793677504143936746203, -78, 81), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 25, 1, 5)), prec=82, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 25, 1, 5), x=(0, 1, 0, 1), prec=82, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 25, 1, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 25, 1, 5), x=(0, 1, 0, 1), prec=82, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 25, 1, 5), t=(0, 1, 0, 1), prec=86, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=1, bc=5, prec=86, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 1, 5, 86, 'd') / result: (0, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 1, 5, 86, 'd') / result: (0, 25, 1, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 25, 1, 5), prec=86, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 25, 1, 5), prec=122, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=435561429658801233233119497512663310663 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=435561429658801233233119497512663310663, exp=-134, bc=129, prec=122, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 435561429658801233233119497512663310663, -134, 129, 122, 'd') / result: (0, 1701411834604692317316873037158841057, -126, 121)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 435561429658801233233119497512663310663, -134, 129, 122, 'd') / result: (0, 1701411834604692317316873037158841057, -126, 121)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1701411834604692317316873037158841057, -126, 121), prec=122 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=106338239662793269832304564822427566, prec=122 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=2, prec=122 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=121 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=5575186299632655785383929568162090376495104, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=1329119838776543333605051485592223744, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=1329119838776543333605051485592223744, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=30986998537042903075871030064036142491956469513950682153967912278487771464202094335555744239361653977230838063672969920512, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=30986998537042903075871030064036142491956469513950682153967912278487771464202094335555744239361653977230838063672969920512 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=16891139628563275610607505878559393308687008204201577160831661849766742873585357798496436296548995546274570192384073302136873581841969249367942053716476363552824851946163761770613689948251847223781526980558258162507130766825012611163181366327727872362511516 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=16891139628563275610607505878559393308687008204201577160831661849766742873585357798496436296548995546274570192384073302136873581841969249367942053716476363552824851946163761770613689948251847223781526980558258162507130766825012611163181366327727872362511516 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=436, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=5575186299632655785383929568162090376495104, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=6276590978355562654495739995582376278076606877684463566848, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=6276590978355562654495739995582376278076606877684463566848, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=5575186299632655785383929568162090376495104, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=6276590978355562654495739995581924089204578495522598220903, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8245461748374862750674510547392264765, exp=-122, prec=86, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8245461748374862750674510547392264765 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8245461748374862750674510547392264765, exp=-122, bc=123, prec=86, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8245461748374862750674510547392264765, -122, 123, 86, 'd') / result: (0, 59993630190546266026463931, -85, 86)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8245461748374862750674510547392264765, -122, 123, 86, 'd') / result: (0, 59993630190546266026463931, -85, 86)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 59993630190546266026463931, -85, 86), prec=82, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=59993630190546266026463931, exp=-85, bc=86, prec=82, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 59993630190546266026463931, -85, 86, 82, 'd') / result: (0, 3749601886909141626653995, -81, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 59993630190546266026463931, -85, 86, 82, 'd') / result: (0, 3749601886909141626653995, -81, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 3749601886909141626653995, -81, 82), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2364793677504143936746203, -79, 81), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 3749601886909141626653995, -81, 82), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-365892842049537148812136734, exp=-82, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=365892842049537148812136734 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-707873852575475326584507185, exp=-82, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=707873852575475326584507185 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 182946421024768574406068367, -81, 88), (1, 707873852575475326584507185, -82, 90)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 182946421024768574406068367, -81, 88), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=78, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1372611442452830746396, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4222749366886260921299, exp=-181, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4222749366886260921299 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4222749366886260921299, exp=-181, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4222749366886260921299, -181, 72, 57, 'n') / result: (0, 32217020926561439, -164, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4222749366886260921299, -181, 72, 57, 'n') / result: (0, 32217020926561439, -164, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 707873852575475326584507185, -82, 90), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=707873852575475326584507185, exp=-82, mag=8, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=94, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=46550159331723217854092371, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=795332962450767845614023104976927657293549384191400841951843081814519467581187087945930768810282452082258176967606227959808, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=795332962450767845614023104976927657293549384191400841951843081814519467581187087945930768810282452082258176967606227959808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=44222288790105019736977836861856847664711727034262962296862310744614087041661548383798834879090352350670572162924487068684180349583044772340680429302285458465971029189968931388860355691415860217922033137447961482587424085542905793741292626352387826441466679937687 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=44222288790105019736977836861856847664711727034262962296862310744614087041661548383798834879090352350670572162924487068684180349583044772340680429302285458465971029189968931388860355691415860217922033137447961482587424085542905793741292626352387826441466679937687 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-45851238892694665094501008, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=45851238892694665094501008 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=45851238892694665094501008, exp=-87, bc=86, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 45851238892694665094501008, -87, 86, 57, 'n') / result: (1, 85404587709707515, -58, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 45851238892694665094501008, -87, 86, 57, 'n') / result: (1, 85404587709707515, -58, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-147793459659196548337260316, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=147793459659196548337260316 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=147793459659196548337260316, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 147793459659196548337260316, -87, 87, 57, 'n') / result: (1, 137643385361131791, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 147793459659196548337260316, -87, 87, 57, 'n') / result: (1, 137643385361131791, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 32217020926561439, -164, 55), t=(1, 85404587709707515, -58, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=2751481389467998890413609367514085, exp=-222, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 2751481389467998890413609367514085, -222, 112, 53, 'n') / result: (1, 2386529680011711, -162, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 2751481389467998890413609367514085, -222, 112, 53, 'n') / result: (1, 2386529680011711, -162, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 32217020926561439, -164, 55), t=(1, 137643385361131791, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=4434459826582343342324626937607249, exp=-221, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 4434459826582343342324626937607249, -221, 112, 53, 'n') / result: (1, 480785097778027, -158, 49)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 4434459826582343342324626937607249, -221, 112, 53, 'n') / result: (1, 480785097778027, -158, 49)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 2386529680011711, -162, 52), (1, 480785097778027, -158, 49)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-4.08232467732667e-34 - 1.31586605309884e-33j) / count: 155
gamma__ / s: Complex { re: 1.0, im: -50.0 } / result: Complex { re: -4.0823246773266696e-34, im: -1.3158660530988403e-33 }
zeta__ / s: Complex { re: 0.0, im: 50.0 } / result: Complex { re: -1.4712125886253156, im: 0.1199802326850745 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.0, 60.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=60j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=60j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=60j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=60.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8444249301319680, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8444249301319680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8444249301319680, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8444249301319680, -47, 53, 53, 'd') / result: (0, 15, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8444249301319680, -47, 53, 53, 'd') / result: (0, 15, 2, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 15, 2, 4)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='60.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 15, 2, 4)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 15, 2, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 15, 2, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 2, 4), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=553402322211286548480, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=600000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=600000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 60j / result: (0.0 + 60.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 60j / result: (0.0 + 60.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 15, 2, 4)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 15, 2, 4)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 15, 2, 4), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 15, 2, 4), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15, exp=2, bc=4, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 15, 2, 4, 10, 'd') / result: (0, 15, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 15, 2, 4, 10, 'd') / result: (0, 15, 2, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 15, 2, 4), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 15, 2, 4), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 15, 2, 4), t=(0, 53, 0, 6), prec=5, rnd='f' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 711 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 15, 2, 4), t=(0, 53, 0, 6), prec=5, rnd='f', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=7, exp=0, bc=3, prec=5, rnd='f' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 7, 0, 3, 5, 'f') / result: (0, 7, 0, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 7, 0, 3, 5, 'f') / result: (0, 7, 0, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: convert / f_locals: x=60j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 536 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=60.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8444249301319680, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8444249301319680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8444249301319680, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8444249301319680, -47, 53, 53, 'd') / result: (0, 15, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8444249301319680, -47, 53, 53, 'd') / result: (0, 15, 2, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 15, 2, 4)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='60.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 15, 2, 4)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 15, 2, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 15, 2, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 2, 4), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=553402322211286548480, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=600000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=600000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 60j / result: (0.0 + 60.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 60j / result: (0.0 + 60.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 537 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __nonzero__ / f_locals: s=mpc(real='0.0', imag='60.0') / f_lineno: 426 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 540 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_is_nonzero / f_locals: z=((0, 0, 0, 0), (0, 15, 2, 4)) / f_lineno: 84 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 427 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _im / f_locals: x=mpc(real='0.0', imag='60.0') / f_lineno: 75 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 76 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 15, 2, 4) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 77 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 15, 2, 4) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('60.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 15, 2, 4), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15, exp=2, bc=4, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 15, 2, 4, 53, 'n') / result: (0, 15, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 15, 2, 4, 53, 'n') / result: (0, 15, 2, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _re / f_locals: x=mpc(real='0.0', imag='60.0') / f_lineno: 70 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 71 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 72 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('60.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 15, 2, 4), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15, exp=2, bc=4, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 15, 2, 4, 53, 'n') / result: (0, 15, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 15, 2, 4, 53, 'n') / result: (0, 15, 2, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('60.0'), t=26500 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('60.0'), t=26500 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=26500 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=26500, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=26500, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26500 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 15, 2, 4), t=(0, 6625, 2, 13) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 15, 2, 4), t=(0, 6625, 2, 13) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: s=mpc(real='0.0', imag='60.0'), t=1 / f_lineno: 442 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 567 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpf('1.0') / f_lineno: 128 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('0.0'), other=mpf('1.0') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpc(real='0.0', imag='60.0') / f_lineno: 408 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 569 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 15, 2, 4)), prec=53, rnd='n' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 411 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 15, 2, 4), prec=53, rnd='n' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 15, 2, 4), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15, exp=2, bc=4, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 15, 2, 4, 53, 'n') / result: (0, 15, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 15, 2, 4, 53, 'n') / result: (0, 15, 2, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('60.0'), other=mpf('+inf') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 570 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 15, 2, 4), t=(0, 0, -456, -2) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: isnan / f_locals: x=mpf('60.0') / f_lineno: 318 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 576 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='60.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='60.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('0.0'), t=106 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=106 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=106 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=106, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 53, 1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _hurwitz / f_locals: s=mpc(real='0.0', imag='60.0'), a=1, d=0, kwargs={} / f_lineno: 582 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 580 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 584 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _convert_param / f_locals: x=1 / f_lineno: 1060 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 590 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='60.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='60.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=0 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=0 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=0 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 603 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _hurwitz_em / f_locals: s=mpc(real='0.0', imag='60.0'), a=1, d=0, prec=63, verbose=None / f_lineno: 660 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 604 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 662 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: isint / f_locals: x=mpc(real='0.0', imag='60.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 670 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __sub__ / f_locals: s=mpc(real='0.0', imag='60.0'), t=1 / f_lineno: 479 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 672 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 482 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_sub_mpf / f_locals: z=((0, 0, 0, 0), (0, 15, 2, 4)), p=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 101 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 487 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1, 0, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __add__ / f_locals: self=mpf('1.0'), other=0 / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=63, rnd='n', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _zetasum / f_locals: s=mpc(real='0.0', imag='60.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 725 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='60.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='60.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='60.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=63, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=31.5 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=31.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8866461766385664, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8866461766385664 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8866461766385664, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 63, -1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _zetasum_fast / f_locals: s=mpc(real='0.0', imag='60.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 1291 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 741 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: isint / f_locals: x=mpf('1.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: __int__ / f_locals: s=mpf('1.0') / f_lineno: 143 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1294 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_zetasum / f_locals: s=((0, 0, 0, 0), (0, 15, 2, 4)), a=1, n=20, derivatives=[0], reflect=False, prec=63 / f_lineno: 1338 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1351 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 2, 4), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1352 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: zetasum_sieved / f_locals: critical_line=False, sre=0, sim=566683977944357425643520, a=1, n=20, wp=73 / f_lineno: 1278 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1356 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: primesieve / f_locals: n=21 / f_lineno: 1251 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1281 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: list_primes / f_locals: n=21 / f_lineno: 390 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1260 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1286 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1287 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-392795401580625581868660, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7769898373207002823821, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-622565981960999105699040, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=535595744962692711486, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-912042678472618394415240, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7773936236182355619346, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1102716103988962435613580, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9965284771683632976645, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1358848831883350745811300, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6040338329708431659376, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1683626920512664400455659300145963742062968176924653730365589900464502249554980458898528770338649866096208868126231365681152, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1683626920512664400455659300145963742062968176924653730365589900464502249554980458898528770338649866096208868126231365681152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2849627400900566851408053276489812074753097678152015971675185231978277333569560934758896352399400583571232767879842545895158653342590530377293635456790418738200152971484314220255869395447413529541909500787558138570720150702428937030689178598371328711612596314199567 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2849627400900566851408053276489812074753097678152015971675185231978277333569560934758896352399400583571232767879842545895158653342590530377293635456790418738200152971484314220255869395447413529541909500787558138570720150702428937030689178598371328711612596314199567 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1453515705112127234236740, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=387976201783628721154, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1605536608174811899818900, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11560343490660386532227, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1668566393528461439141640, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7873565537578637534299, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 16918196986527995569265, -73, 74, 63, 'n') / result: (0, 8260838372328122837, -62, 63)

[2]libmpf._normalize. / x: (0, 6569500005001291309126, -73, 73, 63, 'n') / result: (0, 801940918579259193, -60, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (0, 8260838372328122837, -62, 63, 63, 'n') / result: (0, 8260838372328122837, -62, 63)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[2]libmpf._normalize. / x: (0, 29894728251118529325738970, -83, 85, 63, 'n') / result: (0, 1781864658064754565, -59, 61)

[3]libmpf._normalize1 / x: (0, 763879266319838071703, -71, 70, 63, 'n') / result: (0, 5967806768123734935, -64, 63)

[3]libmpf._normalize1 / x: (0, 858612087794480947945, -74, 70, 63, 'n') / result: (0, 3353953467947191203, -66, 62)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (1, 54738882295749260239995, -68, 76, 73, 'd') / result: (1, 6842360286968657529999, -65, 73)

[2]libmpf._normalize. / x: (1, 9845197608300751750415245885, -93, 93, 63, 'n') / result: (1, 1146131848020100937, -60, 60)

[2]libmpf._normalize. / x: (0, 1073218835525189822068278438, -93, 90, 63, 'n') / result: (0, 3998051716108582251, -65, 62)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[2]libmpf._normalize1 / x: (1, 3649258819716617349333, -70, 72, 73, 'd') / result: (1, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (0, 54738882295749260239995, -68, 76, 73, 'd') / result: (0, 6842360286968657529999, -65, 73)

[2]libmpf._normalize. / x: (0, 3516875111606193962782702, -86, 82, 67, 'n') / result: (0, 107326510974310118493, -71, 67)

[2]libmpf._normalize. / x: (1, 157523161732812028006643934177, -97, 97, 67, 'n') / result: (1, 146704876546572919941, -67, 67)

[2]libmpf._normalize. / x: (1, 17171501368403037153092455080, -97, 94, 67, 'n') / result: (1, 127937654915474632033, -70, 67)

[3]libmpf._normalize1 / x: (1, 15745322542660569609369334170780712568913, -138, 134, 63, 'n') / result: (1, 6668403479389678179, -67, 63)

[3]libmpf._normalize1 / x: (1, 13731102124313188970048727465407803486269, -141, 134, 63, 'n') / result: (1, 5815347950703392365, -70, 63)

[3]libmpf._normalize1 / x: (0, 100567026219330241833, -68, 67, 63, 'n') / result: (0, 6285439138708140115, -64, 63)

[3]libmpf._normalize1 / x: (1, 3195018322156342133555, -70, 72, 63, 'n') / result: (1, 3120135080230802865, -60, 62)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[3]libmpf._normalize1 / x: (0, 2531728932401445055859470364960477518825, -128, 131, 73, 'd') / result: (0, 8783699227692971289239, -70, 73)

[3]libmpf._normalize1 / x: (0, 432541544594553397803, -73, 69, 63, 'n') / result: (0, 6758461634289896841, -67, 63)

[3]libmpf._normalize1 / x: (0, 429433176318708578897, -70, 69, 63, 'n') / result: (0, 6709893379979821545, -64, 63)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (1, 1146131848020100937, -61, 60, 63, 'n') / result: (1, 1146131848020100937, -61, 60)

[2]libmpf._normalize1 / x: (0, 3998051716108582251, -66, 62, 63, 'n') / result: (0, 3998051716108582251, -66, 62)

[3]libmpf._normalize1 / x: (1, 66593976638996563127, -67, 66, 63, 'n') / result: (1, 8324247079874570391, -64, 63)

[3]libmpf._normalize1 / x: (0, 30837625236027868431, -66, 65, 63, 'n') / result: (0, 1927351577251741777, -62, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 3844072886391740627263871153698457211, -126, 122, 63, 'n') / result: (1, 6668403479389678179, -67, 63)

[3]libmpf._normalize1 / x: (0, 13409279418274598603833216717949137953, -131, 124, 63, 'n') / result: (0, 5815347950703392365, -70, 63)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 60, 0, 6, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 87230219260550885475, -68, 67, 63, 'n') / result: (0, 2725944351892215171, -63, 62)

[3]libmpf._normalize1 / x: (0, 100026052190845172685, -65, 67, 63, 'n') / result: (0, 6251628261927823293, -61, 63)

[1]gammazeta.bernoulli_size / n: 2 / result: -3

[3]libmpf._normalize1 / x: (0, 8451004001521529343311354702507, -102, 103, 94, 'd') / result: (0, 16505867190471736998654989653, -93, 94)

[1]libmpf._normalize. / x: (0, 0, -94, 0, 94, 'd') / result: (0, 0, 0, 0)

[2]libmpf._normalize1 / x: (0, 16505867190471736998654989653, -93, 94, 94, 'd') / result: (0, 16505867190471736998654989653, -93, 94)

[3]libmpf._normalize1 / x: (0, 1690200800304305868662270940467, -103, 101, 94, 'd') / result: (0, 6602346876188694799461995861, -95, 93)

[11]gammazeta.bernoulli_size / n: 2 / prec: 63 / result: (0, 6602346876188694799461995861, -95, 93)

[3]libmpf._normalize1 / x: (0, 17997630176379783045796517615247126556123407231, -158, 154, 63, 'n') / result: (0, 908648117297405057, -64, 60)

[3]libmpf._normalize1 / x: (0, 41275418326232123597213999018301431349105390273, -156, 155, 63, 'n') / result: (0, 2083876087309274431, -62, 61)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 908648117297405057, -65, 60, 63, 'n') / result: (1, 908648117297405057, -65, 60)

[2]libmpf._normalize1 / x: (1, 2083876087309274431, -63, 61, 63, 'n') / result: (1, 2083876087309274431, -63, 61)

[3]libmpf._normalize1 / x: (1, 17557142277046545839, -65, 64, 63, 'n') / result: (1, 1097321392315409115, -61, 60)

[2]libmpf._normalize1 / x: (0, 1770827067194209123, -63, 61, 63, 'n') / result: (0, 1770827067194209123, -63, 61)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 225, 4, 8, 63, 'n') / result: (1, 225, 4, 8)

[2]libmpf._normalize1 / x: (0, 15, 2, 4, 63, 'n') / result: (0, 15, 2, 4)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 22365514975370127286203791573149859337, -133, 125, 63, 'n') / result: (1, 4849747985010675039, -71, 63)

[3]libmpf._normalize1 / x: (0, 19504406426581234332543410365385365095, -136, 124, 63, 'n') / result: (0, 528667995518490215, -71, 59)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 675, 4, 10, 63, 'n') / result: (0, 675, 4, 10)

[2]libmpf._normalize1 / x: (0, 26985, 3, 15, 63, 'n') / result: (0, 26985, 3, 15)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 16265829072996456207233497471032481917, -137, 124, 63, 'n') / result: (1, 3527089443644127301, -75, 62)

[3]libmpf._normalize1 / x: (0, 1773127856961930393867582760489578645, -137, 121, 63, 'n') / result: (0, 6151773038760613411, -79, 63)

[2]libmpf._normalize. / x: (0, 10800, 0, 14, 63, 'n') / result: (0, 675, 4, 10)

[2]libmpf._normalize. / x: (0, 215880, 0, 18, 63, 'n') / result: (0, 26985, 3, 15)

[3]libmpf._normalize1 / x: (1, 242190727433668302597435, -76, 78, 63, 'n') / result: (1, 1847768611401888295, -59, 61)

[3]libmpf._normalize1 / x: (1, 757275622292730787687455, -75, 80, 63, 'n') / result: (1, 2888777245684550429, -57, 62)

[1]gammazeta.bernoulli_size / n: 4 / result: -5

[3]libmpf._normalize1 / x: (1, 11831405602130141080635896583509, -103, 104, 94, 'd') / result: (1, 11554107033330215899058492757, -93, 94)

[1]libmpf._normalize. / x: (0, 0, -94, 0, 94, 'd') / result: (0, 0, 0, 0)

[2]libmpf._normalize1 / x: (1, 11554107033330215899058492757, -93, 94, 94, 'd') / result: (1, 11554107033330215899058492757, -93, 94)

[3]libmpf._normalize1 / x: (1, 1352160640243444694929816752363, -105, 101, 94, 'd') / result: (1, 10563755001901911679139193377, -98, 94)

[11]gammazeta.bernoulli_size / n: 4 / prec: 63 / result: (1, 10563755001901911679139193377, -98, 94)

[3]libmpf._normalize1 / x: (0, 19519374911054047188119786063849526840957822215, -157, 154, 63, 'n') / result: (0, 7883812741981390059, -66, 63)

[3]libmpf._normalize1 / x: (0, 30516335078480597199099892471007151541939308733, -155, 155, 63, 'n') / result: (0, 3081362395396853791, -62, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize. / x: (1, 336376010324539309184, -76, 69, 63, 'n') / result: (1, 2627937580660463353, -69, 62)

[3]libmpf._normalize1 / x: (1, 525885848814396380331, -74, 69, 63, 'n') / result: (1, 8216966387724943443, -68, 63)

[3]libmpf._normalize1 / x: (1, 283542214013405196793, -69, 68, 63, 'n') / result: (1, 553793386744932025, -60, 59)

[3]libmpf._normalize1 / x: (0, 48449499762489748493, -68, 66, 63, 'n') / result: (0, 3028093735155609281, -64, 62)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 807525, 4, 20, 63, 'n') / result: (0, 807525, 4, 20)

[2]libmpf._normalize1 / x: (1, 161955, 3, 18, 63, 'n') / result: (1, 161955, 3, 18)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11829693871270149968592184209119333103, -141, 124, 63, 'n') / result: (1, 5130311918027821529, -80, 63)

[3]libmpf._normalize1 / x: (0, 20632760517375190038036776982783023433, -145, 124, 63, 'n') / result: (0, 4474016755462264299, -83, 62)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 4044375, 5, 22, 63, 'n') / result: (1, 4044375, 5, 22)

[2]libmpf._normalize1 / x: (1, 24063795, 5, 25, 63, 'n') / result: (1, 24063795, 5, 25)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 17206827449120218137048800704522809387, -146, 124, 63, 'n') / result: (1, 3731135940383870203, -84, 62)

[3]libmpf._normalize1 / x: (0, 15005644012636501846149833575473761697, -149, 124, 63, 'n') / result: (0, 6507660735217838981, -88, 63)

[2]libmpf._normalize. / x: (1, 129420000, 0, 27, 63, 'n') / result: (1, 4044375, 5, 22)

[2]libmpf._normalize. / x: (1, 770041440, 0, 30, 63, 'n') / result: (1, 24063795, 5, 25)

[3]libmpf._normalize1 / x: (0, 398040820564071598417922895, -83, 89, 63, 'n') / result: (0, 2965635214478310931, -56, 62)

[3]libmpf._normalize1 / x: (0, 1410245225798478134416824285, -83, 91, 63, 'n') / result: (0, 5253572858119301999, -55, 63)

[1]gammazeta.bernoulli_size / n: 6 / result: -5

[2]libmpf._normalize. / x: (0, 7605903601369376408980219232256, -101, 103, 94, 'd') / result: (0, 3, 0, 2)

[2]libmpf._normalize. / x: (0, 19807040628566084398385987584, -94, 95, 94, 'd') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 2, 0, 2, 94, 'd') / result: (0, 1, 1, 1)

[3]libmpf._normalize1 / x: (0, 965829028745317639235583394573, -105, 100, 94, 'd') / result: (0, 3772769643536397028263997635, -97, 92)

[11]gammazeta.bernoulli_size / n: 6 / prec: 63 / result: (0, 3772769643536397028263997635, -97, 92)

[3]libmpf._normalize1 / x: (0, 11188658510986323478353096869743304912578648185, -153, 153, 63, 'n') / result: (0, 2259531591983474995, -61, 61)

[3]libmpf._normalize1 / x: (0, 19820520199219249523040006428541745247586772365, -152, 154, 63, 'n') / result: (0, 4002722177614706285, -60, 62)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (1, 822670346734605651513, -79, 70, 63, 'n') / result: (1, 1606778020966026663, -70, 61)

[3]libmpf._normalize1 / x: (1, 728673335089326086371, -77, 70, 63, 'n') / result: (1, 2846380215192680025, -69, 62)

[3]libmpf._normalize1 / x: (1, 568691206047776420263, -70, 69, 63, 'n') / result: (1, 8885800094496506567, -64, 63)

[3]libmpf._normalize1 / x: (0, 94052619309786816967, -69, 67, 63, 'n') / result: (0, 1469572176715419015, -63, 61)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 1423605825, 5, 31, 63, 'n') / result: (1, 1423605825, 5, 31)

[2]libmpf._normalize1 / x: (0, 362981475, 5, 29, 63, 'n') / result: (0, 362981475, 5, 29)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12514056326632885918158578100375424209, -150, 124, 63, 'n') / result: (1, 5427106822376538477, -89, 63)

[3]libmpf._normalize1 / x: (0, 21826391291107639051079546498473684143, -154, 125, 63, 'n') / result: (0, 4732844171067519259, -92, 63)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 15160261725, 6, 34, 63, 'n') / result: (0, 15160261725, 6, 34)

[2]libmpf._normalize1 / x: (0, 41619230325, 6, 36, 63, 'n') / result: (0, 41619230325, 6, 36)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 18202263747829652244289390558005417831, -155, 124, 63, 'n') / result: (1, 7893973559820419603, -94, 63)

[3]libmpf._normalize1 / x: (0, 15873739120805555673817302314157878577, -158, 124, 63, 'n') / result: (0, 6884136976098209831, -97, 63)

[2]libmpf._normalize. / x: (0, 970256750400, 0, 40, 63, 'n') / result: (0, 15160261725, 6, 34)

[2]libmpf._normalize. / x: (0, 2663630740800, 0, 42, 63, 'n') / result: (0, 41619230325, 6, 36)

[3]libmpf._normalize1 / x: (1, 1243910124133940456222973086475, -91, 100, 63, 'n') / result: (1, 2262659334763048639, -52, 61)

[3]libmpf._normalize1 / x: (1, 2523963511816610742421288469325, -91, 101, 63, 'n') / result: (1, 9182125765861604095, -53, 63)

[1]gammazeta.bernoulli_size / n: 8 / result: -4

[3]libmpf._normalize1 / x: (0, 18592208803347364555284980345515, -102, 104, 94, 'd') / result: (0, 9078226954759455349260244309, -91, 93)

[2]libmpf._normalize. / x: (0, 181564539095189106985204886177, -94, 98, 94, 'd') / result: (0, 5673891846724659593287652693, -89, 93)

[2]libmpf._normalize1 / x: (1, 13617340432139183023890366463, -91, 94, 94, 'd') / result: (1, 13617340432139183023890366463, -91, 94)

[3]libmpf._normalize1 / x: (1, 1352160640243444694929816752301, -105, 101, 94, 'd') / result: (1, 10563755001901911679139193377, -98, 94)

[11]gammazeta.bernoulli_size / n: 8 / prec: 63 / result: (1, 10563755001901911679139193377, -98, 94)

[3]libmpf._normalize1 / x: (0, 23902178865203207090178605097965397115877663903, -150, 155, 63, 'n') / result: (0, 4827006580827837097, -58, 63)

[3]libmpf._normalize1 / x: (0, 96997726987212941799993820419343713493620078815, -151, 157, 63, 'n') / result: (0, 4897133741792855517, -57, 63)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (1, 502131275049417669823, -80, 69, 63, 'n') / result: (1, 7845801172647151091, -74, 63)

[3]libmpf._normalize1 / x: (1, 509426280797042189147, -79, 69, 63, 'n') / result: (1, 7959785637453784205, -73, 63)

[3]libmpf._normalize1 / x: (1, 9106905097937069875699, -74, 73, 63, 'n') / result: (1, 1111682751213021225, -61, 60)

[3]libmpf._normalize1 / x: (0, 1496882123319135287155, -73, 71, 63, 'n') / result: (0, 5847195794215372215, -65, 63)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 2391031987425, 6, 42, 63, 'n') / result: (0, 2391031987425, 6, 42)

[2]libmpf._normalize1 / x: (1, 1200950315775, 6, 41, 63, 'n') / result: (1, 1200950315775, 6, 41)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 26476019996843130537453109308730352409, -160, 125, 63, 'n') / result: (1, 5741071679869396075, -98, 63)

[3]libmpf._normalize1 / x: (0, 23089075084808080979183179692971316693, -163, 125, 63, 'n') / result: (0, 2503322536762985393, -100, 62)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 22796318711475, 8, 45, 63, 'n') / result: (1, 22796318711475, 8, 45)

[2]libmpf._normalize1 / x: (1, 33463579179825, 8, 45, 63, 'n') / result: (1, 33463579179825, 8, 45)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19255287270431367663907166176162728225, -164, 124, 63, 'n') / result: (1, 4175324858086833509, -102, 62)

[3]libmpf._normalize1 / x: (0, 8396027303566574901216251391267097779, -166, 123, 63, 'n') / result: (0, 7282392834219593871, -106, 63)

[2]libmpf._normalize. / x: (1, 5835857590137600, 0, 53, 63, 'n') / result: (1, 22796318711475, 8, 45)

[2]libmpf._normalize. / x: (1, 8566676270035200, 0, 53, 63, 'n') / result: (1, 33463579179825, 8, 45)

[3]libmpf._normalize1 / x: (0, 1766607508248762881328458501904975, -98, 111, 63, 'n') / result: (0, 6276250659627048667, -50, 63)

[3]libmpf._normalize1 / x: (0, 2069529275810253768059184220725075, -98, 111, 63, 'n') / result: (0, 7352444966849183203, -50, 63)

[1]gammazeta.bernoulli_size / n: 10 / result: -3

[3]libmpf._normalize1 / x: (1, 21972610403955976292609522226517, -103, 105, 94, 'd') / result: (1, 5364406836903314524562871637, -91, 93)

[2]libmpf._normalize. / x: (1, 472067801647491678161532704035, -94, 99, 94, 'd') / result: (1, 14752118801484114942547897001, -89, 94)

[3]libmpf._normalize1 / x: (0, 53644068369033145245628716367, -91, 96, 94, 'd') / result: (0, 13411017092258286311407179091, -89, 94)

[3]libmpf._normalize1 / x: (0, 1536546182094823516965700854733, -104, 101, 94, 'd') / result: (0, 12004267047615808726294537927, -97, 94)

[11]gammazeta.bernoulli_size / n: 10 / prec: 63 / result: (0, 12004267047615808726294537927, -97, 94)

[3]libmpf._normalize1 / x: (0, 75341788975937963547743562682384201749506293309, -147, 156, 63, 'n') / result: (0, 3803788278561847677, -53, 62)

[3]libmpf._normalize1 / x: (0, 88260712834956357112824893182297371520254840181, -147, 156, 63, 'n') / result: (0, 69625425822435447, -47, 56)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (1, 562759943277780316015, -82, 69, 63, 'n') / result: (1, 4396562056857658719, -75, 62)

[3]libmpf._normalize1 / x: (1, 659256893468770167407, -82, 70, 63, 'n') / result: (1, 5150444480224766933, -75, 63)

[3]libmpf._normalize1 / x: (1, 18218206757930997409119, -75, 74, 63, 'n') / result: (1, 8895608768520994829, -64, 63)

[3]libmpf._normalize1 / x: (0, 5982378048796316381227, -75, 73, 63, 'n') / result: (0, 1460541515819413179, -63, 61)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 1802647882386225, 8, 51, 63, 'n') / result: (1, 1802647882386225, 8, 51)

[2]libmpf._normalize1 / x: (0, 1668951335306925, 8, 51, 63, 'n') / result: (0, 1668951335306925, 8, 51)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 14003845287586449209809397812850421327, -168, 124, 63, 'n') / result: (1, 6073199793580848741, -107, 63)

[3]libmpf._normalize1 / x: (0, 24424806701284581532335437441843916813, -172, 125, 63, 'n') / result: (0, 662035712201781261, -107, 60)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 59081779471138875, 9, 56, 63, 'n') / result: (0, 59081779471138875, 9, 56)

[2]libmpf._normalize1 / x: (0, 45734679795052125, 9, 56, 63, 'n') / result: (0, 45734679795052125, 9, 56)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 20369229509216653398220730843748825423, -173, 124, 63, 'n') / result: (1, 8833745154299416351, -112, 63)

[3]libmpf._normalize1 / x: (0, 2220436972844052866575948858349446983, -173, 121, 63, 'n') / result: (0, 7703688287438909219, -115, 63)

[2]libmpf._normalize. / x: (0, 30249871089223104000, 0, 65, 63, 'n') / result: (0, 59081779471138875, 9, 56)

[2]libmpf._normalize. / x: (0, 23416156055066688000, 0, 65, 63, 'n') / result: (0, 45734679795052125, 9, 56)

[3]libmpf._normalize1 / x: (1, 4527632781951390154203796177382001375, -106, 122, 63, 'n') / result: (1, 981773859681657079, -44, 60)

[3]libmpf._normalize1 / x: (1, 2776920435670955923103656559311578375, -106, 122, 63, 'n') / result: (1, 2408594535339075099, -46, 62)

[1]gammazeta.bernoulli_size / n: 12 / result: -1

[2]libmpf._normalize. / x: (0, 12676506002282294014967032053760, -101, 104, 94, 'd') / result: (0, 5, 0, 3)

[2]libmpf._normalize. / x: (0, 2380146048866024475206049507980, -94, 101, 94, 'd') / result: (0, 18594891006765816212547261781, -87, 94)

[2]libmpf._normalize1 / x: (1, 17821178482212453540735309141, -87, 94, 94, 'd') / result: (1, 17821178482212453540735309141, -87, 94)

[3]libmpf._normalize1 / x: (1, 1283438190121181709061131010841, -102, 101, 94, 'd') / result: (1, 5013430430160866051020043011, -94, 93)

[11]gammazeta.bernoulli_size / n: 12 / prec: 63 / result: (1, 5013430430160866051020043011, -94, 93)

[3]libmpf._normalize1 / x: (0, 4922054943664503796485207965704036938332624869, -138, 152, 63, 'n') / result: (0, 994001079912124603, -46, 60)

[3]libmpf._normalize1 / x: (0, 12075321137388090560790315013934905019939083089, -140, 154, 63, 'n') / result: (0, 4877183366796486135, -49, 63)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (1, 570413410615581439229, -84, 69, 63, 'n') / result: (1, 2228177385217114997, -76, 61)

[3]libmpf._normalize1 / x: (1, 349850072433763565509, -84, 69, 63, 'n') / result: (1, 5466407381777555711, -78, 63)

[3]libmpf._normalize1 / x: (1, 36438641693247211934581, -76, 75, 63, 'n') / result: (1, 8896152757140432601, -64, 63)

[3]libmpf._normalize1 / x: (0, 47853557982988753493761, -78, 76, 63, 'n') / result: (0, 5841498777220306823, -65, 63)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 2094181213520599875, 9, 61, 63, 'n') / result: (0, 2094181213520599875, 9, 61)

[2]libmpf._normalize1 / x: (1, 4047988246013905875, 9, 62, 63, 'n') / result: (1, 4047988246013905875, 9, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 29627970195224223126209223712701560253, -178, 125, 63, 'n') / result: (1, 803067741299946941, -113, 60)

[3]libmpf._normalize1 / x: (0, 25837812047639887902279582485152400457, -181, 125, 63, 'n') / result: (0, 2801341195432330625, -118, 62)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (1, 67002367330770387750, 11, 66, 63, 'n') / result: (1, 8375295916346298469, 14, 63)

[2]libmpf._normalize. / x: (1, 19268753464767280500, 11, 65, 63, 'n') / result: (1, 4817188366191820125, 13, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 2693451835929474829655383973881960023, -179, 122, 63, 'n') / result: (1, 4672394131199691293, -120, 63)

[3]libmpf._normalize1 / x: (0, 9395568017323595600524034224787491875, -184, 123, 63, 'n') / result: (0, 8149356204894052727, -124, 63)

[2]libmpf._normalize. / x: (1, 137220848293417754116096, 0, 77, 63, 'n') / result: (1, 8375295916346298469, 14, 63)

[2]libmpf._normalize. / x: (1, 39462407095843390464000, 0, 76, 63, 'n') / result: (1, 4817188366191820125, 13, 63)

[3]libmpf._normalize1 / x: (0, 1291502855473278692814513600601082704219, -111, 130, 63, 'n') / result: (0, 1093945470058875945, -41, 60)

[3]libmpf._normalize1 / x: (0, 111809151464924189371594483675711998037, -110, 127, 63, 'n') / result: (0, 6061186246101581337, -46, 63)

[1]gammazeta.bernoulli_size / n: 14 / result: 0

[3]libmpf._normalize1 / x: (0, 28733413605173199767258605988523, -102, 105, 94, 'd') / result: (0, 14029987111900976448856741205, -91, 94)

[2]libmpf._normalize. / x: (1, 15601345668433885811128696218632, -94, 104, 94, 'd') / result: (1, 15235689129329966612430367401, -84, 94)

[3]libmpf._normalize1 / x: (0, 1964198195666136702839943768533, -91, 101, 94, 'd') / result: (0, 15345298403641692990937060691, -84, 94)

[3]libmpf._normalize1 / x: (0, 1478925700266267635079487072713, -100, 101, 94, 'd') / result: (0, 11554107033330215899058492755, -93, 94)

[11]gammazeta.bernoulli_size / n: 14 / prec: 63 / result: (0, 11554107033330215899058492755, -93, 94)

[3]libmpf._normalize1 / x: (0, 12639563049686987667115478372471163221226278475, -134, 154, 63, 'n') / result: (0, 2552539430137377205, -42, 62)

[3]libmpf._normalize1 / x: (0, 70031594636406649823870647529621666465257713435, -139, 156, 63, 'n') / result: (0, 3535691976892589113, -45, 62)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (1, 515090946640215135021, -86, 69, 63, 'n') / result: (1, 8048296041253361485, -80, 63)

[3]libmpf._normalize1 / x: (1, 713486697170355003967, -89, 70, 63, 'n') / result: (1, 1393528705410849617, -80, 61)

[3]libmpf._normalize1 / x: (1, 583026315387996644300621, -80, 79, 63, 'n') / result: (1, 556017222774502415, -60, 59)

[3]libmpf._normalize1 / x: (0, 191412838403249603126447, -80, 78, 63, 'n') / result: (0, 5841456250099170017, -65, 63)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 35636804073252723653, 14, 65, 63, 'n') / result: (1, 8909201018313180913, 16, 63)

[3]libmpf._normalize1 / x: (0, 1067658958722049477905, 13, 70, 63, 'n') / result: (0, 4170542807508005773, 21, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 15670992499953308099508238260045295479, -186, 124, 63, 'n') / result: (1, 3398104822690684577, -124, 62)

[3]libmpf._normalize1 / x: (0, 27332561504941369018791566799032560581, -190, 125, 63, 'n') / result: (0, 5926804512650220165, -128, 63)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 4066085502335877808471, 17, 72, 63, 'n') / result: (0, 7941573246749761345, 26, 63)

[3]libmpf._normalize1 / x: (1, 333462779166198932881, 18, 69, 63, 'n') / result: (1, 2605177962235929163, 25, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11397085454511496800557069680382176131, -190, 124, 63, 'n') / result: (1, 4942697923913723021, -129, 63)

[3]libmpf._normalize1 / x: (0, 19878226549048268376998052811301208495, -194, 124, 63, 'n') / result: (0, 8620806563854865695, -133, 63)

[2]libmpf._normalize. / x: (0, 532949958962168176134062080, 0, 89, 63, 'n') / result: (0, 7941573246749761345, 26, 63)

[2]libmpf._normalize. / x: (1, 87415266781744053056700416, 0, 87, 63, 'n') / result: (1, 2605177962235929163, 25, 62)

[3]libmpf._normalize1 / x: (1, 1233630787901348384822006019562938780555, -108, 130, 63, 'n') / result: (1, 8359407376797790363, -41, 63)

[3]libmpf._normalize1 / x: (0, 171475628415869024257292372926744451159, -107, 128, 63, 'n') / result: (0, 1161964055355014333, -40, 61)

[1]gammazeta.bernoulli_size / n: 16 / result: 2

[3]libmpf._normalize1 / x: (1, 32113815205781811504583147869525, -103, 105, 94, 'd') / result: (1, 7840286915474075074361120085, -91, 93)

[2]libmpf._normalize. / x: (0, 34014300754092727302608283370492, -92, 105, 94, 'd') / result: (0, 259508520157567804737917201, -75, 88)

[3]libmpf._normalize1 / x: (1, 17014990663961837726378502804821, -91, 104, 94, 'd') / result: (1, 16616201820275232154666506645, -81, 94)

[3]libmpf._normalize1 / x: (1, 1123797112996447486571954777593, -97, 100, 94, 'd') / result: (1, 17559329890569491977686793399, -91, 94)

[11]gammazeta.bernoulli_size / n: 16 / prec: 63 / result: (1, 17559329890569491977686793399, -91, 94)

[3]libmpf._normalize1 / x: (0, 146785591818852548246281993438993045830094213837, -132, 157, 63, 'n') / result: (0, 7410778549479805819, -38, 63)

[3]libmpf._normalize1 / x: (1, 20403310168962646946710407162456600786454787867, -131, 154, 63, 'n') / result: (1, 8240831349449189887, -40, 63)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (1, 797579569756718438733, -89, 70, 63, 'n') / result: (1, 6231090388724362803, -82, 63)

[3]libmpf._normalize1 / x: (0, 886913389497076454181, -91, 70, 63, 'n') / result: (0, 3464505427722954899, -83, 62)

[3]libmpf._normalize1 / x: (1, 2332111492642375301606963, -82, 81, 63, 'n') / result: (1, 8896299334115506369, -64, 63)

[3]libmpf._normalize1 / x: (0, 1531306171731424547891347, -83, 81, 63, 'n') / result: (0, 5841469466138551895, -65, 63)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 197278937568324295065, 26, 68, 63, 'n') / result: (1, 6164966799010134221, 31, 63)

[3]libmpf._normalize1 / x: (1, 913911120176432423955, 25, 70, 63, 'n') / result: (1, 892491328297297289, 35, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 16577578842925813527778105583469784263, -195, 124, 63, 'n') / result: (1, 3594689399209980379, -133, 62)

[3]libmpf._normalize1 / x: (0, 28913784071342935822612601120050481085, -199, 125, 63, 'n') / result: (0, 6269677500985356869, -137, 63)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 47384512898827703119, 35, 66, 63, 'n') / result: (1, 2961532056176731445, 39, 62)

[3]libmpf._normalize1 / x: (0, 149593946996179039811, 33, 68, 63, 'n') / result: (0, 2337405421815297497, 39, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12056420976673318929598072557791405937, -199, 124, 63, 'n') / result: (1, 326789945382725489, -134, 59)

[3]libmpf._normalize1 / x: (0, 21028206597340316961595168681132423407, -203, 124, 63, 'n') / result: (0, 4559765455262077723, -141, 62)

[2]libmpf._normalize. / x: (1, 1628119465898841133113577308160, 0, 101, 63, 'n') / result: (1, 2961532056176731445, 39, 62)

[2]libmpf._normalize. / x: (0, 1285002220056292825872084238336, 0, 101, 63, 'n') / result: (0, 2337405421815297497, 39, 62)

[3]libmpf._normalize1 / x: (0, 113220238560223973490288374997209246109, -102, 127, 63, 'n') / result: (0, 6137681430816095635, -38, 63)

[3]libmpf._normalize1 / x: (1, 111275487101341291284721207741822631959, -102, 127, 63, 'n') / result: (1, 6032256242982847725, -38, 63)

[1]gammazeta.bernoulli_size / n: 18 / result: 5

[2]libmpf._normalize. / x: (0, 17747108403195211620953844875264, -101, 104, 94, 'd') / result: (0, 7, 0, 3)

[2]libmpf._normalize. / x: (1, 45249596962638981601537755008671, -89, 106, 94, 'd') / result: (1, 2761816220864195654390732117, -75, 92)

[2]libmpf._normalize1 / x: (0, 2762080673387236354522699093, -75, 92, 94, 'd') / result: (0, 2762080673387236354522699093, -75, 92)

[3]libmpf._normalize1 / x: (0, 1088816354954020581834584106821, -94, 100, 94, 'd') / result: (0, 17012755546156571591165376669, -88, 94)

[11]gammazeta.bernoulli_size / n: 18 / prec: 63 / result: (0, 17012755546156571591165376669, -88, 94)

[3]libmpf._normalize1 / x: (0, 104418873802658732868101703542391625132701739815, -126, 157, 63, 'n') / result: (0, 5271805907847933647, -32, 63)

[3]libmpf._normalize1 / x: (1, 102625300853644046174648334348032938455894728025, -126, 157, 63, 'n') / result: (1, 5181253614718996341, -32, 63)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (1, 474666012844074588593, -91, 69, 63, 'n') / result: (1, 7416656450688665447, -85, 63)

[3]libmpf._normalize1 / x: (0, 466512811325518152765, -91, 69, 63, 'n') / result: (0, 7289262676961221137, -85, 63)

[3]libmpf._normalize1 / x: (1, 18656899357795453101426535, -85, 84, 63, 'n') / result: (1, 2224075717663222921, -62, 61)

[3]libmpf._normalize1 / x: (0, 6125231976188375153072657, -85, 83, 63, 'n') / result: (0, 1460369104430288113, -63, 61)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 190590370263922284385, 39, 68, 63, 'n') / result: (0, 5955949070747571387, 44, 63)

[3]libmpf._normalize1 / x: (0, 137956031199743829251, 39, 67, 63, 'n') / result: (0, 538890746873999333, 47, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1096038270606665357236188414344673267, -200, 120, 63, 'n') / result: (1, 7605293274361611381, -143, 63)

[3]libmpf._normalize1 / x: (0, 15293241161702048699646845719727870769, -207, 124, 63, 'n') / result: (0, 6632386116744840325, -146, 63)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 75730237613031697437, 45, 67, 63, 'n') / result: (0, 2366569925407240545, 50, 62)

[3]libmpf._normalize1 / x: (1, 108739302948677546793, 46, 67, 63, 'n') / result: (1, 6796206434292346675, 50, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 25507799752300575588721991667987881343, -209, 125, 63, 'n') / result: (1, 2765561190676949593, -146, 62)

[3]libmpf._normalize1 / x: (0, 22244714417021161747075200526479660975, -212, 125, 63, 'n') / result: (0, 1205888384862698241, -148, 61)

[2]libmpf._normalize. / x: (0, 2664520858552567758161239426990080, 0, 112, 63, 'n') / result: (0, 2366569925407240545, 50, 62)

[2]libmpf._normalize. / x: (1, 7651848191252994948391066874675200, 0, 113, 63, 'n') / result: (1, 6796206434292346675, 50, 63)

[3]libmpf._normalize1 / x: (1, 17984109362675756324407268828478694065, -98, 124, 63, 'n') / result: (1, 3899682088245991115, -36, 62)

[3]libmpf._normalize1 / x: (0, 78035118219045526586736571205459994445, -98, 126, 63, 'n') / result: (0, 1057573058790654095, -32, 60)

[1]gammazeta.bernoulli_size / n: 20 / result: 9

[3]libmpf._normalize1 / x: (0, 38874618406999034979232231631531, -102, 105, 94, 'd') / result: (0, 18981747269042497548453238101, -91, 94)

[2]libmpf._normalize. / x: (0, 36251785819118980001572285991313, -85, 105, 94, 'd') / result: (0, 17701067294491689453892717769, -74, 94)

[3]libmpf._normalize1 / x: (1, 2320095310676345677603077850180267, -91, 111, 94, 'd') / result: (1, 8850461237626440725719748879, -73, 93)

[3]libmpf._normalize1 / x: (1, 1310048170907027485941884726221, -91, 101, 94, 'd') / result: (1, 10234751335211152233920974423, -84, 94)

[11]gammazeta.bernoulli_size / n: 20 / prec: 63 / result: (1, 10234751335211152233920974423, -84, 94)

[3]libmpf._normalize1 / x: (0, 39912276459574671957159140063336196544200251645, -120, 155, 63, 'n') / result: (0, 4030110020778413557, -27, 62)

[3]libmpf._normalize1 / x: (1, 10823997275540989398222751454289911867935212185, -116, 153, 63, 'n') / result: (1, 8743555367826463171, -26, 63)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (1, 977826913108211942701, -96, 70, 63, 'n') / result: (1, 3819636379328952901, -88, 62)

[3]libmpf._normalize1 / x: (0, 1060725850018000296533, -94, 70, 63, 'n') / result: (0, 8286920703265627317, -87, 63)

[3]libmpf._normalize1 / x: (1, 149255198682000004136024645, -88, 87, 63, 'n') / result: (1, 8896303098320961245, -64, 63)

[3]libmpf._normalize1 / x: (0, 24500936191674203879660725, -87, 85, 63, 'n') / result: (0, 1460369598369252913, -63, 61)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 452737214640278370855, 50, 69, 63, 'n') / result: (1, 7074018978754349545, 56, 63)

[3]libmpf._normalize1 / x: (1, 12866273272879845875, 50, 64, 63, 'n') / result: (1, 3216568318219961469, 52, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 9275563546291118395594001200364030379, -212, 123, 63, 'n') / result: (1, 8045268918332944271, -152, 63)

[3]libmpf._normalize1 / x: (0, 4044493530367483954318577683718773923, -214, 122, 63, 'n') / result: (0, 3508038937782394883, -154, 62)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 517672993527048541565, 54, 69, 63, 'n') / result: (0, 4044320261930066731, 61, 62)

[3]libmpf._normalize1 / x: (0, 1713847396492143698145, 54, 71, 63, 'n') / result: (0, 6694716392547436321, 62, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 26983457589210526243252527795580448013, -218, 125, 63, 'n') / result: (1, 5851104667878504925, -156, 63)

[3]libmpf._normalize1 / x: (0, 11765799361069044231049858122449814249, -220, 124, 63, 'n') / result: (0, 5102602091319847103, -159, 63)

[2]libmpf._normalize. / x: (0, 9325567602992739998505344686371110912, 0, 123, 63, 'n') / result: (0, 4044320261930066731, 61, 62)

[2]libmpf._normalize. / x: (0, 30873929984847652290186349807805661184, 0, 125, 63, 'n') / result: (0, 6694716392547436321, 62, 63)

[3]libmpf._normalize1 / x: (1, 128815438517304335614820404331397428763, -97, 127, 63, 'n') / result: (1, 6983098914506714341, -33, 63)

[3]libmpf._normalize1 / x: (1, 606107224326421209667560391824451064507, -98, 129, 63, 'n') / result: (1, 4107142308586655359, -31, 62)

[1]gammazeta.bernoulli_size / n: 22 / result: 12

[3]libmpf._normalize1 / x: (1, 42255020007607646716556773512533, -103, 106, 94, 'd') / result: (1, 10316166994044835624159368533, -91, 94)

[2]libmpf._normalize. / x: (1, 68869542075187368241532816566177, -82, 106, 94, 'd') / result: (1, 8406926522850020537296486397, -69, 93)

[3]libmpf._normalize1 / x: (0, 35261195226328938494829177921514155, -91, 115, 94, 'd') / result: (0, 16813848126568288085379208527, -70, 94)

[3]libmpf._normalize1 / x: (0, 1916369305778746657327672713087, -88, 101, 94, 'd') / result: (0, 7485817600698229130186221535, -80, 93)

[11]gammazeta.bernoulli_size / n: 22 / prec: 63 / result: (0, 7485817600698229130186221535, -80, 93)

[3]libmpf._normalize1 / x: (1, 52274204761631060613110572532391227442387533435, -113, 156, 63, 'n') / result: (1, 329896611903750433, -16, 59)

[3]libmpf._normalize1 / x: (1, 30745318182190342213212008646092858311468956065, -111, 155, 63, 'n') / result: (1, 6208967560322740869, -19, 63)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (0, 354822307564146417409, -96, 69, 63, 'n') / result: (0, 1386024638922446943, -88, 61)

[3]libmpf._normalize1 / x: (0, 417380801637977818861, -95, 69, 63, 'n') / result: (0, 1630393756398350855, -87, 61)

[3]libmpf._normalize1 / x: (1, 149255197295975365212546977, -88, 87, 63, 'n') / result: (1, 556018938481715937, -60, 59)

[3]libmpf._normalize1 / x: (0, 24500937822067960278381063, -87, 85, 63, 'n') / result: (0, 5841478782193174429, -65, 63)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 718435241605160957169, 61, 70, 63, 'n') / result: (0, 2806387662520159989, 69, 62)

[3]libmpf._normalize1 / x: (1, 261918652101398164671, 62, 68, 63, 'n') / result: (1, 4092478939084346323, 68, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19624332792153109997227081512752174775, -222, 124, 63, 'n') / result: (1, 531918606170773175, -157, 59)

[3]libmpf._normalize1 / x: (0, 17113889979736791610324317936266634909, -225, 124, 63, 'n') / result: (0, 463872917392713373, -160, 59)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (1, 92257448373986954724, 70, 67, 63, 'n') / result: (1, 2883045261687092335, 75, 62)

[3]libmpf._normalize1 / x: (1, 123365991421281789787, 69, 67, 63, 'n') / result: (1, 3855187231915055931, 74, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1784030253832100908838825592068379525, -223, 121, 63, 'n') / result: (1, 6189598326350815127, -165, 63)

[3]libmpf._normalize1 / x: (0, 1555808179976071964574937994206057719, -226, 121, 63, 'n') / result: (0, 2698896973921241443, -167, 62)

[2]libmpf._normalize. / x: (1, 108918370499098161020305817001247668961280, 0, 137, 63, 'n') / result: (1, 2883045261687092335, 75, 62)

[2]libmpf._normalize. / x: (1, 72822427876730663695386257073737148923904, 0, 136, 63, 'n') / result: (1, 3855187231915055931, 74, 62)

[3]libmpf._normalize1 / x: (0, 153163890166371948031057692576410160793, -93, 127, 63, 'n') / result: (0, 8303031123235582761, -29, 63)

[3]libmpf._normalize1 / x: (0, 39943078744415656772960129099122097069, -92, 125, 63, 'n') / result: (0, 2165318637522751489, -28, 61)

[1]gammazeta.bernoulli_size / n: 24 / result: 16

[2]libmpf._normalize. / x: (0, 22817710804108129226940657696768, -101, 105, 94, 'd') / result: (0, 9, 0, 4)

[2]libmpf._normalize. / x: (0, 76539284623558574985104611559434, -78, 106, 94, 'd') / result: (0, 4671587196262120055243201389, -64, 92)

[2]libmpf._normalize1 / x: (1, 4671587030241423391857236845, -64, 92, 94, 'd') / result: (1, 4671587030241423391857236845, -64, 92)

[3]libmpf._normalize1 / x: (1, 1674705655323907957107724438285, -84, 101, 94, 'd') / result: (1, 6541818966109015457452048587, -76, 93)

[11]gammazeta.bernoulli_size / n: 24 / prec: 63 / result: (1, 6541818966109015457452048587, -76, 93)

[3]libmpf._normalize1 / x: (1, 54316926478175977328110568986427404832231608707, -105, 156, 63, 'n') / result: (1, 5484607973170821915, -12, 63)

[3]libmpf._normalize1 / x: (1, 14165122530615668149043929705967690463954596043, -104, 154, 63, 'n') / result: (1, 2860623713809414525, -12, 62)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (0, 683942430869857714925, -98, 70, 63, 'n') / result: (0, 2671650120585381699, -90, 62)

[3]libmpf._normalize1 / x: (0, 713451880680418697193, -99, 70, 63, 'n') / result: (0, 87091294028371423, -86, 57)

[3]libmpf._normalize1 / x: (1, 597020786512251340258867389, -90, 89, 63, 'n') / result: (1, 2224075743974191473, -62, 61)

[3]libmpf._normalize1 / x: (0, 12250468998125274168497631, -86, 84, 63, 'n') / result: (0, 2920739411860769789, -64, 62)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 49345575938648554225, 75, 66, 63, 'n') / result: (1, 3084098496165534639, 79, 62)

[3]libmpf._normalize1 / x: (0, 434634737736497366613, 74, 69, 63, 'n') / result: (0, 6791167777132771353, 80, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 20759624771864446938300710489173727781, -231, 124, 63, 'n') / result: (1, 4501526055527865547, -169, 62)

[3]libmpf._normalize1 / x: (0, 9051974865315327794195453190648625929, -233, 123, 63, 'n') / result: (0, 3925668325703623917, -172, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (0, 111119812145488174212, 82, 67, 63, 'n') / result: (0, 868123532386626361, 89, 60)

[3]libmpf._normalize1 / x: (1, 35232535883110236651, 81, 65, 63, 'n') / result: (1, 8808133970777559163, 83, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 15097908924992325046341785216485183041, -235, 124, 63, 'n') / result: (1, 3273837131292993125, -173, 62)

[3]libmpf._normalize1 / x: (0, 13166508895004113154888481598402802151, -238, 124, 63, 'n') / result: (0, 356878938700329447, -173, 59)

[2]libmpf._normalize. / x: (0, 537342439893631666366831140615533604406034432, 0, 149, 63, 'n') / result: (0, 868123532386626361, 89, 60)

[2]libmpf._normalize. / x: (1, 85187044639181751128889389104309079851925504, 0, 146, 63, 'n') / result: (1, 8808133970777559163, 83, 63)

[3]libmpf._normalize1 / x: (1, 178750646008679235985553054967239587139, -90, 128, 63, 'n') / result: (1, 4845045968394934743, -25, 63)

[3]libmpf._normalize1 / x: (0, 48664556364465663673647280938103905863, -90, 126, 63, 'n') / result: (0, 5276221773339695407, -27, 63)

[1]gammazeta.bernoulli_size / n: 26 / result: 20

[3]libmpf._normalize1 / x: (0, 49015823208824870191205857274539, -102, 106, 94, 'd') / result: (0, 5983376856546004662012433749, -89, 93)

[2]libmpf._normalize. / x: (1, 98392200383100521135020902245514, -74, 107, 94, 'd') / result: (1, 12010766648327700333864856231, -61, 94)

[3]libmpf._normalize1 / x: (0, 3224115628136814733098369586755360085, -89, 122, 94, 'd') / result: (0, 3002691667654379022399307775, -59, 92)

[3]libmpf._normalize1 / x: (0, 861672254543611969838909838391, -79, 100, 94, 'd') / result: (0, 841476811077746064295810389, -69, 90)

[11]gammazeta.bernoulli_size / n: 26 / prec: 63 / result: (0, 841476811077746064295810389, -69, 90)

[3]libmpf._normalize1 / x: (1, 4076993831010059731467734079438888903956445027, -94, 152, 63, 'n') / result: (1, 6586738778339484777, -5, 63)

[3]libmpf._normalize1 / x: (0, 4439818272368857188022729745075013175486183323, -96, 152, 63, 'n') / result: (0, 7172913277660539755, -7, 63)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (0, 646995114788038110975, -100, 70, 63, 'n') / result: (0, 2527324667140773871, -92, 62)

[3]libmpf._normalize1 / x: (1, 704573235044031635959, -102, 70, 63, 'n') / result: (1, 1376119599695374289, -93, 61)

[3]libmpf._normalize1 / x: (1, 2388083143521680694003492881, -92, 91, 63, 'n') / result: (1, 2224075741620436957, -62, 61)

[3]libmpf._normalize1 / x: (0, 1568060030383915493947103279, -93, 91, 63, 'n') / result: (0, 730184852324386823, -62, 60)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 479371422516313931845, 85, 69, 63, 'n') / result: (1, 7490178476817405185, 91, 63)

[3]libmpf._normalize1 / x: (1, 3113391015095206247165, 83, 72, 63, 'n') / result: (1, 6080841826357824701, 92, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 10980297399994418215216393478539479375, -239, 124, 63, 'n') / result: (1, 1190486229561088409, -176, 61)

[3]libmpf._normalize1 / x: (0, 1196955354091283014080771054400254741, -239, 120, 63, 'n') / result: (0, 2076386552438280419, -180, 61)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 267478189382843214655, 92, 68, 63, 'n') / result: (1, 4179346709106925229, 98, 62)

[2]libmpf._normalize. / x: (0, 191403620894912798888, 93, 68, 63, 'n') / result: (0, 5981363152966024965, 98, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 3992835418179788441591965495110066027, -242, 122, 63, 'n') / result: (1, 6926465335628150743, -183, 63)

[3]libmpf._normalize1 / x: (0, 6964103878349282991320300086323954057, -246, 123, 63, 'n') / result: (0, 6040397243456815765, -186, 63)

[2]libmpf._normalize. / x: (1, 1324487841090317257190919274189376160140965707776, 0, 160, 63, 'n') / result: (1, 4179346709106925229, 98, 62)

[2]libmpf._normalize. / x: (0, 1895569647760099064758274625427279591685184552960, 0, 161, 63, 'n') / result: (0, 5981363152966024965, 98, 63)

[3]libmpf._normalize1 / x: (0, 195454991348315503725764295103938787951, -88, 128, 63, 'n') / result: (0, 2648909078037239283, -22, 62)

[3]libmpf._normalize1 / x: (1, 356682550651721162101623812246453827145, -88, 129, 63, 'n') / result: (1, 2416974976901669121, -21, 62)

[1]gammazeta.bernoulli_size / n: 28 / result: 24

[3]libmpf._normalize1 / x: (1, 52396224809433481928530399155541, -103, 106, 94, 'd') / result: (1, 12792047072615596173957616981, -91, 94)

[2]libmpf._normalize. / x: (0, 144865142545426171950527349894819, -70, 107, 94, 'd') / result: (0, 17683733220877218255679608141, -57, 94)

[3]libmpf._normalize1 / x: (1, 303804223432217634431007929052719043925, -91, 128, 94, 'd') / result: (1, 8841866610810906697035765073, -56, 93)

[3]libmpf._normalize1 / x: (1, 2062596022980568921190428119507, -76, 101, 94, 'd') / result: (1, 16114031429535694696800219683, -69, 94)

[11]gammazeta.bernoulli_size / n: 28 / prec: 63 / result: (1, 16114031429535694696800219683, -69, 94)

[3]libmpf._normalize1 / x: (1, 42684604137474493984065933764108724849237407289, -91, 155, 63, 'n') / result: (1, 4310043578737750421, 2, 62)

[3]libmpf._normalize1 / x: (0, 38947210742194805935777861520501868202177508643, -90, 155, 63, 'n') / result: (0, 7865326572011855273, 2, 63)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (0, 573443169071469628359, -103, 69, 63, 'n') / result: (0, 8960049516741712943, -97, 63)

[3]libmpf._normalize1 / x: (1, 523233432892274759913, -102, 69, 63, 'n') / result: (1, 2043880597235448281, -94, 61)

[3]libmpf._normalize1 / x: (1, 76418660583733732687616353233, -97, 96, 63, 'n') / result: (1, 2224075741359665195, -62, 61)

[3]libmpf._normalize1 / x: (0, 3136120058723950390802892327, -94, 92, 63, 'n') / result: (0, 182546212962127197, -60, 58)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 471724150323848479083, 98, 69, 63, 'n') / result: (0, 3685344924405066243, 105, 62)

[3]libmpf._normalize1 / x: (0, 89263997416332839685, 98, 67, 63, 'n') / result: (0, 348687489907550155, 106, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 23231042433046041841074902843927513829, -249, 125, 63, 'n') / result: (1, 2518714667501145725, -186, 62)

[3]libmpf._normalize1 / x: (0, 20259211282470641431429752457999715295, -252, 124, 63, 'n') / result: (0, 8786032354119004749, -191, 63)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 15336789773608959051, 107, 64, 63, 'n') / result: (1, 3834197443402239763, 109, 62)

[3]libmpf._normalize1 / x: (1, 60161798724781695815, 107, 66, 63, 'n') / result: (1, 7520224840597711977, 110, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 8447651793834924306760133798141057175, -252, 123, 63, 'n') / result: (1, 7327169941821514837, -192, 63)

[3]libmpf._normalize1 / x: (0, 29467943683593660263592916896368023047, -257, 125, 63, 'n') / result: (0, 6389841712086548909, -195, 63)

[2]libmpf._normalize. / x: (1, 2488536417547464634695009558195317143644048673734656, 0, 171, 63, 'n') / result: (1, 3834197443402239763, 109, 62)

[2]libmpf._normalize. / x: (1, 9761809953827768689419768084433242083028506612072448, 0, 173, 63, 'n') / result: (1, 7520224840597711977, 110, 63)

[3]libmpf._normalize1 / x: (0, 160428311403943838462868902332849037617, -85, 127, 63, 'n') / result: (0, 4348418093808423389, -20, 62)

[3]libmpf._normalize1 / x: (0, 857131531768045530848573571754085575417, -86, 130, 63, 'n') / result: (0, 5808149180304644525, -19, 63)

[1]gammazeta.bernoulli_size / n: 30 / result: 29

[2]libmpf._normalize. / x: (0, 27888313205021046832927470518272, -101, 105, 94, 'd') / result: (0, 11, 0, 4)

[2]libmpf._normalize. / x: (1, 121092738283912171606724180149003, -65, 107, 94, 'd') / result: (1, 3695457100949468127646611943, -50, 92)

[2]libmpf._normalize1 / x: (0, 3695457100961853026621880807, -50, 92, 94, 'd') / result: (0, 3695457100961853026621880807, -50, 92)

[3]libmpf._normalize1 / x: (0, 1420442677821912023182941821511, -71, 101, 94, 'd') / result: (0, 2774302105120921920279183245, -62, 92)

[11]gammazeta.bernoulli_size / n: 30 / prec: 63 / result: (0, 2774302105120921920279183245, -62, 92)

[3]libmpf._normalize1 / x: (0, 12063825471598615540913993987416936930074917305, -82, 154, 63, 'n') / result: (0, 19033360563907167, 17, 55)

[3]libmpf._normalize1 / x: (0, 16113560497775532399134626861482028747060983625, -81, 154, 63, 'n') / result: (0, 6508215255351676965, 10, 63)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (1, 381517857840659603473, -105, 69, 63, 'n') / result: (1, 46572004130939893, -92, 56)

[3]libmpf._normalize1 / x: (1, 509590519008275609883, -104, 69, 63, 'n') / result: (1, 1990587964876076601, -96, 61)

[3]libmpf._normalize1 / x: (1, 2388083143288251150639555573, -92, 91, 63, 'n') / result: (1, 8896302965612155015, -64, 63)

[3]libmpf._normalize1 / x: (0, 12544480232905213598438312391, -96, 94, 63, 'n') / result: (0, 2920739406930565275, -64, 62)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 791235255013060484113, 109, 70, 63, 'n') / result: (1, 772690678723691879, 119, 60)

[3]libmpf._normalize1 / x: (0, 333112443679400840223, 110, 69, 63, 'n') / result: (0, 325305120780664883, 120, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 24574987036610688894527450528740378911, -258, 125, 63, 'n') / result: (1, 2664425433389641759, -195, 62)

[3]libmpf._normalize1 / x: (0, 21431231769886298375656455404234047527, -261, 125, 63, 'n') / result: (0, 1161789402197554347, -197, 61)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 31108667427695271165, 120, 65, 63, 'n') / result: (0, 7777166856923817791, 122, 63)

[2]libmpf._normalize. / x: (0, 6710783369145404940, 121, 63, 63, 'n') / result: (0, 1677695842286351235, 123, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 8936358922403886871042159598446246077, -261, 123, 63, 'n') / result: (1, 3875527903112206195, -200, 62)

[3]libmpf._normalize1 / x: (0, 3896587594524781522541723394592809441, -263, 122, 63, 'n') / result: (0, 6759501976422134383, -204, 63)

[2]libmpf._normalize. / x: (0, 41350511656454879609188700153031686794579859291676606464, 0, 185, 63, 'n') / result: (0, 7777166856923817791, 122, 63)

[2]libmpf._normalize. / x: (0, 17840322255831783715840824204637485099163592860505210880, 0, 184, 63, 'n') / result: (0, 1677695842286351235, 123, 61)

[3]libmpf._normalize1 / x: (1, 252465405651111475791688580725519334965, -81, 128, 63, 'n') / result: (1, 3421544266054615127, -15, 62)

[3]libmpf._normalize1 / x: (1, 155492850850573595439836976763204618447, -82, 127, 63, 'n') / result: (1, 1053660541863477551, -15, 60)

[1]gammazeta.bernoulli_size / n: 32 / result: 33

[3]libmpf._normalize1 / x: (0, 59157028010650705403179482917547, -102, 106, 94, 'd') / result: (0, 7221316895831384936911557973, -89, 93)

[2]libmpf._normalize. / x: (0, 228131545034679848143695993456651, -61, 108, 94, 'd') / result: (0, 13924044496745596200176757413, -47, 94)

[3]libmpf._normalize1 / x: (1, 61238595319361599533567956143419507255979, -89, 136, 94, 'd') / result: (1, 13924044496743954262812611919, -47, 94)

[3]libmpf._normalize1 / x: (1, 1115387233171717997332543724643, -66, 100, 94, 'd') / result: (1, 17427925518308093708320995697, -60, 94)

[11]gammazeta.bernoulli_size / n: 32 / prec: 63 / result: (1, 17427925518308093708320995697, -60, 94)

[3]libmpf._normalize1 / x: (0, 59630418626393964414625316677488875538758108519, -75, 156, 63, 'n') / result: (0, 6021133570089603345, 18, 63)

[3]libmpf._normalize1 / x: (0, 18363117445176833866947274946499213763327098047, -75, 154, 63, 'n') / result: (0, 1854201017661689701, 18, 61)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (1, 486660364158855279061, -106, 69, 63, 'n') / result: (1, 7604068189982113735, -100, 63)

[3]libmpf._normalize1 / x: (1, 599465952365862842139, -108, 70, 63, 'n') / result: (1, 2341663876429151727, -100, 62)

[3]libmpf._normalize1 / x: (1, 611349284689396362742100344775, -100, 99, 63, 'n') / result: (1, 8896302965722808771, -64, 63)

[3]libmpf._normalize1 / x: (0, 200711683724141753706262790673, -100, 98, 63, 'n') / result: (0, 2920739406896489581, -64, 62)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 39768671490276203321, 122, 66, 63, 'n') / result: (1, 4971083936284525415, 125, 63)

[3]libmpf._normalize1 / x: (1, 285323576818591422015, 123, 68, 63, 'n') / result: (1, 4458180887790490969, 129, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12998340250769289994548046094826102585, -266, 124, 63, 'n') / result: (1, 1409282873858984071, -203, 61)

[3]libmpf._normalize1 / x: (0, 22671055095416910678130914963061432749, -270, 125, 63, 'n') / result: (0, 4916001437397915915, -208, 63)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 128774342697430203655, 130, 67, 63, 'n') / result: (1, 503024776161836733, 138, 59)

[3]libmpf._normalize1 / x: (0, 645213412681450725257, 127, 70, 63, 'n') / result: (0, 5040729786573833791, 134, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 4726669182097923634686012531568327413, -269, 122, 63, 'n') / result: (1, 2049865998340340467, -208, 61)

[3]libmpf._normalize1 / x: (0, 16488040069394116857127388470221695745, -274, 124, 63, 'n') / result: (0, 7150547545306059513, -213, 63)

[2]libmpf._normalize. / x: (1, 503024776161836733, 138, 59, 63, 'n') / result: (1, 503024776161836733, 138, 59)

[2]libmpf._normalize. / x: (0, 5040729786573833791, 134, 63, 63, 'n') / result: (0, 5040729786573833791, 134, 63)

[3]libmpf._normalize1 / x: (0, 491896315106241128255907917223314443449, -79, 129, 63, 'n') / result: (0, 6666438168447511051, -13, 63)

[3]libmpf._normalize1 / x: (1, 24262543771050277960378370925506131823, -75, 125, 63, 'n') / result: (1, 5261100533319470933, -13, 63)

[1]gammazeta.bernoulli_size / n: 34 / result: 38

[3]libmpf._normalize1 / x: (1, 62537429611259317140504024798549, -103, 106, 94, 'd') / result: (1, 15267927151186356723755865429, -91, 94)

[2]libmpf._normalize. / x: (1, 240535870904843638363129463223999, -56, 108, 94, 'd') / result: (1, 7340572232203480174656050513, -41, 93)

[3]libmpf._normalize1 / x: (0, 8264749592409435570179184947250607929600683, -91, 143, 94, 'd') / result: (0, 14681144464406933228025282551, -42, 94)

[3]libmpf._normalize1 / x: (0, 990623921358427568629976748791, -61, 100, 94, 'd') / result: (0, 15478498771225430759843386699, -55, 94)

[11]gammazeta.bernoulli_size / n: 34 / prec: 63 / result: (0, 15478498771225430759843386699, -55, 94)

[3]libmpf._normalize1 / x: (0, 103186454998765111002674495869862370009068910649, -68, 157, 63, 'n') / result: (0, 1302396164749968705, 28, 61)

[3]libmpf._normalize1 / x: (1, 81433938140278889277649378676808076249609320167, -68, 156, 63, 'n') / result: (1, 4111363210051346127, 26, 62)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (1, 384288966094542107195, -108, 69, 63, 'n') / result: (1, 6004515095227220425, -102, 63)

[3]libmpf._normalize1 / x: (0, 606555654873678679457, -109, 70, 63, 'n') / result: (0, 4738716053700614683, -102, 63)

[3]libmpf._normalize1 / x: (1, 2445397138763589966148472226249, -102, 101, 63, 'n') / result: (1, 4448151482872326535, -63, 62)

[3]libmpf._normalize1 / x: (0, 802846734901305730940084165147, -102, 100, 63, 'n') / result: (0, 5841478813827457859, -65, 63)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 142010217251969955621, 136, 67, 63, 'n') / result: (0, 4437819289124061113, 141, 62)

[3]libmpf._normalize1 / x: (0, 316559702158426748577, 134, 69, 63, 'n') / result: (0, 4946245346225417947, 140, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 6875155173960616196211832179367311801, -274, 123, 63, 'n') / result: (1, 5963246540626444995, -214, 63)

[3]libmpf._normalize1 / x: (0, 23982603737300533611281825084308064139, -279, 125, 63, 'n') / result: (0, 2600199107384021641, -216, 62)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (1, 1249247721727769716, 142, 61, 63, 'n') / result: (1, 312311930431942429, 144, 59)

[3]libmpf._normalize1 / x: (1, 350355328233275771879, 141, 69, 63, 'n') / result: (1, 342143875227808371, 151, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 20000451415158156207466598473427378985, -280, 124, 63, 'n') / result: (1, 8673813150002101811, -219, 63)

[3]libmpf._normalize1 / x: (0, 8720946813563830403797576988116824123, -282, 123, 63, 'n') / result: (0, 7564215585117153865, -222, 63)

[2]libmpf._normalize. / x: (1, 312311930431942429, 144, 59, 63, 'n') / result: (1, 312311930431942429, 144, 59)

[2]libmpf._normalize. / x: (1, 342143875227808371, 151, 59, 63, 'n') / result: (1, 342143875227808371, 151, 59)

[3]libmpf._normalize1 / x: (0, 44117735862692195564244795099620701559, -75, 126, 63, 'n') / result: (0, 2391627253373626429, -11, 62)

[3]libmpf._normalize1 / x: (0, 3036554258431498715347104778043406480059, -78, 132, 63, 'n') / result: (0, 643015375754207183, -6, 60)

[1]gammazeta.bernoulli_size / n: 36 / result: 43

[2]libmpf._normalize. / x: (0, 32958915605933964438914283339776, -101, 105, 94, 'd') / result: (0, 13, 0, 4)

[2]libmpf._normalize. / x: (0, 282174874191631110838673389808053, -51, 108, 94, 'd') / result: (0, 17222587536110297292399498889, -37, 94)

[2]libmpf._normalize1 / x: (1, 17222587536110295505693103753, -37, 94, 94, 'd') / result: (1, 17222587536110295505693103753, -37, 94)

[3]libmpf._normalize1 / x: (1, 1976057768712593196211582444567, -57, 101, 94, 'd') / result: (1, 1929743914758391793175373481, -47, 91)

[11]gammazeta.bernoulli_size / n: 36 / prec: 63 / result: (1, 1929743914758391793175373481, -47, 91)

[3]libmpf._normalize1 / x: (1, 4615228138568082050765420949080099057447329349, -58, 152, 63, 'n') / result: (1, 7456303200649835549, 31, 63)

[3]libmpf._normalize1 / x: (1, 1240855008457762055146904019591387433077914023, -53, 150, 63, 'n') / result: (1, 4009418773381187317, 35, 62)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (0, 894000541545168901959, -114, 70, 63, 'n') / result: (0, 6984379230821632047, -107, 63)

[3]libmpf._normalize1 / x: (0, 961447639192504098699, -111, 70, 63, 'n') / result: (0, 7511309681191438271, -104, 63)

[3]libmpf._normalize1 / x: (1, 78252708440427894540481943746513, -107, 106, 63, 'n') / result: (1, 4448151482871929519, -63, 62)

[3]libmpf._normalize1 / x: (0, 3211386939612734233357758384063, -104, 102, 63, 'n') / result: (0, 1460369703460280213, -63, 61)

[1]ctx_mp_python.convert / x: -35 / result: -35.0

[2]libmpf._normalize1 / x: (1, 35, 0, 6, 63, 'n') / result: (1, 35, 0, 6)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 2616734044184450304265, 144, 72, 63, 'n') / result: (1, 5110808680047754501, 153, 63)

[3]libmpf._normalize1 / x: (0, 387885819211624511955, 146, 69, 63, 'n') / result: (0, 6060715925181632999, 152, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 29091565694775499938438139003889568633, -285, 125, 63, 'n') / result: (1, 6308227745456074045, -223, 63)

[3]libmpf._normalize1 / x: (0, 25370027094003870266507665820325449595, -288, 125, 63, 'n') / result: (0, 5501247698267020993, -226, 63)

[1]ctx_mp_python.convert / x: -36 / result: -36.0

[2]libmpf._normalize1 / x: (1, 9, 2, 4, 63, 'n') / result: (1, 9, 2, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 182905295118584076003, 154, 68, 63, 'n') / result: (0, 5715790472455752375, 159, 63)

[3]libmpf._normalize1 / x: (0, 98777817074797938039, 154, 67, 63, 'n') / result: (0, 6173613567174871127, 158, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 21157502323473090866452980573340626135, -289, 124, 63, 'n') / result: (1, 9175603993390653157, -228, 63)

[3]libmpf._normalize1 / x: (0, 18450928795639178376556653360585924579, -292, 124, 63, 'n') / result: (0, 4000907416921469813, -230, 62)

[2]libmpf._normalize. / x: (0, 5715790472455752375, 159, 63, 63, 'n') / result: (0, 5715790472455752375, 159, 63)

[2]libmpf._normalize. / x: (0, 6173613567174871127, 158, 63, 63, 'n') / result: (0, 6173613567174871127, 158, 63)

[3]libmpf._normalize1 / x: (1, 444266695385710951405614225932527772251, -72, 129, 63, 'n') / result: (1, 3010468226875897761, -5, 62)

[3]libmpf._normalize1 / x: (1, 90424918106423633957754913383895840003, -71, 127, 63, 'n') / result: (1, 4901944632890416489, -7, 63)

[1]gammazeta.bernoulli_size / n: 38 / result: 48

[3]libmpf._normalize1 / x: (0, 69298232812476540615153108560555, -102, 106, 94, 'd') / result: (0, 8459256935116765211810682197, -89, 93)

[2]libmpf._normalize. / x: (1, 366313119413557140932169094219260, -46, 109, 94, 'd') / result: (1, 5589494619957842116274552829, -30, 93)

[3]libmpf._normalize1 / x: (0, 3222124273616835836848999965259159004826129749, -89, 152, 94, 'd') / result: (0, 11178989239915684261898048847, -31, 94)

[3]libmpf._normalize1 / x: (0, 1099626624881222189550094602983, -51, 100, 94, 'd') / result: (0, 17181666013769096711720228171, -45, 94)

[11]gammazeta.bernoulli_size / n: 38 / prec: 63 / result: (0, 17181666013769096711720228171, -45, 94)

[3]libmpf._normalize1 / x: (1, 51724859619245326943064975691053804959388025131, -50, 156, 63, 'n') / result: (1, 2611438053226728233, 44, 62)

[3]libmpf._normalize1 / x: (1, 84223575500311100440656728719399998790300711619, -52, 156, 63, 'n') / result: (1, 4252203904648041405, 42, 62)

[1]ctx_mp_python.convert / x: -523022617466601111760007224100074291200000000 / result: -5.23022617466601112e+44

[3]libmpf._normalize1 / x: (0, 456077431348225655813, -112, 69, 63, 'n') / result: (0, 445388116551001617, -102, 59)

[3]libmpf._normalize1 / x: (0, 742630763155383496977, -114, 70, 63, 'n') / result: (0, 2900901418575716785, -106, 62)

[3]libmpf._normalize1 / x: (1, 2445397138762926316270266358255, -102, 101, 63, 'n') / result: (1, 8896302965742238725, -64, 63)

[3]libmpf._normalize1 / x: (0, 12845547758453837835472287687089, -106, 104, 63, 'n') / result: (0, 5841478813842440029, -65, 63)

[1]ctx_mp_python.convert / x: -37 / result: -37.0

[2]libmpf._normalize1 / x: (1, 37, 0, 6, 63, 'n') / result: (1, 37, 0, 6)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 26275840465616704065, 159, 65, 63, 'n') / result: (1, 410560007275261001, 165, 59)

[3]libmpf._normalize1 / x: (1, 914318558680160516699, 158, 70, 63, 'n') / result: (1, 7143113739688754037, 165, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 30774548834142677626065942131734577871, -294, 125, 63, 'n') / result: (1, 6673166540647747751, -232, 63)

[3]libmpf._normalize1 / x: (0, 13418857305919402455372661219703655039, -296, 124, 63, 'n') / result: (0, 363718856083769983, -231, 59)

[1]ctx_mp_python.convert / x: -38 / result: -38.0

[2]libmpf._normalize1 / x: (1, 19, 1, 5, 63, 'n') / result: (1, 19, 1, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 206492772052432662091, 166, 68, 63, 'n') / result: (1, 3226449563319260345, 172, 62)

[3]libmpf._normalize1 / x: (0, 148035961272344156733, 166, 68, 63, 'n') / result: (0, 2313061894880377449, 172, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 22381490061194674638663391308510234453, -298, 125, 63, 'n') / result: (1, 1213303007390499591, -234, 61)

[3]libmpf._normalize1 / x: (0, 1219896118719945677761151019973059549, -297, 120, 63, 'n') / result: (0, 8464729741585919605, -240, 63)

[2]libmpf._normalize. / x: (1, 3226449563319260345, 172, 62, 63, 'n') / result: (1, 3226449563319260345, 172, 62)

[2]libmpf._normalize. / x: (0, 2313061894880377449, 172, 62, 63, 'n') / result: (0, 2313061894880377449, 172, 62)

[3]libmpf._normalize1 / x: (0, 230958857519894438655965186671112221635, -68, 128, 63, 'n') / result: (0, 6260152376945990825, -3, 63)

[3]libmpf._normalize1 / x: (1, 206923500592034139410946202123882458701, -68, 128, 63, 'n') / result: (1, 2804336361002362211, -2, 62)

[1]gammazeta.bernoulli_size / n: 40 / result: 54

[3]libmpf._normalize1 / x: (1, 72678634413085152352477650441557, -103, 106, 94, 'd') / result: (1, 17743807229757117273554113877, -91, 94)

[2]libmpf._normalize. / x: (0, 261836693709886064222849235620245, -40, 108, 94, 'd') / result: (0, 3995310878141572024884784479, -24, 92)

[3]libmpf._normalize1 / x: (1, 589603818111882786377373712053061389336643458389, -91, 159, 94, 'd') / result: (1, 7990621756283144050010042387, -25, 93)

[3]libmpf._normalize1 / x: (1, 1357876055216976591100126441291, -46, 101, 94, 'd') / result: (1, 5304203340691314808984868911, -38, 93)

[11]gammazeta.bernoulli_size / n: 40 / prec: 63 / result: (1, 5304203340691314808984868911, -38, 93)

[3]libmpf._normalize1 / x: (1, 33205121151033599578258946227731496089633741575, -41, 155, 63, 'n') / result: (1, 6705720813869499091, 51, 63)

[3]libmpf._normalize1 / x: (0, 14874770294450854643211655157382019827175122221, -40, 154, 63, 'n') / result: (0, 6007871876830780165, 51, 63)

[1]ctx_mp_python.convert / x: -815915283247897734345611269596115894272000000000 / result: -8.15915283247897734e+47

[3]libmpf._normalize1 / x: (0, 768740355293110777017, -115, 70, 63, 'n') / result: (0, 6005784025727427945, -108, 63)

[3]libmpf._normalize1 / x: (1, 688739315182629271881, -115, 70, 63, 'n') / result: (1, 5380775899864291187, -108, 63)

[3]libmpf._normalize1 / x: (1, 156505416880821278448984397781655, -108, 107, 63, 'n') / result: (1, 1112037870717737167, -61, 60)

[3]libmpf._normalize1 / x: (0, 51382191033809970563919740872845, -108, 106, 63, 'n') / result: (0, 2920739406920914153, -64, 62)

[1]ctx_mp_python.convert / x: -39 / result: -39.0

[2]libmpf._normalize1 / x: (1, 39, 0, 6, 63, 'n') / result: (1, 39, 0, 6)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 264615246662273800395, 172, 68, 63, 'n') / result: (0, 4134613229098028131, 178, 62)

[3]libmpf._normalize1 / x: (0, 103377559898820900189, 172, 67, 63, 'n') / result: (0, 3230548746838153131, 177, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 4069361829308122661270257195370297973, -300, 122, 63, 'n') / result: (1, 7059217497544724893, -241, 63)

[3]libmpf._normalize1 / x: (0, 28390309672027826684575666853521234815, -306, 125, 63, 'n') / result: (0, 6156167084789759713, -244, 63)

[1]ctx_mp_python.convert / x: -40 / result: -40.0

[2]libmpf._normalize1 / x: (1, 5, 3, 3, 63, 'n') / result: (1, 5, 3, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 34234033379388265655, 179, 65, 63, 'n') / result: (1, 4279254172423533207, 182, 62)

[2]libmpf._normalize. / x: (1, 78171942170661187620, 180, 67, 63, 'n') / result: (1, 2442873192833162113, 185, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 23676287006883622756176591548704716279, -307, 125, 63, 'n') / result: (1, 5133976361850709013, -245, 63)

[3]libmpf._normalize1 / x: (0, 20647497943292964862424290475637404739, -310, 124, 63, 'n') / result: (0, 1119303106325410857, -246, 60)

[2]libmpf._normalize. / x: (1, 4279254172423533207, 182, 62, 63, 'n') / result: (1, 4279254172423533207, 182, 62)

[2]libmpf._normalize. / x: (1, 2442873192833162113, 185, 62, 63, 'n') / result: (1, 2442873192833162113, 185, 62)

[3]libmpf._normalize1 / x: (0, 32906851979962368666653429556344738055, -63, 125, 63, 'n') / result: (0, 3567768040633412313, 0, 62)

[3]libmpf._normalize1 / x: (0, 195876669144117934330854692275249763105, -64, 128, 63, 'n') / result: (0, 165913992363497685, 6, 58)

[1]gammazeta.bernoulli_size / n: 42 / result: 59

[2]libmpf._normalize. / x: (0, 38029518006846882044901096161280, -101, 105, 94, 'd') / result: (0, 15, 0, 4)

[2]libmpf._normalize. / x: (1, 410379807662299665203332899407785, -35, 109, 94, 'd') / result: (1, 1565474730157087956250506971, -17, 91)

[2]libmpf._normalize1 / x: (0, 1565474730157087956252473051, -17, 91, 94, 'd') / result: (0, 1565474730157087956252473051, -17, 91)

[3]libmpf._normalize1 / x: (0, 925451292825481979318051124411, -40, 100, 94, 'd') / result: (0, 7230088225199077963422274409, -33, 93)

[11]gammazeta.bernoulli_size / n: 42 / prec: 63 / result: (0, 7230088225199077963422274409, -33, 93)

[3]libmpf._normalize1 / x: (0, 25795277700825219901283692518818720589125398017, -33, 155, 63, 'n') / result: (0, 5209314846080092957, 59, 63)

[3]libmpf._normalize1 / x: (0, 1199572802583094351836243032755142153106243165, -27, 150, 63, 'n') / result: (0, 1938014386020773681, 62, 61)

[1]ctx_mp_python.convert / x: -1405006117752879898543142606244511569936384000000000 / result: -1.4050061177528799e+51

[3]libmpf._normalize1 / x: (1, 355125311898657612909, -117, 69, 63, 'n') / result: (1, 2774416499208262601, -110, 62)

[3]libmpf._normalize1 / x: (1, 528467165940333385141, -116, 69, 63, 'n') / result: (1, 8257299467817709143, -110, 63)

[3]libmpf._normalize1 / x: (1, 626021667523287888233333640565705, -110, 109, 63, 'n') / result: (1, 8896302965741936763, -64, 63)

[3]libmpf._normalize1 / x: (0, 205528764135231624970163306369449, -110, 108, 63, 'n') / result: (0, 5841478813841593619, -65, 63)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)

[2]libmpf._normalize. / x: (1, 11361970653071802707423, -73, 74, 63, 'n') / result: (1, 2773918616472608083, -61, 62)

[2]libmpf._normalize. / x: (0, 4072783393533901933388, -73, 72, 63, 'n') / result: (0, 3977327532747951107, -63, 62)

[2]libmpf._normalize1 / x: (0, 2713001139382906671, -62, 62, 63, 'n') / result: (0, 2713001139382906671, -62, 62)

[3]libmpf._normalize1 / x: (0, 10392854881382024651, -63, 64, 63, 'n') / result: (0, 2598213720345506163, -61, 62)

[2]libmpf._normalize1 / x: (0, 43, 0, 6, 63, 'n') / result: (0, 43, 0, 6)

[2]libmpf._normalize. / x: (0, 36376095460795824230704307, -83, 85, 63, 'n') / result: (0, 8672736993025737817, -61, 63)

[3]libmpf._normalize1 / x: (0, 627773893652404672411, -71, 70, 63, 'n') / result: (0, 4904483544159411503, -64, 63)

[3]libmpf._normalize1 / x: (0, 878579810766445621153, -75, 70, 63, 'n') / result: (0, 6863904771612856415, -68, 63)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (1, 66606620106437666438055, -68, 76, 73, 'd') / result: (1, 2081456878326177076189, -63, 71)

[2]libmpf._normalize. / x: (0, 8581324638087580866227807758, -93, 93, 63, 'n') / result: (0, 499498834722185325, -59, 59)

[2]libmpf._normalize. / x: (0, 4943741707570080587266956273, -93, 92, 63, 'n') / result: (0, 9208436510656179091, -64, 63)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[2]libmpf._normalize1 / x: (1, 4440441340429177762537, -70, 72, 73, 'd') / result: (1, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (0, 66606620106437666438055, -68, 76, 73, 'd') / result: (0, 2081456878326177076189, -63, 71)

[2]libmpf._normalize. / x: (0, 3598662904899361264242083, -87, 82, 67, 'n') / result: (0, 27455619086451425661, -70, 65)

[2]libmpf._normalize. / x: (0, 137301194209401293859644924178, -97, 97, 67, 'n') / result: (0, 63935850844439721601, -66, 66)

[2]libmpf._normalize. / x: (1, 79099867321121289396271300348, -97, 96, 67, 'n') / result: (1, 147334984170498865463, -68, 67)

[3]libmpf._normalize1 / x: (0, 1755398366753110721093990686184387403261, -136, 131, 63, 'n') / result: (0, 5947521008785090381, -68, 63)

[3]libmpf._normalize1 / x: (1, 4045173203493567321364881013859384846043, -138, 132, 63, 'n') / result: (1, 3426394980709275941, -68, 62)

[3]libmpf._normalize1 / x: (0, 199636177833771466079, -68, 68, 63, 'n') / result: (0, 6238630557305358315, -63, 63)

[3]libmpf._normalize1 / x: (0, 360277655507814698801, -68, 69, 63, 'n') / result: (0, 5629338367309604669, -62, 63)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[3]libmpf._normalize1 / x: (0, 165678313045200027969495010998806037469, -126, 127, 73, 'd') / result: (0, 4598496945595887618593, -71, 72)

[3]libmpf._normalize1 / x: (0, 410027539921847754293, -70, 69, 63, 'n') / result: (0, 6406680311278871161, -64, 63)

[3]libmpf._normalize1 / x: (1, 369982441007469801805, -69, 69, 63, 'n') / result: (1, 5780975640741715653, -63, 63)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 499498834722185325, -60, 59, 63, 'n') / result: (0, 499498834722185325, -60, 59)

[2]libmpf._normalize1 / x: (0, 9208436510656179091, -65, 63, 63, 'n') / result: (0, 9208436510656179091, -65, 63)

[3]libmpf._normalize1 / x: (0, 14398661666833836361, -64, 64, 63, 'n') / result: (0, 1799832708354229545, -61, 61)

[3]libmpf._normalize1 / x: (1, 13915466052310683521, -65, 64, 63, 'n') / result: (1, 108714578533677215, -58, 57)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 3428512435064669376958201594245109875, -127, 122, 63, 'n') / result: (0, 5947521008785090381, -68, 63)

[3]libmpf._normalize1 / x: (0, 63205831304586989391021198376308218765, -132, 126, 63, 'n') / result: (0, 6852789961418551881, -69, 63)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 60, 0, 6, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 102791849421278278215, -67, 67, 63, 'n') / result: (0, 1606122647207473097, -61, 61)

[3]libmpf._normalize1 / x: (1, 89212815131776355715, -66, 67, 63, 'n') / result: (1, 696975118217002779, -59, 60)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (0, 9875911141341717090535280619015133885, -126, 123, 63, 'n') / result: (0, 4282993725886594925, -65, 62)

[3]libmpf._normalize1 / x: (1, 4285640543830836720696156369766312695, -124, 122, 63, 'n') / result: (1, 232325039405667593, -60, 58)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 4282993725886594925, -66, 62, 63, 'n') / result: (1, 4282993725886594925, -66, 62)

[2]libmpf._normalize1 / x: (0, 232325039405667593, -61, 58, 63, 'n') / result: (0, 232325039405667593, -61, 58)

[3]libmpf._normalize1 / x: (0, 53311652941448750515, -66, 66, 63, 'n') / result: (0, 3331978308840546907, -62, 62)

[2]libmpf._normalize1 / x: (1, 637391588863750127, -61, 60, 63, 'n') / result: (1, 637391588863750127, -61, 60)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 225, 4, 8, 63, 'n') / result: (1, 225, 4, 8)

[2]libmpf._normalize1 / x: (0, 15, 2, 4, 63, 'n') / result: (0, 15, 2, 4)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 40823217831467691183393321747350644115, -136, 125, 63, 'n') / result: (0, 8852124292145250799, -74, 63)

[3]libmpf._normalize1 / x: (0, 47036897715041480472409886271281166615, -137, 126, 63, 'n') / result: (0, 1274937667240660815, -72, 61)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 675, 4, 10, 63, 'n') / result: (0, 675, 4, 10)

[2]libmpf._normalize1 / x: (0, 26985, 3, 15, 63, 'n') / result: (0, 26985, 3, 15)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 60760138167765865943066213092951025585, -142, 126, 63, 'n') / result: (0, 6587627380201116873, -79, 63)

[3]libmpf._normalize1 / x: (0, 8751050737682135901364822694311878225, -140, 123, 63, 'n') / result: (0, 1897581644265169585, -78, 61)

[2]libmpf._normalize. / x: (0, 10800, 0, 14, 63, 'n') / result: (0, 675, 4, 10)

[2]libmpf._normalize. / x: (0, 215880, 0, 18, 63, 'n') / result: (0, 26985, 3, 15)

[2]libmpf._normalize. / x: (1, 46759592188859847361950, -75, 76, 63, 'n') / result: (1, 2853979015433340293, -61, 62)

[3]libmpf._normalize1 / x: (0, 182890595294243096697405, -76, 78, 63, 'n') / result: (0, 2790689015109910533, -60, 62)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 3509774699295759399737777994582848213, -126, 122, 63, 'n') / result: (0, 6088488566257792625, -67, 63)

[3]libmpf._normalize1 / x: (1, 3431941736736339164387467822013044053, -125, 122, 63, 'n') / result: (1, 2976734949450571235, -65, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[3]libmpf._normalize1 / x: (1, 519551024320664970667, -78, 69, 63, 'n') / result: (1, 8117984755010390167, -72, 63)

[3]libmpf._normalize1 / x: (0, 508029431372897490773, -77, 69, 63, 'n') / result: (0, 7937959865201523293, -71, 63)

[3]libmpf._normalize1 / x: (0, 3403827803497709642601, -72, 72, 63, 'n') / result: (0, 3324050589353232073, -62, 62)

[3]libmpf._normalize1 / x: (1, 644751027131278606755, -71, 70, 63, 'n') / result: (1, 5037117399463114115, -64, 63)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 807525, 4, 20, 63, 'n') / result: (0, 807525, 4, 20)

[2]libmpf._normalize1 / x: (1, 161955, 3, 18, 63, 'n') / result: (1, 161955, 3, 18)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 45216847008569946743699199548782790295, -147, 126, 63, 'n') / result: (0, 4902420375963621859, -84, 63)

[3]libmpf._normalize1 / x: (0, 13024819702596667387279747176230137775, -146, 124, 63, 'n') / result: (0, 706076890889365427, -82, 60)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 4044375, 5, 22, 63, 'n') / result: (1, 4044375, 5, 22)

[2]libmpf._normalize1 / x: (1, 24063795, 5, 25, 63, 'n') / result: (1, 24063795, 5, 25)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 33649746611028797576866006751922375485, -152, 125, 63, 'n') / result: (0, 3648312837926416267, -89, 62)

[3]libmpf._normalize1 / x: (0, 4846444540501085539612554874216164205, -150, 122, 63, 'n') / result: (0, 4203620559713431379, -90, 62)

[2]libmpf._normalize. / x: (1, 129420000, 0, 27, 63, 'n') / result: (1, 4044375, 5, 22)

[2]libmpf._normalize. / x: (1, 770041440, 0, 30, 63, 'n') / result: (1, 24063795, 5, 25)

[3]libmpf._normalize1 / x: (0, 71644772938951971871127055, -85, 86, 63, 'n') / result: (0, 8540722482079502567, -62, 63)

[3]libmpf._normalize1 / x: (1, 192585522356650021300949655, -85, 88, 63, 'n') / result: (1, 5739495824475587049, -60, 63)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (0, 30009242253618665929414742258546880501, -129, 125, 63, 'n') / result: (0, 6507217129203430527, -67, 63)

[3]libmpf._normalize1 / x: (1, 20166668683090619479082541288390042747, -127, 124, 63, 'n') / result: (1, 8745898399200894551, -66, 63)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (1, 592301363582605587525, -83, 70, 63, 'n') / result: (1, 4627354402989106153, -76, 63)

[3]libmpf._normalize1 / x: (0, 796071107625041424019, -82, 70, 63, 'n') / result: (0, 6219305528320636125, -75, 63)

[3]libmpf._normalize1 / x: (0, 54456617501560365177879, -76, 76, 63, 'n') / result: (0, 6647536316108443015, -63, 63)

[3]libmpf._normalize1 / x: (1, 10309797128572137071395, -75, 74, 63, 'n') / result: (1, 1258520157296403451, -62, 61)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 1423605825, 5, 31, 63, 'n') / result: (1, 1423605825, 5, 31)

[2]libmpf._normalize1 / x: (0, 362981475, 5, 29, 63, 'n') / result: (0, 362981475, 5, 29)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 25041671896579570288643369364191302805, -157, 125, 63, 'n') / result: (0, 1357511753647038611, -93, 61)

[3]libmpf._normalize1 / x: (0, 28853251217866927861345476191282446285, -158, 125, 63, 'n') / result: (0, 6256551530736269959, -96, 63)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 15160261725, 6, 34, 63, 'n') / result: (0, 15160261725, 6, 34)

[2]libmpf._normalize1 / x: (0, 41619230325, 6, 36, 63, 'n') / result: (0, 41619230325, 6, 36)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 9317831403378444758724600339504039565, -161, 123, 63, 'n') / result: (0, 4040965220158626563, -100, 62)

[3]libmpf._normalize1 / x: (0, 42944373905662404255713867106544936985, -164, 126, 63, 'n') / result: (0, 2328019174227449287, -100, 62)

[2]libmpf._normalize. / x: (0, 970256750400, 0, 40, 63, 'n') / result: (0, 15160261725, 6, 34)

[2]libmpf._normalize. / x: (0, 2663630740800, 0, 42, 63, 'n') / result: (0, 41619230325, 6, 36)

[2]libmpf._normalize. / x: (1, 35628275853961491101292827100, -94, 95, 63, 'n') / result: (1, 4147677199677737791, -61, 62)

[2]libmpf._normalize. / x: (0, 203475242215202717831244763050, -94, 98, 63, 'n') / result: (0, 2960954475787042143, -58, 62)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 5100742653521035877447158604810038831, -126, 122, 63, 'n') / result: (0, 4424189012989586977, -66, 62)

[3]libmpf._normalize1 / x: (1, 3641331295249892779454842839175914063, -123, 122, 63, 'n') / result: (1, 3158351440839511619, -63, 62)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (1, 920456035413604990871, -89, 70, 63, 'n') / result: (1, 7191062776668788991, -82, 63)

[3]libmpf._normalize1 / x: (0, 657097523894788042739, -86, 70, 63, 'n') / result: (0, 160424200169625987, -74, 58)

[3]libmpf._normalize1 / x: (0, 3485216329037086702659329, -82, 82, 63, 'n') / result: (0, 6647522600244687467, -63, 63)

[3]libmpf._normalize1 / x: (1, 5154738140085898909309, -74, 73, 63, 'n') / result: (1, 2516961982463817827, -63, 62)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 2391031987425, 6, 42, 63, 'n') / result: (0, 2391031987425, 6, 42)

[2]libmpf._normalize1 / x: (1, 1200950315775, 6, 41, 63, 'n') / result: (1, 1200950315775, 6, 41)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 27736800456568393700549133679723951645, -168, 125, 63, 'n') / result: (0, 6014459862561676745, -106, 63)

[3]libmpf._normalize1 / x: (0, 15979301918386010885368143241625126105, -168, 124, 63, 'n') / result: (0, 1732479385471590167, -105, 61)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 22796318711475, 8, 45, 63, 'n') / result: (1, 22796318711475, 8, 45)

[2]libmpf._normalize1 / x: (1, 33463579179825, 8, 45, 63, 'n') / result: (1, 33463579179825, 8, 45)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 41282679749311097601296192321329569175, -174, 125, 63, 'n') / result: (0, 4475877107022643159, -111, 62)

[3]libmpf._normalize1 / x: (0, 11891573520659356937469508591096871305, -173, 124, 63, 'n') / result: (0, 2578573969073994667, -111, 62)

[2]libmpf._normalize. / x: (1, 5835857590137600, 0, 53, 63, 'n') / result: (1, 22796318711475, 8, 45)

[2]libmpf._normalize. / x: (1, 8566676270035200, 0, 53, 63, 'n') / result: (1, 33463579179825, 8, 45)

[2]libmpf._normalize. / x: (1, 15745206859939629998559319556250, -103, 104, 63, 'n') / result: (1, 7160091108716928829, -62, 63)

[2]libmpf._normalize. / x: (1, 208560861990142137516509328771000, -103, 108, 63, 'n') / result: (1, 740957027254801437, -55, 60)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (1, 40024354008164987797453319578343152145, -128, 125, 63, 'n') / result: (1, 8678898313596277369, -66, 63)

[3]libmpf._normalize1 / x: (1, 4141892318601804583399185399396931185, -121, 122, 63, 'n') / result: (1, 7185037840046559389, -62, 63)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (0, 642009486989596482433, -94, 70, 63, 'n') / result: (0, 5015699117106222519, -87, 63)

[3]libmpf._normalize1 / x: (0, 531503226678282967047, -90, 69, 63, 'n') / result: (0, 259523059901505355, -79, 58)

[3]libmpf._normalize1 / x: (0, 111526927544885891592574391, -87, 87, 63, 'n') / result: (0, 3323761449601825821, -62, 62)

[3]libmpf._normalize1 / x: (1, 164951360959688863604917, -79, 78, 63, 'n') / result: (1, 5033916044912379871, -64, 63)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (1, 1802647882386225, 8, 51, 63, 'n') / result: (1, 1802647882386225, 8, 51)

[2]libmpf._normalize1 / x: (0, 1668951335306925, 8, 51, 63, 'n') / result: (0, 1668951335306925, 8, 51)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 30721994232045467981881079999249014985, -179, 125, 63, 'n') / result: (0, 3330885288947083281, -116, 62)

[3]libmpf._normalize1 / x: (0, 17699086170283694045348865498346738805, -179, 124, 63, 'n') / result: (0, 7675755070731891101, -118, 63)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 59081779471138875, 9, 56, 63, 'n') / result: (0, 59081779471138875, 9, 56)

[2]libmpf._normalize1 / x: (0, 45734679795052125, 9, 56, 63, 'n') / result: (0, 45734679795052125, 9, 56)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 22862879428498952915950582235300097615, -184, 125, 63, 'n') / result: (0, 2478798354565271279, -121, 62)

[3]libmpf._normalize1 / x: (0, 52685651855728205525073161077329262915, -186, 126, 63, 'n') / result: (0, 2856094910039773433, -122, 62)

[2]libmpf._normalize. / x: (0, 30249871089223104000, 0, 65, 63, 'n') / result: (0, 59081779471138875, 9, 56)

[2]libmpf._normalize. / x: (0, 23416156055066688000, 0, 65, 63, 'n') / result: (0, 45734679795052125, 9, 56)

[3]libmpf._normalize1 / x: (0, 162281049300747291185528021490547125, -113, 117, 63, 'n') / result: (0, 4504203934850495061, -58, 62)

[3]libmpf._normalize1 / x: (0, 395477267668701649461156012619343625, -113, 119, 63, 'n') / result: (0, 5488349603520482199, -57, 63)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (1, 5257668222913002348302284401624151791, -120, 122, 63, 'n') / result: (1, 9120600495184445677, -61, 63)

[3]libmpf._normalize1 / x: (1, 6406442009296945694783260133750677269, -119, 123, 63, 'n') / result: (1, 2778351337752859487, -58, 62)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (0, 654238830879873464649, -96, 70, 63, 'n') / result: (0, 5111240866249011443, -89, 63)

[3]libmpf._normalize1 / x: (0, 398593345239644514829, -94, 69, 63, 'n') / result: (0, 778502627421180693, -85, 60)

[3]libmpf._normalize1 / x: (0, 446107715290784432595366131, -89, 89, 63, 'n') / result: (0, 6647522975367075691, -63, 63)

[3]libmpf._normalize1 / x: (1, 10556886322917459850046699, -85, 84, 63, 'n') / result: (1, 2516957836846699679, -63, 62)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize1 / x: (0, 2094181213520599875, 9, 61, 63, 'n') / result: (0, 2094181213520599875, 9, 61)

[2]libmpf._normalize1 / x: (1, 4047988246013905875, 9, 62, 63, 'n') / result: (1, 4047988246013905875, 9, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 17014235853766662635924143148550404785, -189, 124, 63, 'n') / result: (0, 57646473361983053, -121, 56)

[3]libmpf._normalize1 / x: (0, 19603963481201192753994471896560622695, -190, 124, 63, 'n') / result: (0, 8501863918257930219, -129, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (1, 67002367330770387750, 11, 66, 63, 'n') / result: (1, 8375295916346298469, 14, 63)

[2]libmpf._normalize. / x: (1, 19268753464767280500, 11, 65, 63, 'n') / result: (1, 4817188366191820125, 13, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 395679903575968898509863794152334995, -189, 119, 63, 'n') / result: (0, 686395217705472631, -130, 60)

[3]libmpf._normalize1 / x: (0, 58355984316133783080540583008336504885, -197, 126, 63, 'n') / result: (0, 6326968497308227139, -134, 63)

[2]libmpf._normalize. / x: (1, 137220848293417754116096, 0, 77, 63, 'n') / result: (1, 8375295916346298469, 14, 63)

[2]libmpf._normalize. / x: (1, 39462407095843390464000, 0, 76, 63, 'n') / result: (1, 4817188366191820125, 13, 63)

[3]libmpf._normalize1 / x: (1, 153482219004649415790999868385843089673, -121, 127, 63, 'n') / result: (1, 2080071941034210907, -55, 61)

[3]libmpf._normalize1 / x: (1, 79442193877081306366850349357439941191, -120, 126, 63, 'n') / result: (1, 2153284979713654769, -55, 61)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (1, 11191411802422353234969982184487517385, -117, 124, 63, 'n') / result: (1, 4853501195746492117, -56, 63)

[3]libmpf._normalize1 / x: (1, 11585319940407690512800386479457484795, -117, 124, 63, 'n') / result: (1, 628041452416482641, -53, 60)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (0, 489707327518526810033, -99, 69, 63, 'n') / result: (0, 7651676992476981407, -93, 63)

[3]libmpf._normalize1 / x: (0, 506943732088935518699, -99, 69, 63, 'n') / result: (0, 990124476736202185, -90, 60)

[3]libmpf._normalize1 / x: (0, 7137723452304227914477381791, -93, 93, 63, 'n') / result: (0, 830940372811656901, -60, 60)

[3]libmpf._normalize1 / x: (1, 337820361343234238477507127, -90, 89, 63, 'n') / result: (1, 314619728683712183, -60, 59)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 35636804073252723653, 14, 65, 63, 'n') / result: (1, 8909201018313180913, 16, 63)

[3]libmpf._normalize1 / x: (0, 1067658958722049477905, 13, 70, 63, 'n') / result: (0, 4170542807508005773, 21, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 4711351410020838977126942983515277865, -198, 122, 63, 'n') / result: (0, 4086445947269790547, -138, 62)

[3]libmpf._normalize1 / x: (0, 43427709258518164148012037403413246685, -202, 126, 63, 'n') / result: (0, 4708441672415424847, -139, 63)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 4066085502335877808471, 17, 72, 63, 'n') / result: (0, 7941573246749761345, 26, 63)

[3]libmpf._normalize1 / x: (1, 333462779166198932881, 18, 69, 63, 'n') / result: (1, 2605177962235929163, 25, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 28048975836403134373059042609435309005, -206, 125, 63, 'n') / result: (0, 6082152107564339419, -144, 63)

[3]libmpf._normalize1 / x: (0, 32318295262153052384908366699434343505, -207, 125, 63, 'n') / result: (0, 875989148356358111, -142, 60)

[2]libmpf._normalize. / x: (0, 532949958962168176134062080, 0, 89, 63, 'n') / result: (0, 7941573246749761345, 26, 63)

[2]libmpf._normalize. / x: (1, 87415266781744053056700416, 0, 87, 63, 'n') / result: (1, 2605177962235929163, 25, 62)

[3]libmpf._normalize1 / x: (0, 52866071709007242818107504224538940741, -118, 126, 63, 'n') / result: (0, 5731750979768011685, -55, 63)

[3]libmpf._normalize1 / x: (0, 39808767246646262395675102575067578063, -119, 125, 63, 'n') / result: (0, 8632150386556734083, -57, 63)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (1, 46866809159676273838395904483293347325, -115, 126, 63, 'n') / result: (1, 5081309630838455457, -52, 63)

[3]libmpf._normalize1 / x: (1, 70582505456431142683577479163835507435, -117, 126, 63, 'n') / result: (1, 7652570575533261563, -54, 63)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (0, 546872197314448808807, -103, 69, 63, 'n') / result: (0, 4272439041519131319, -96, 62)

[3]libmpf._normalize1 / x: (0, 823602258037406213261, -105, 70, 63, 'n') / result: (0, 6434392640917236041, -98, 63)

[3]libmpf._normalize1 / x: (0, 57101787622706262359402486455, -96, 96, 63, 'n') / result: (0, 3323761491495316287, -62, 62)

[3]libmpf._normalize1 / x: (1, 86482012497433572406235862711, -98, 97, 63, 'n') / result: (1, 5033915658564863983, -64, 63)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 197278937568324295065, 26, 68, 63, 'n') / result: (1, 6164966799010134221, 31, 63)

[3]libmpf._normalize1 / x: (1, 913911120176432423955, 25, 70, 63, 'n') / result: (1, 892491328297297289, 35, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 41747312872786060463664043487171522885, -212, 125, 63, 'n') / result: (0, 9052505462421342391, -150, 63)

[3]libmpf._normalize1 / x: (0, 6012706095284288815318028355363632065, -210, 123, 63, 'n') / result: (0, 5215191208819248289, -150, 63)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 47384512898827703119, 35, 66, 63, 'n') / result: (1, 2961532056176731445, 39, 62)

[3]libmpf._normalize1 / x: (0, 149593946996179039811, 33, 68, 63, 'n') / result: (0, 2337405421815297497, 39, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 62135535438565299294276908578235788265, -218, 126, 63, 'n') / result: (0, 3368374125552127401, -154, 62)

[3]libmpf._normalize1 / x: (0, 35796575823087858995277167708391423935, -218, 125, 63, 'n') / result: (0, 7762145054986788151, -156, 63)

[2]libmpf._normalize. / x: (1, 1628119465898841133113577308160, 0, 101, 63, 'n') / result: (1, 2961532056176731445, 39, 62)

[2]libmpf._normalize. / x: (0, 1285002220056292825872084238336, 0, 101, 63, 'n') / result: (0, 2337405421815297497, 39, 62)

[3]libmpf._normalize1 / x: (1, 58045471736518485636475243736190855827, -117, 126, 63, 'n') / result: (1, 6293302655967928775, -54, 63)

[3]libmpf._normalize1 / x: (0, 8505182370034545917274128154406552993, -117, 123, 63, 'n') / result: (0, 7377069762381492921, -57, 63)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (1, 12464171702037595989957988746245944975, -109, 124, 63, 'n') / result: (1, 2702736407516301805, -47, 62)

[3]libmpf._normalize1 / x: (0, 14610621672396045808446287514847148529, -112, 124, 63, 'n') / result: (0, 3168173551715117383, -50, 62)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (0, 486701193765302165895, -107, 69, 63, 'n') / result: (0, 3802353076291423171, -100, 62)

[3]libmpf._normalize1 / x: (1, 570515809602163162491, -110, 69, 63, 'n') / result: (1, 4457154762516899707, -103, 62)

[3]libmpf._normalize1 / x: (0, 913628601967102550826125020099, -100, 100, 63, 'n') / result: (0, 3323761491509149167, -62, 62)

[3]libmpf._normalize1 / x: (1, 2767424399922331471776699295611, -103, 102, 63, 'n') / result: (1, 1258478914643242875, -62, 61)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 190590370263922284385, 39, 68, 63, 'n') / result: (0, 5955949070747571387, 44, 63)

[3]libmpf._normalize1 / x: (0, 137956031199743829251, 39, 67, 63, 'n') / result: (0, 538890746873999333, 47, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 23120199232954529967888366865600127415, -222, 125, 63, 'n') / result: (0, 2506697023666699461, -159, 62)

[3]libmpf._normalize1 / x: (0, 53278624480874952922724349279586338665, -224, 126, 63, 'n') / result: (0, 1444120010230100121, -159, 61)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 75730237613031697437, 45, 67, 63, 'n') / result: (0, 2366569925407240545, 50, 62)

[3]libmpf._normalize1 / x: (1, 108739302948677546793, 46, 67, 63, 'n') / result: (1, 6796206434292346675, 50, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 17205729661733603695596572017550892315, -227, 124, 63, 'n') / result: (0, 7461795791379942581, -166, 63)

[3]libmpf._normalize1 / x: (0, 9912302228999991240638959776247126215, -227, 123, 63, 'n') / result: (0, 2149387922202939715, -165, 61)

[2]libmpf._normalize. / x: (0, 2664520858552567758161239426990080, 0, 112, 63, 'n') / result: (0, 2366569925407240545, 50, 62)

[2]libmpf._normalize. / x: (1, 7651848191252994948391066874675200, 0, 113, 63, 'n') / result: (1, 6796206434292346675, 50, 63)

[3]libmpf._normalize1 / x: (0, 46874229562741845659458379365566541895, -116, 126, 63, 'n') / result: (0, 5082114152550896563, -53, 63)

[3]libmpf._normalize1 / x: (1, 40538550939313849126758857738968778825, -116, 125, 63, 'n') / result: (1, 1098799624945459041, -51, 60)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (1, 12110493753225491850686394287020487399, -105, 124, 63, 'n') / result: (1, 2626044727423841737, -43, 62)

[3]libmpf._normalize1 / x: (0, 2618399664885376165152425889085488093, -103, 121, 63, 'n') / result: (0, 9084398736332933173, -45, 63)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (0, 637158091531451172011, -112, 70, 63, 'n') / result: (0, 4977797590089462281, -105, 63)

[3]libmpf._normalize1 / x: (1, 1102075319035190096619, -113, 70, 63, 'n') / result: (1, 4304981714981211315, -105, 62)

[3]libmpf._normalize1 / x: (0, 29236115262952259424829805163017, -105, 105, 63, 'n') / result: (0, 3323761491509715077, -62, 62)

[3]libmpf._normalize1 / x: (1, 11069697599693630868199493979315, -105, 104, 63, 'n') / result: (1, 5033915658574929179, -64, 63)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 452737214640278370855, 50, 69, 63, 'n') / result: (1, 7074018978754349545, 56, 63)

[3]libmpf._normalize1 / x: (1, 12866273272879845875, 50, 64, 63, 'n') / result: (1, 3216568318219961469, 52, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 51217055737253517973599153464097507115, -234, 126, 63, 'n') / result: (0, 1388241077466035829, -169, 61)

[3]libmpf._normalize1 / x: (0, 14753194015255800916459472801196021725, -233, 124, 63, 'n') / result: (0, 49985765632626505, -165, 56)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 517672993527048541565, 54, 69, 63, 'n') / result: (0, 4044320261930066731, 61, 62)

[3]libmpf._normalize1 / x: (0, 1713847396492143698145, 54, 71, 63, 'n') / result: (0, 6694716392547436321, 62, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 9528754555768096367021612161422493035, -237, 123, 63, 'n') / result: (0, 8264877112355934237, -177, 63)

[3]libmpf._normalize1 / x: (0, 343097535238506998057197041888279575, -233, 119, 63, 'n') / result: (0, 1162459665875035, -165, 51)

[2]libmpf._normalize. / x: (0, 9325567602992739998505344686371110912, 0, 123, 63, 'n') / result: (0, 4044320261930066731, 61, 62)

[2]libmpf._normalize. / x: (0, 30873929984847652290186349807805661184, 0, 125, 63, 'n') / result: (0, 6694716392547436321, 62, 63)

[3]libmpf._normalize1 / x: (1, 30327101132522626327008905701892387873, -116, 125, 63, 'n') / result: (1, 6576141786613726675, -54, 63)

[3]libmpf._normalize1 / x: (0, 64959391887887104658196217589876500157, -115, 126, 63, 'n') / result: (0, 7042911380818445215, -52, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (1, 5730869938959383092095577510478897975, -101, 123, 63, 'n') / result: (1, 4970737310441306667, -41, 63)

[3]libmpf._normalize1 / x: (0, 6137642773646929474008161602198596755, -99, 123, 63, 'n') / result: (0, 2661778251651183231, -38, 62)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (0, 334144171830067736289, -117, 69, 63, 'n') / result: (0, 1305250671211202095, -109, 61)

[3]libmpf._normalize1 / x: (1, 357861473638930608727, -115, 69, 63, 'n') / result: (1, 5591585525608290761, -109, 63)

[3]libmpf._normalize1 / x: (0, 467777844207237456038541826082351, -109, 109, 63, 'n') / result: (0, 6647522983019448703, -63, 63)

[3]libmpf._normalize1 / x: (1, 177115161595103685475644305119689, -109, 108, 63, 'n') / result: (1, 5033915658575088101, -64, 63)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 718435241605160957169, 61, 70, 63, 'n') / result: (0, 2806387662520159989, 69, 62)

[3]libmpf._normalize1 / x: (1, 261918652101398164671, 62, 68, 63, 'n') / result: (1, 4092478939084346323, 68, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 56729329448293783017000554787463580355, -245, 126, 63, 'n') / result: (0, 6150606223148602223, -182, 63)

[3]libmpf._normalize1 / x: (0, 7979012447407139489702256788099525, -233, 113, 63, 'n') / result: (0, 7086786666305701745, -183, 63)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (1, 92257448373986954724, 70, 67, 63, 'n') / result: (1, 2883045261687092335, 75, 62)

[3]libmpf._normalize1 / x: (1, 123365991421281789787, 69, 67, 63, 'n') / result: (1, 3855187231915055931, 74, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 42217175403381419920426448303648810545, -250, 125, 63, 'n') / result: (0, 4577195328854773747, -187, 62)

[3]libmpf._normalize1 / x: (0, 48643028814258073822190439060499944175, -251, 126, 63, 'n') / result: (0, 2636943875834679719, -187, 62)

[2]libmpf._normalize. / x: (1, 108918370499098161020305817001247668961280, 0, 137, 63, 'n') / result: (1, 2883045261687092335, 75, 62)

[2]libmpf._normalize. / x: (1, 72822427876730663695386257073737148923904, 0, 136, 63, 'n') / result: (1, 3855187231915055931, 74, 62)

[3]libmpf._normalize1 / x: (1, 16226610247947637816578845332089495101, -113, 124, 63, 'n') / result: (1, 7037170433160151475, -52, 63)

[3]libmpf._normalize1 / x: (1, 32850802082902098752296404354065151187, -113, 125, 63, 'n') / result: (1, 7123382197234757921, -51, 63)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (0, 42874268263009073759526208557028748825, -98, 126, 63, 'n') / result: (0, 4648437479448075237, -35, 63)

[3]libmpf._normalize1 / x: (0, 43399517201551842400258198308240516707, -97, 126, 63, 'n') / result: (0, 2352692541737226367, -33, 62)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (1, 579670168769097997291, -121, 69, 63, 'n') / result: (1, 566084149188572263, -111, 59)

[3]libmpf._normalize1 / x: (1, 586771657685086493261, -120, 69, 63, 'n') / result: (1, 9168307151329476457, -114, 63)

[3]libmpf._normalize1 / x: (0, 1871111376828949258146676276906905, -111, 111, 63, 'n') / result: (0, 1661880745754861673, -61, 61)

[3]libmpf._normalize1 / x: (1, 5667685171043327103055944871493481, -114, 113, 63, 'n') / result: (1, 1258478914643774061, -62, 61)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 49345575938648554225, 75, 66, 63, 'n') / result: (1, 3084098496165534639, 79, 62)

[3]libmpf._normalize1 / x: (0, 434634737736497366613, 74, 69, 63, 'n') / result: (0, 6791167777132771353, 80, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 31417432858330359008155529631222537005, -255, 125, 63, 'n') / result: (0, 3406284895891924649, -192, 62)

[3]libmpf._normalize1 / x: (0, 18099731651816957700801286294259547385, -255, 124, 63, 'n') / result: (0, 7849507351321837303, -194, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[2]libmpf._normalize. / x: (0, 111119812145488174212, 82, 67, 63, 'n') / result: (0, 868123532386626361, 89, 60)

[3]libmpf._normalize1 / x: (1, 35232535883110236651, 81, 65, 63, 'n') / result: (1, 8808133970777559163, 83, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 23380415150385383448408573546836273335, -260, 125, 63, 'n') / result: (0, 5069819379932166919, -198, 63)

[3]libmpf._normalize1 / x: (0, 53878270963548153155394719333729848745, -262, 126, 63, 'n') / result: (0, 5841493842844157993, -199, 63)

[2]libmpf._normalize. / x: (0, 537342439893631666366831140615533604406034432, 0, 149, 63, 'n') / result: (0, 868123532386626361, 89, 60)

[2]libmpf._normalize. / x: (1, 85187044639181751128889389104309079851925504, 0, 146, 63, 'n') / result: (1, 8808133970777559163, 83, 63)

[3]libmpf._normalize1 / x: (0, 614810037466861302439866747172883465011, -116, 129, 63, 'n') / result: (0, 8332229728593317517, -50, 63)

[3]libmpf._normalize1 / x: (0, 117620776310380223582206513933850982339, -115, 127, 63, 'n') / result: (0, 6376235060257289649, -51, 63)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (0, 52238837638377386396341433737135807023, -92, 126, 63, 'n') / result: (0, 5663746125564630019, -29, 63)

[3]libmpf._normalize1 / x: (0, 39975747057701826949336088745547900731, -93, 125, 63, 'n') / result: (0, 8668358361338266511, -31, 63)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (1, 556332382072056651505, -124, 69, 63, 'n') / result: (1, 2173173367468971295, -116, 61)

[3]libmpf._normalize1 / x: (1, 851466211391454981621, -126, 70, 63, 'n') / result: (1, 1663019944123935511, -117, 61)

[3]libmpf._normalize1 / x: (0, 59875564058526374088735346142227169, -116, 116, 63, 'n') / result: (0, 6647522983019446451, -63, 63)

[3]libmpf._normalize1 / x: (1, 45341481368346618486633823815969559, -117, 116, 63, 'n') / result: (1, 5033915658575096429, -64, 63)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 479371422516313931845, 85, 69, 63, 'n') / result: (1, 7490178476817405185, 91, 63)

[3]libmpf._normalize1 / x: (1, 3113391015095206247165, 83, 72, 63, 'n') / result: (1, 6080841826357824701, 92, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 34798757433131733501575221310159935385, -266, 125, 63, 'n') / result: (0, 7545777681759504251, -204, 63)

[3]libmpf._normalize1 / x: (0, 40095457461245137232400528674283575095, -267, 125, 63, 'n') / result: (0, 8694316417256421199, -205, 63)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 267478189382843214655, 92, 68, 63, 'n') / result: (1, 4179346709106925229, 98, 62)

[2]libmpf._normalize. / x: (0, 191403620894912798888, 93, 68, 63, 'n') / result: (0, 5981363152966024965, 98, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 51793499435358859161463822188445120165, -272, 126, 63, 'n') / result: (0, 5615462460844282233, -209, 63)

[3]libmpf._normalize1 / x: (0, 59676959942318343788557054860749141585, -273, 126, 63, 'n') / result: (0, 6470188961679197171, -210, 63)

[2]libmpf._normalize. / x: (1, 1324487841090317257190919274189376160140965707776, 0, 160, 63, 'n') / result: (1, 4179346709106925229, 98, 62)

[2]libmpf._normalize. / x: (0, 1895569647760099064758274625427279591685184552960, 0, 161, 63, 'n') / result: (0, 5981363152966024965, 98, 63)

[3]libmpf._normalize1 / x: (1, 85638478959801507911856374996551686729, -112, 127, 63, 'n') / result: (1, 4642471246828547841, -48, 63)

[3]libmpf._normalize1 / x: (0, 40135077556021912724318999440122566531, -112, 125, 63, 'n') / result: (0, 4351453827911316757, -49, 62)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (0, 34835621519997242701637718831846521157, -86, 125, 63, 'n') / result: (0, 944221413296595017, -21, 60)

[3]libmpf._normalize1 / x: (1, 32651919753819874665657726722959570089, -87, 125, 63, 'n') / result: (1, 3540128233291386523, -24, 62)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (1, 502507512654444028641, -128, 69, 63, 'n') / result: (1, 1962919971306421987, -120, 61)

[3]libmpf._normalize1 / x: (0, 471007384480442889187, -129, 69, 63, 'n') / result: (0, 459968148906682509, -119, 59)

[3]libmpf._normalize1 / x: (0, 958009024936421983495859120191488285, -120, 120, 63, 'n') / result: (0, 6647522983019446437, -63, 63)

[3]libmpf._normalize1 / x: (1, 181365925473386473499814818369787763, -119, 118, 63, 'n') / result: (1, 157309864330471763, -59, 58)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 471724150323848479083, 98, 69, 63, 'n') / result: (0, 3685344924405066243, 105, 62)

[3]libmpf._normalize1 / x: (0, 89263997416332839685, 98, 67, 63, 'n') / result: (0, 348687489907550155, 106, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 38543999579801941699479338325564574695, -277, 125, 63, 'n') / result: (0, 2089474404035081761, -213, 61)

[3]libmpf._normalize1 / x: (0, 44410760887306674444903887999297201965, -278, 126, 63, 'n') / result: (0, 4815024343575216499, -215, 63)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 15336789773608959051, 107, 64, 63, 'n') / result: (1, 3834197443402239763, 109, 62)

[3]libmpf._normalize1 / x: (1, 60161798724781695815, 107, 66, 63, 'n') / result: (1, 7520224840597711977, 110, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 14341953332019327143194183473278346815, -281, 124, 63, 'n') / result: (0, 1554957696026107357, -218, 61)

[3]libmpf._normalize1 / x: (0, 33049868567297990282185252195425991085, -283, 125, 63, 'n') / result: (0, 3583273930102486697, -220, 62)

[2]libmpf._normalize. / x: (1, 2488536417547464634695009558195317143644048673734656, 0, 171, 63, 'n') / result: (1, 3834197443402239763, 109, 62)

[2]libmpf._normalize. / x: (1, 9761809953827768689419768084433242083028506612072448, 0, 173, 63, 'n') / result: (1, 7520224840597711977, 110, 63)

[3]libmpf._normalize1 / x: (0, 15022995974419034140288159384095597187, -110, 124, 63, 'n') / result: (0, 1628796487270610441, -47, 61)

[3]libmpf._normalize1 / x: (1, 107288031675681799864077639001445651123, -111, 127, 63, 'n') / result: (1, 45438248837682743, -40, 56)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (0, 8416871583924475032662310279339682291, -80, 123, 63, 'n') / result: (0, 7300472365457939671, -20, 63)

[3]libmpf._normalize1 / x: (1, 234803984693049485842968750166745293, -73, 118, 63, 'n') / result: (1, 814639968999863621, -15, 60)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (1, 571623917733842386005, -134, 69, 63, 'n') / result: (1, 8931623714591287281, -128, 63)

[3]libmpf._normalize1 / x: (0, 510287737353080526885, -132, 69, 63, 'n') / result: (0, 7973245896141883233, -126, 63)

[3]libmpf._normalize1 / x: (0, 245250310383724027752006989645006297103, -128, 128, 63, 'n') / result: (0, 6647522983019446437, -63, 63)

[3]libmpf._normalize1 / x: (1, 23214838460593468598927055675690268831, -126, 125, 63, 'n') / result: (1, 2516957829287548207, -63, 62)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (1, 791235255013060484113, 109, 70, 63, 'n') / result: (1, 772690678723691879, 119, 60)

[3]libmpf._normalize1 / x: (0, 333112443679400840223, 110, 69, 63, 'n') / result: (0, 325305120780664883, 120, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 10673081549409731827333720148216145155, -286, 124, 63, 'n') / result: (0, 4628711281193993993, -225, 63)

[3]libmpf._normalize1 / x: (0, 24595251026826411373267901966708611255, -288, 125, 63, 'n') / result: (0, 5333244919222305781, -226, 63)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 15, 2, 4, 63, 'n') / result: (1, 15, 2, 4)

[3]libmpf._normalize1 / x: (0, 31108667427695271165, 120, 65, 63, 'n') / result: (0, 7777166856923817791, 122, 63)

[2]libmpf._normalize. / x: (0, 6710783369145404940, 121, 63, 63, 'n') / result: (0, 1677695842286351235, 123, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 31771033449405713346960648681081515095, -293, 125, 63, 'n') / result: (0, 6889244697591060827, -231, 63)

[3]libmpf._normalize1 / x: (0, 36606885249230007621338328059977435115, -294, 125, 63, 'n') / result: (0, 7937852903028548139, -232, 63)

[2]libmpf._normalize. / x: (0, 41350511656454879609188700153031686794579859291676606464, 0, 185, 63, 'n') / result: (0, 7777166856923817791, 122, 63)

[2]libmpf._normalize. / x: (0, 17840322255831783715840824204637485099163592860505210880, 0, 184, 63, 'n') / result: (0, 1677695842286351235, 123, 61)

[2]libmpf._normalize. / x: (0, 40261502719251709721683688708686171492, -109, 125, 63, 'n') / result: (0, 8730321743148749597, -47, 63)

[3]libmpf._normalize1 / x: (0, 107966235255137391915387584042794426329, -110, 127, 63, 'n') / result: (0, 5852861340935051021, -46, 63)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (1, 70851015434815591188607004313771675271, -76, 126, 63, 'n') / result: (1, 7681682485723107053, -13, 63)

[3]libmpf._normalize1 / x: (1, 47498956098594192147709381750376655703, -75, 126, 63, 'n') / result: (1, 5149847139288942307, -12, 63)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (0, 620874848952914929815, -137, 70, 63, 'n') / result: (0, 4850584757444647889, -130, 63)

[3]libmpf._normalize1 / x: (0, 416238313765143632831, -136, 69, 63, 'n') / result: (0, 6503723652580369263, -130, 63)

[3]libmpf._normalize1 / x: (0, 981001241534896111048605038195834985425, -130, 130, 63, 'n') / result: (0, 6647522983019446437, -63, 63)

[3]libmpf._normalize1 / x: (1, 371437415369495497556327148907057650833, -130, 129, 63, 'n') / result: (1, 2516957829287548207, -63, 62)

[2]libmpf._normalize. / x: (0, 6647522983019446437, -63, 63, 63, 'n') / result: (0, 6647522983019446437, -63, 63)

[2]libmpf._normalize. / x: (1, 2516957829287548207, -63, 62, 63, 'n') / result: (1, 2516957829287548207, -63, 62)

[3]libmpf._normalize1 / x: (0, 12073525261785259779, -63, 64, 63, 'n') / result: (0, 3018381315446314945, -61, 62)

[2]libmpf._normalize1 / x: (0, 7875897052094476445, -63, 63, 63, 'n') / result: (0, 7875897052094476445, -63, 63)

[3]libmpf._normalize1 / x: (0, 12073525261785259779, -63, 64, 63, 'n') / result: (0, 3018381315446314945, -61, 62)

[2]libmpf._normalize1 / x: (0, 7875897052094476445, -63, 63, 63, 'n') / result: (0, 7875897052094476445, -63, 63)

[3]libmpf._normalize1 / x: (0, 3018381315446314945, -61, 62, 53, 'n') / result: (0, 1473819001682771, -50, 51)

[3]libmpf._normalize1 / x: (0, 7875897052094476445, -63, 63, 53, 'n') / result: (0, 1922826428734003, -51, 51)

zeta_ / result: (1.30901423183862 + 0.853906469415301j) / count: 10567
zeta / count: 0 / s: Complex { re: 0.0, im: 60.0 }
gamma_ / s: (1.0, -60.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-60j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-60j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-60.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-8444249301319680, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8444249301319680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=8444249301319680, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 8444249301319680, -47, 53, 53, 'd') / result: (1, 15, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 8444249301319680, -47, 53, 53, 'd') / result: (1, 15, 2, 4)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 15, 2, 4)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-60.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 15, 2, 4)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 15, 2, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 15, 2, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 15, 2, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 15, 2, 4), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=553402322211286548480, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=600000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=600000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-60j) / result: (1.0 - 60.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-60j) / result: (1.0 - 60.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 15, 2, 4)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 15, 2, 4)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 15, 2, 4)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 15, 2, 4), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=360 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 15, 2, 4), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=4835703278458516698824704, y=-290142196707511001929482240, prec=82 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=82, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 15, 2, 4)), prec=82, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 15, 2, 4), prec=82, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 15, 2, 4), t=(1, 15, 2, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 225, 4, 8), prec=102, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3601 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3601, exp=0, bc=12, prec=102, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 3601, 0, 12, 102, 'd') / result: (0, 3601, 0, 12)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 3601, 0, 12, 102, 'd') / result: (0, 3601, 0, 12)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 3601, 0, 12), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3600 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3600, exp=0, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3600, 0, 12, 10, 'd') / result: (0, 225, 4, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3600, 0, 12, 10, 'd') / result: (0, 225, 4, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 3601, 0, 12), prec=82, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=3601, n=90 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=4457822081466654369911746330624, prec=102 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=102, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=41522995039814311553238817087972, exp=-102, prec=82, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=41522995039814311553238817087972 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=41522995039814311553238817087972, exp=-102, bc=106, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 41522995039814311553238817087972, -102, 106, 82, 'd') / result: (0, 2474963369358438942029405, -78, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 41522995039814311553238817087972, -102, 106, 82, 'd') / result: (0, 2474963369358438942029405, -78, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 2474963369358438942029405, -78, 82), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 15, 2, 4)), prec=82, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 15, 2, 4), x=(0, 1, 0, 1), prec=82, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 15, 2, 4), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 15, 2, 4), x=(0, 1, 0, 1), prec=82, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 15, 2, 4), t=(0, 1, 0, 1), prec=86, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15, exp=2, bc=4, prec=86, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 15, 2, 4, 86, 'd') / result: (0, 15, 2, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 15, 2, 4, 86, 'd') / result: (0, 15, 2, 4)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 15, 2, 4), prec=86, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 15, 2, 4), prec=122, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=362967858049001027694266247927219425553 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=362967858049001027694266247927219425553, exp=-134, bc=129, prec=122, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 362967858049001027694266247927219425553, -134, 129, 122, 'd') / result: (0, 1417843195503910264430727530965700881, -126, 121)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 362967858049001027694266247927219425553, -134, 129, 122, 'd') / result: (0, 1417843195503910264430727530965700881, -126, 121)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1417843195503910264430727530965700881, -126, 121), prec=122 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=88615199718994391526920470685356305, prec=122 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=2, prec=122 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=121 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=8263178817032396178448622352001459751, exp=-122, prec=86, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8263178817032396178448622352001459751 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8263178817032396178448622352001459751, exp=-122, bc=123, prec=86, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8263178817032396178448622352001459751, -122, 123, 86, 'd') / result: (0, 60122538831146056898059195, -85, 86)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8263178817032396178448622352001459751, -122, 123, 86, 'd') / result: (0, 60122538831146056898059195, -85, 86)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 60122538831146056898059195, -85, 86), prec=82, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=60122538831146056898059195, exp=-85, bc=86, prec=82, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 60122538831146056898059195, -85, 86, 82, 'd') / result: (0, 3757658676946628556128699, -81, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 60122538831146056898059195, -85, 86, 82, 'd') / result: (0, 3757658676946628556128699, -81, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 3757658676946628556128699, -81, 82), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2474963369358438942029405, -79, 82), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 3757658676946628556128699, -81, 82), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-441411065047302826910446085, exp=-82, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=441411065047302826910446085 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-901591164809952199227778358, exp=-82, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=901591164809952199227778358 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 441411065047302826910446085, -82, 89), (1, 450795582404976099613889179, -81, 89)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 441411065047302826910446085, -82, 89), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=78, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=504724264215736575421, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2923910426176874044615, exp=-203, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2923910426176874044615 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2923910426176874044615, exp=-203, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2923910426176874044615, -203, 72, 57, 'n') / result: (0, 89230664861354799, -188, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2923910426176874044615, -203, 72, 57, 'n') / result: (0, 89230664861354799, -188, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 450795582404976099613889179, -81, 89), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=450795582404976099613889179, exp=-81, mag=8, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=94, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=168780193016841413177980243, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-71467831974720347046980968, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=71467831974720347046980968 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=71467831974720347046980968, exp=-87, bc=86, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 71467831974720347046980968, -87, 86, 57, 'n') / result: (1, 133119210553765943, -58, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 71467831974720347046980968, -87, 86, 57, 'n') / result: (1, 133119210553765943, -58, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=137250106808201258287371280, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=137250106808201258287371280 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=137250106808201258287371280, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 137250106808201258287371280, -87, 87, 57, 'n') / result: (0, 31956030709715853, -55, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 137250106808201258287371280, -87, 87, 57, 'n') / result: (0, 31956030709715853, -55, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 89230664861354799, -188, 57), t=(1, 133119210553765943, -58, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=11878315663531213644053894525810457, exp=-246, bc=114, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 11878315663531213644053894525810457, -246, 114, 53, 'n') / result: (1, 5151398259147655, -185, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 11878315663531213644053894525810457, -246, 114, 53, 'n') / result: (1, 5151398259147655, -185, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 89230664861354799, -188, 57), t=(0, 31956030709715853, -55, 55), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2851457866557817223321517907928547, exp=-243, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2851457866557817223321517907928547, -243, 112, 53, 'n') / result: (0, 4946490901876587, -184, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2851457866557817223321517907928547, -243, 112, 53, 'n') / result: (0, 4946490901876587, -184, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 5151398259147655, -185, 53), (0, 4946490901876587, -184, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.05045131490175e-40 + 2.01733494893308e-40j) / count: 134
gamma__ / s: Complex { re: 1.0, im: -60.0 } / result: Complex { re: -1.0504513149017504e-40, im: 2.017334948933084e-40 }
zeta__ / s: Complex { re: 0.0, im: 60.0 } / result: Complex { re: 1.3090142318386198, im: 0.8539064694153011 } / z: Complex { re: 0.0, im: -0.0 }
zeta_ / s: (0.0, 70.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=70j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=70j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=70j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=70.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4925812092436480, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4925812092436480 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4925812092436480, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4925812092436480, -46, 53, 53, 'd') / result: (0, 35, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4925812092436480, -46, 53, 53, 'd') / result: (0, 35, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 35, 1, 6)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='70.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 35, 1, 6)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 35, 1, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 35, 1, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 35, 1, 6), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=322818021289917153280, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=700000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=700000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 70j / result: (0.0 + 70.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 70j / result: (0.0 + 70.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 35, 1, 6)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 35, 1, 6)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 35, 1, 6), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 35, 1, 6), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35, exp=1, bc=6, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 35, 1, 6, 10, 'd') / result: (0, 35, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 35, 1, 6, 10, 'd') / result: (0, 35, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 35, 1, 6), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 35, 1, 6), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: convert / f_locals: x=70j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 536 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=70.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4925812092436480, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4925812092436480 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4925812092436480, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4925812092436480, -46, 53, 53, 'd') / result: (0, 35, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4925812092436480, -46, 53, 53, 'd') / result: (0, 35, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 35, 1, 6)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='70.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 35, 1, 6)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 35, 1, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 35, 1, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 35, 1, 6), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=322818021289917153280, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=700000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=700000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 70j / result: (0.0 + 70.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 70j / result: (0.0 + 70.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 537 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __nonzero__ / f_locals: s=mpc(real='0.0', imag='70.0') / f_lineno: 426 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 540 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_is_nonzero / f_locals: z=((0, 0, 0, 0), (0, 35, 1, 6)) / f_lineno: 84 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 427 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _im / f_locals: x=mpc(real='0.0', imag='70.0') / f_lineno: 75 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 76 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 35, 1, 6) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 77 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 35, 1, 6) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('70.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 35, 1, 6), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35, exp=1, bc=6, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 35, 1, 6, 53, 'n') / result: (0, 35, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 35, 1, 6, 53, 'n') / result: (0, 35, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _re / f_locals: x=mpc(real='0.0', imag='70.0') / f_lineno: 70 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 71 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 72 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('70.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 35, 1, 6), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35, exp=1, bc=6, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 35, 1, 6, 53, 'n') / result: (0, 35, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 35, 1, 6, 53, 'n') / result: (0, 35, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('70.0'), t=26500 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('70.0'), t=26500 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=26500 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=26500, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=26500, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26500 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 35, 1, 6), t=(0, 6625, 2, 13) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 35, 1, 6), t=(0, 6625, 2, 13) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: s=mpc(real='0.0', imag='70.0'), t=1 / f_lineno: 442 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 567 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpf('1.0') / f_lineno: 128 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('0.0'), other=mpf('1.0') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpc(real='0.0', imag='70.0') / f_lineno: 408 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 569 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 35, 1, 6)), prec=53, rnd='n' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 411 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 35, 1, 6), prec=53, rnd='n' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 35, 1, 6), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35, exp=1, bc=6, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 35, 1, 6, 53, 'n') / result: (0, 35, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 35, 1, 6, 53, 'n') / result: (0, 35, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('70.0'), other=mpf('+inf') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 570 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 35, 1, 6), t=(0, 0, -456, -2) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: isnan / f_locals: x=mpf('70.0') / f_lineno: 318 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 576 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='70.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='70.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('0.0'), t=106 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=106 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=106 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=106, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 53, 1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _hurwitz / f_locals: s=mpc(real='0.0', imag='70.0'), a=1, d=0, kwargs={} / f_lineno: 582 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 580 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 584 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _convert_param / f_locals: x=1 / f_lineno: 1060 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 590 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='70.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='70.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=0 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=0 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=0 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 603 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _hurwitz_em / f_locals: s=mpc(real='0.0', imag='70.0'), a=1, d=0, prec=63, verbose=None / f_lineno: 660 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 604 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 662 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: isint / f_locals: x=mpc(real='0.0', imag='70.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 670 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __sub__ / f_locals: s=mpc(real='0.0', imag='70.0'), t=1 / f_lineno: 479 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 672 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 482 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_sub_mpf / f_locals: z=((0, 0, 0, 0), (0, 35, 1, 6)), p=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 101 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 487 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1, 0, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __add__ / f_locals: self=mpf('1.0'), other=0 / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=63, rnd='n', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _zetasum / f_locals: s=mpc(real='0.0', imag='70.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 725 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='70.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='70.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='70.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=63, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=31.5 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=31.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8866461766385664, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8866461766385664 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8866461766385664, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 63, -1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _zetasum_fast / f_locals: s=mpc(real='0.0', imag='70.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 1291 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 741 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: isint / f_locals: x=mpf('1.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: __int__ / f_locals: s=mpf('1.0') / f_lineno: 143 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1294 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_zetasum / f_locals: s=((0, 0, 0, 0), (0, 35, 1, 6)), a=1, n=20, derivatives=[0], reflect=False, prec=63 / f_lineno: 1338 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1351 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 35, 1, 6), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1352 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: zetasum_sieved / f_locals: critical_line=False, sre=0, sim=661131307601750329917440, a=1, n=20, wp=73 / f_lineno: 1278 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1356 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: primesieve / f_locals: n=21 / f_lineno: 1251 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1281 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1286 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1287 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-458261301844063178846770, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1647005510337196170523, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-726326978954498956648880, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=624861702456474830067, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1064049791551388126817780, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4124341658832099028836, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1286502121320456174882510, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4208289641893264682151, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1585323637197242536779850, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2101810767945854408871, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=578423972691467524082925894528674659849854097593746066874067695865105067331772427597040559134750874241642310521895438516224, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=578423972691467524082925894528674659849854097593746066874067695865105067331772427597040559134750874241642310521895438516224 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1482907413062162852525612686929575544135251351567743559886171137582039058036392214162102395479929546487651377279218688968886633626141741307041683632753508809546682402074513824515418947706072858096790468328020698518992723252883879853271455885705873719107861587712 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1482907413062162852525612686929575544135251351567743559886171137582039058036392214162102395479929546487651377279218688968886633626141741307041683632753508809546682402074513824515418947706072858096790468328020698518992723252883879853271455885705873719107861587712 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1695768322630815106609530, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10343140135508865228815, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1873126042870613883122050, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11014442097413459690731, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3078041854679595038869855653027590154201009305052434427294145952996451965444074703998537261109924295071596580991515012104192, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3078041854679595038869855653027590154201009305052434427294145952996451965444074703998537261109924295071596580991515012104192 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=108791960780507743541832226183517029676938328056426772510711803367266814762947165726697293772209223486984121396147285188733960855140620840964860916022535962498912649842547889280012701712481841307005323877211460231549215101489538451190388083666093253627768735327174400 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=108791960780507743541832226183517029676938328056426772510711803367266814762947165726697293772209223486984121396147285188733960855140620840964860916022535962498912649842547889280012701712481841307005323877211460231549215101489538451190388083666093253627768735327174400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1946660792449871678998580, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11658451768865401720216, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (1, 8188238554099223518204, -73, 73, 63, 'n') / result: (1, 7996326712987522967, -63, 63)

[2]libmpf._normalize. / x: (0, 25784212154163111548146, -73, 75, 63, 'n') / result: (0, 6294973670449978405, -61, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 7996326712987522967, -63, 63, 63, 'n') / result: (1, 7996326712987522967, -63, 63)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[2]libmpf._normalize. / x: (0, 29894728251118529325738970, -83, 85, 63, 'n') / result: (0, 1781864658064754565, -59, 61)

[3]libmpf._normalize1 / x: (0, 763879266319838071703, -71, 70, 63, 'n') / result: (0, 5967806768123734935, -64, 63)

[3]libmpf._normalize1 / x: (0, 858612087794480947945, -74, 70, 63, 'n') / result: (0, 3353953467947191203, -66, 62)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (1, 127724058690081607226655, -69, 77, 73, 'd') / result: (1, 7982753668130100451665, -65, 73)

[2]libmpf._normalize. / x: (1, 9133576129402974764622337590, -93, 93, 63, 'n') / result: (1, 2126576409070513855, -61, 61)

[2]libmpf._normalize. / x: (1, 3828511682601616524977593885, -93, 92, 63, 'n') / result: (1, 1782789678592987603, -62, 61)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[2]libmpf._normalize1 / x: (1, 3649258819716617349333, -70, 72, 73, 'd') / result: (1, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (0, 127724058690081607226655, -69, 77, 73, 'd') / result: (0, 7982753668130100451665, -65, 73)

[2]libmpf._normalize. / x: (0, 3516875111606193962782702, -86, 82, 67, 'n') / result: (0, 107326510974310118493, -71, 67)

[2]libmpf._normalize. / x: (1, 146137218070447596233957401482, -97, 97, 67, 'n') / result: (1, 17012611272564110839, -64, 64)

[2]libmpf._normalize. / x: (0, 61256186921625864399641502172, -97, 96, 67, 'n') / result: (0, 57049269714975603297, -67, 66)

[3]libmpf._normalize1 / x: (1, 1825904210446524072450328241485275645627, -135, 131, 63, 'n') / result: (1, 6186404099114222123, -67, 63)

[3]libmpf._normalize1 / x: (0, 6122899072140706972948499854904231471421, -138, 133, 63, 'n') / result: (0, 162071788962998873, -63, 58)

[3]libmpf._normalize1 / x: (1, 175333999539444515637, -67, 68, 63, 'n') / result: (1, 2739593742803820557, -61, 62)

[3]libmpf._normalize1 / x: (1, 217820717780701765289, -66, 68, 63, 'n') / result: (1, 6806897430646930165, -61, 63)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[2]libmpf._normalize. / x: (0, 53839226506957625555416906614242717474, -122, 126, 73, 'd') / result: (0, 747169361200417458327, -66, 70)

[3]libmpf._normalize1 / x: (1, 554085489668826088295, -72, 69, 63, 'n') / result: (1, 4328792888037703815, -65, 62)

[3]libmpf._normalize1 / x: (0, 688350801262499273847, -71, 70, 63, 'n') / result: (0, 5377740634863275577, -64, 63)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (1, 2126576409070513855, -62, 61, 63, 'n') / result: (1, 2126576409070513855, -62, 61)

[2]libmpf._normalize1 / x: (1, 1782789678592987603, -63, 61, 63, 'n') / result: (1, 1782789678592987603, -63, 61)

[3]libmpf._normalize1 / x: (1, 21341404160601814655, -65, 65, 63, 'n') / result: (1, 166729720004701677, -58, 58)

[2]libmpf._normalize1 / x: (0, 1812161277677300371, -64, 61, 63, 'n') / result: (0, 1812161277677300371, -64, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 7132438322056734658627705415145617565, -127, 123, 63, 'n') / result: (1, 1546601024778555531, -65, 61)

[3]libmpf._normalize1 / x: (1, 5979393625137409153332344876049656409, -128, 123, 63, 'n') / result: (1, 162071788962998873, -63, 58)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 70, 0, 7, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 5672512613704960555, -62, 63, 63, 'n') / result: (1, 5672512613704960555, -62, 63)

[3]libmpf._normalize1 / x: (0, 54131035867249443585, -64, 66, 63, 'n') / result: (0, 211449358856443139, -56, 58)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (1, 34879796146634886724935755470103848775, -127, 125, 63, 'n') / result: (1, 7563350151606614073, -65, 63)

[3]libmpf._normalize1 / x: (0, 1300184069124925588759022976477706495, -121, 120, 63, 'n') / result: (0, 9021839311208240597, -64, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (0, 7563350151606614073, -66, 63, 63, 'n') / result: (0, 7563350151606614073, -66, 63)

[2]libmpf._normalize1 / x: (1, 9021839311208240597, -65, 63, 63, 'n') / result: (1, 9021839311208240597, -65, 63)

[3]libmpf._normalize1 / x: (1, 35119458169597015239, -66, 65, 63, 'n') / result: (1, 4389932271199626905, -63, 62)

[2]libmpf._normalize1 / x: (1, 5397516755853639855, -65, 63, 63, 'n') / result: (1, 5397516755853639855, -65, 63)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 1225, 2, 11, 63, 'n') / result: (1, 1225, 2, 11)

[2]libmpf._normalize1 / x: (0, 35, 1, 6, 63, 'n') / result: (0, 35, 1, 6)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 5187227870586716115670508799010193793, -131, 122, 63, 'n') / result: (1, 8998405962347959453, -72, 63)

[3]libmpf._normalize1 / x: (1, 543581238648855377575667716004514219, -129, 119, 63, 'n') / result: (1, 7543705086277765725, -73, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (0, 3675, 2, 12, 63, 'n') / result: (0, 3675, 2, 12)

[2]libmpf._normalize1 / x: (0, 85715, 2, 17, 63, 'n') / result: (0, 85715, 2, 17)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 30180234883413621036323509969882291959, -138, 125, 63, 'n') / result: (1, 6544295245343970511, -76, 63)

[3]libmpf._normalize1 / x: (1, 25301235835292177574126174284214917175, -139, 125, 63, 'n') / result: (1, 5486330971838375073, -77, 63)

[2]libmpf._normalize. / x: (0, 14700, 0, 14, 63, 'n') / result: (0, 3675, 2, 12)

[2]libmpf._normalize. / x: (0, 342860, 0, 19, 63, 'n') / result: (0, 85715, 2, 17)

[3]libmpf._normalize1 / x: (0, 422160289197848136126345, -75, 79, 63, 'n') / result: (0, 3220827401716981019, -58, 62)

[3]libmpf._normalize1 / x: (1, 1142050800230822893094005, -75, 80, 63, 'n') / result: (1, 4356578064845363209, -57, 62)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (1, 3960918585670936861347752536130386379, -123, 122, 63, 'n') / result: (1, 6871098456996226173, -64, 63)

[3]libmpf._normalize1 / x: (0, 5357645373289282029262507496480502169, -122, 123, 63, 'n') / result: (0, 1161754150625430189, -60, 61)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize. / x: (0, 293166867498505650048, -74, 68, 63, 'n') / result: (0, 2290366152332075391, -67, 61)

[2]libmpf._normalize. / x: (1, 198272708373406752256, -72, 68, 63, 'n') / result: (1, 387251383541810063, -63, 59)

[3]libmpf._normalize1 / x: (1, 67948550186861955089, -67, 66, 63, 'n') / result: (1, 4246784386678872193, -63, 62)

[2]libmpf._normalize1 / x: (1, 6946522290020880107, -65, 63, 63, 'n') / result: (1, 6946522290020880107, -65, 63)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (0, 5989025, 2, 23, 63, 'n') / result: (0, 5989025, 2, 23)

[2]libmpf._normalize1 / x: (1, 514395, 2, 19, 63, 'n') / result: (1, 514395, 2, 19)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 21949261733391724389138747214110614733, -142, 125, 63, 'n') / result: (1, 4759487451159251281, -80, 63)

[3]libmpf._normalize1 / x: (1, 18400898789303401873006477697960082819, -143, 124, 63, 'n') / result: (1, 1995029444304863663, -80, 61)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 29981875, 3, 25, 63, 'n') / result: (1, 29981875, 3, 25)

[2]libmpf._normalize1 / x: (1, 208587085, 3, 28, 63, 'n') / result: (1, 208587085, 3, 28)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 15963099442466708647561076192429681043, -146, 124, 63, 'n') / result: (1, 6922890838049820045, -85, 63)

[3]libmpf._normalize1 / x: (1, 6691235923383055226852714932707956589, -146, 123, 63, 'n') / result: (1, 1450930504948991755, -84, 61)

[2]libmpf._normalize. / x: (1, 239855000, 0, 28, 63, 'n') / result: (1, 29981875, 3, 25)

[2]libmpf._normalize. / x: (1, 1668696680, 0, 31, 63, 'n') / result: (1, 208587085, 3, 28)

[3]libmpf._normalize1 / x: (1, 397729481384721579367283975, -82, 89, 63, 'n') / result: (1, 2963315556829583491, -55, 62)

[3]libmpf._normalize1 / x: (0, 1531028853748154152310000075, -82, 91, 63, 'n') / result: (0, 5703526935533263357, -54, 63)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (1, 10412099749805226528569226810750204873, -122, 123, 63, 'n') / result: (1, 2257764233774920755, -60, 61)

[3]libmpf._normalize1 / x: (0, 20040286037579242986222686888348498871, -121, 124, 63, 'n') / result: (0, 8691088663669734639, -60, 63)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (0, 822026871248184481109, -78, 70, 63, 'n') / result: (0, 6422084931626441259, -71, 63)

[3]libmpf._normalize1 / x: (1, 791082203697582957363, -76, 70, 63, 'n') / result: (1, 3090164858193683427, -68, 62)

[3]libmpf._normalize1 / x: (1, 1080754718058164840149, -71, 70, 63, 'n') / result: (1, 4221698117414706407, -63, 62)

[3]libmpf._normalize1 / x: (1, 58662343178360724283, -68, 66, 63, 'n') / result: (1, 7332792897295090535, -65, 63)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 14451186575, 3, 34, 63, 'n') / result: (1, 14451186575, 3, 34)

[2]libmpf._normalize1 / x: (0, 3141666675, 3, 32, 63, 'n') / result: (0, 3141666675, 3, 32)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 23219053734497030759783933237357064135, -151, 125, 63, 'n') / result: (1, 1258707425099967281, -87, 61)

[3]libmpf._normalize1 / x: (1, 4866353398824040165288697539055531265, -150, 122, 63, 'n') / result: (1, 8441777483339588393, -91, 63)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (0, 153311893350, 4, 38, 63, 'n') / result: (0, 76655946675, 5, 37)

[2]libmpf._normalize. / x: (0, 496366530100, 4, 39, 63, 'n') / result: (0, 124091632525, 6, 37)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 4221646133544914683901983631151029043, -153, 122, 63, 'n') / result: (1, 3661694327563541181, -93, 62)

[3]libmpf._normalize1 / x: (1, 28313328865885324598958045718490506779, -157, 125, 63, 'n') / result: (1, 1534868633334470617, -93, 61)

[2]libmpf._normalize. / x: (0, 2452990293600, 0, 42, 63, 'n') / result: (0, 76655946675, 5, 37)

[2]libmpf._normalize. / x: (0, 7941864481600, 0, 43, 63, 'n') / result: (0, 124091632525, 6, 37)

[3]libmpf._normalize1 / x: (0, 100238063729919390995445512675, -88, 97, 63, 'n') / result: (0, 5834623224213683919, -54, 63)

[3]libmpf._normalize1 / x: (1, 1026428061939801168696819372525, -88, 100, 63, 'n') / result: (1, 7468247072682433417, -51, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (1, 7175320092239459349997732574455065279, -119, 123, 63, 'n') / result: (1, 6223598105827929513, -59, 63)

[3]libmpf._normalize1 / x: (0, 9184322828600225707860182030277487897, -116, 123, 63, 'n') / result: (0, 7966130210861262311, -56, 63)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (0, 647412262640538394545, -81, 70, 63, 'n') / result: (0, 5057908301879206207, -74, 63)

[3]libmpf._normalize1 / x: (1, 828679856347624899705, -78, 70, 63, 'n') / result: (1, 6474061377715819529, -71, 63)

[3]libmpf._normalize1 / x: (1, 8640979836163439515329, -74, 73, 63, 'n') / result: (1, 4219228435626679451, -63, 62)

[3]libmpf._normalize1 / x: (1, 475772806804601613769, -71, 69, 63, 'n') / result: (1, 7433950106321900215, -65, 63)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (0, 16836236926775, 5, 44, 63, 'n') / result: (0, 16836236926775, 5, 44)

[2]libmpf._normalize. / x: (1, 3551599561300, 6, 42, 63, 'n') / result: (1, 887899890325, 8, 40)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12281152388494297261955411157171430743, -159, 124, 63, 'n') / result: (1, 332881302505776471, -94, 59)

[3]libmpf._normalize1 / x: (1, 5147877975615513563751822264084382251, -159, 122, 63, 'n') / result: (1, 8930144775764192681, -100, 63)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 78989229249525, 8, 47, 63, 'n') / result: (1, 78989229249525, 8, 47)

[2]libmpf._normalize1 / x: (1, 560855495946725, 6, 49, 63, 'n') / result: (1, 560855495946725, 6, 49)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1116468398954027023814128287015584613, -160, 120, 63, 'n') / result: (1, 7747055767407161507, -103, 63)

[3]libmpf._normalize1 / x: (1, 29951290039944806190016225936840185243, -166, 125, 63, 'n') / result: (1, 3247325373005160975, -103, 62)

[2]libmpf._normalize. / x: (1, 20221242687878400, 0, 55, 63, 'n') / result: (1, 78989229249525, 8, 47)

[2]libmpf._normalize. / x: (1, 35894751740590400, 0, 55, 63, 'n') / result: (1, 560855495946725, 6, 49)

[3]libmpf._normalize1 / x: (0, 626455573505123117568101663079825, -97, 109, 63, 'n') / result: (0, 8902469140609854287, -51, 63)

[3]libmpf._normalize1 / x: (0, 5370993717900495573492980211862075, -97, 113, 63, 'n') / result: (0, 2385200356292081191, -46, 62)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (0, 49764112079068786225355145107930395435, -117, 126, 63, 'n') / result: (0, 5395435842793851083, -54, 63)

[3]libmpf._normalize1 / x: (0, 13333085011224502950120440332794937955, -112, 124, 63, 'n') / result: (0, 1445575973510352237, -49, 61)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (1, 399119896599182024213, -82, 69, 63, 'n') / result: (1, 779531048045277391, -73, 60)

[3]libmpf._normalize1 / x: (1, 427737925079249695171, -79, 69, 63, 'n') / result: (1, 6683405079363276487, -73, 63)

[3]libmpf._normalize1 / x: (1, 4321269449129765035215, -73, 72, 63, 'n') / result: (1, 4219989696415786167, -63, 62)

[3]libmpf._normalize1 / x: (1, 1909774632297769731527, -73, 71, 63, 'n') / result: (1, 3730028578706581507, -64, 62)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 18208136231643925, 7, 55, 63, 'n') / result: (1, 18208136231643925, 7, 55)

[2]libmpf._normalize1 / x: (0, 27164683653387525, 6, 55, 63, 'n') / result: (0, 27164683653387525, 6, 55)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 25983264557475538009070072267630622921, -169, 125, 63, 'n') / result: (1, 1408555594074029365, -105, 61)

[3]libmpf._normalize1 / x: (1, 10891378196343565887583532474118902925, -169, 124, 63, 'n') / result: (1, 295211397545923725, -104, 59)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (0, 1132845290185002625, 7, 60, 63, 'n') / result: (0, 1132845290185002625, 7, 60)

[2]libmpf._normalize1 / x: (0, 1138746117948137125, 7, 60, 63, 'n') / result: (0, 1138746117948137125, 7, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 4724229919541006911044918000291676095, -171, 122, 63, 'n') / result: (1, 8195232547339807215, -112, 63)

[3]libmpf._normalize1 / x: (1, 990125290576687807962139315828991175, -170, 120, 63, 'n') / result: (1, 3435187171443476073, -112, 62)

[2]libmpf._normalize. / x: (0, 145004197143680336000, 0, 67, 63, 'n') / result: (0, 1132845290185002625, 7, 60)

[2]libmpf._normalize. / x: (0, 145759503097361552000, 0, 67, 63, 'n') / result: (0, 1138746117948137125, 7, 60)

[2]libmpf._normalize. / x: (1, 5372124537318242015083610406908429250, -105, 123, 63, 'n') / result: (1, 4659575275378498665, -45, 63)

[2]libmpf._normalize. / x: (1, 13223824857039111386360139648514048500, -105, 124, 63, 'n') / result: (1, 5734919855427847863, -44, 63)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (0, 5439030117636491183321201654768507115, -107, 123, 63, 'n') / result: (0, 4717606615804457989, -47, 63)

[3]libmpf._normalize1 / x: (0, 6694258590632986057439591175676110453, -106, 123, 63, 'n') / result: (0, 5806343765715227653, -46, 63)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (1, 338403314398505287561, -82, 69, 63, 'n') / result: (1, 2643775893738322559, -75, 62)

[3]libmpf._normalize1 / x: (1, 416500597627738843775, -81, 69, 63, 'n') / result: (1, 3253910918966709717, -74, 62)

[3]libmpf._normalize1 / x: (1, 17287721572412798462591, -75, 74, 63, 'n') / result: (1, 8441270299029686749, -64, 63)

[3]libmpf._normalize1 / x: (1, 3822803175514506172885, -74, 72, 63, 'n') / result: (1, 7466412452176769869, -65, 63)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 67250930064334569875, 7, 66, 63, 'n') / result: (0, 4203183129020910617, 11, 62)

[3]libmpf._normalize1 / x: (1, 91825377610379692125, 7, 67, 63, 'n') / result: (1, 2869543050324365379, 12, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 27486428622784040211240410850763929645, -178, 125, 63, 'n') / result: (1, 5960169125338041611, -116, 63)

[3]libmpf._normalize1 / x: (1, 11521457926710549039019608439086585819, -178, 124, 63, 'n') / result: (1, 4996635885735965197, -117, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (1, 113043556148415520116, 13, 67, 63, 'n') / result: (1, 7065222259275970007, 17, 63)

[3]libmpf._normalize1 / x: (1, 112676892911839487047, 12, 67, 63, 'n') / result: (1, 1760576451747491985, 18, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19990129907479301972116112752187148033, -182, 124, 63, 'n') / result: (1, 2167334227395651495, -119, 61)

[3]libmpf._normalize1 / x: (1, 16758484257033525874632707414312561991, -183, 124, 63, 'n') / result: (1, 3633917007807974689, -121, 62)

[2]libmpf._normalize. / x: (1, 926052811967819940757504, 0, 80, 63, 'n') / result: (1, 7065222259275970007, 17, 63)

[2]libmpf._normalize. / x: (1, 461524553366894538915840, 0, 79, 63, 'n') / result: (1, 1760576451747491985, 18, 61)

[3]libmpf._normalize1 / x: (0, 24227607341821460363423597241579053265, -103, 125, 63, 'n') / result: (0, 2626762451412858455, -40, 62)

[3]libmpf._normalize1 / x: (0, 56200492162479456038068477571505293423, -104, 126, 63, 'n') / result: (0, 761658696216434891, -38, 60)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (0, 14132770949395851878419384021490602525, -102, 124, 63, 'n') / result: (0, 3064556193315001531, -40, 62)

[3]libmpf._normalize1 / x: (0, 4097952553514127003020483254558596505, -100, 122, 63, 'n') / result: (0, 7108814498020058983, -41, 63)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (1, 618413620573062934799, -84, 70, 63, 'n') / result: (1, 2415678205363527089, -76, 62)

[3]libmpf._normalize1 / x: (1, 717263354689444831101, -84, 70, 63, 'n') / result: (1, 5603619958511287743, -77, 63)

[3]libmpf._normalize1 / x: (1, 34577858823030960450993, -76, 75, 63, 'n') / result: (1, 8441860064216543079, -64, 63)

[3]libmpf._normalize1 / x: (1, 30588029024074560671167, -77, 75, 63, 'n') / result: (1, 7467780523455703289, -65, 63)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 154632813874061267809, 17, 68, 63, 'n') / result: (1, 4832275433564414619, 22, 63)

[2]libmpf._normalize. / x: (0, 270170272947376346050, 18, 68, 63, 'n') / result: (0, 4221410514802755407, 24, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 7269138148174291626528945861517798485, -185, 123, 63, 'n') / result: (1, 6304972297878258895, -125, 63)

[3]libmpf._normalize1 / x: (1, 12187988550569837000647592701667460867, -187, 124, 63, 'n') / result: (1, 5285697465902508639, -126, 63)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 624823400107336659313, 23, 70, 63, 'n') / result: (0, 4881432813338567651, 30, 63)

[3]libmpf._normalize1 / x: (0, 50930145760277360269, 23, 66, 63, 'n') / result: (0, 3183134110017335017, 27, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 21146583703779757460517821355300500685, -191, 124, 63, 'n') / result: (1, 573179299807114445, -126, 59)

[3]libmpf._normalize1 / x: (1, 17727983346283399275193750051492302717, -192, 124, 63, 'n') / result: (1, 7688287223130921657, -131, 63)

[2]libmpf._normalize. / x: (0, 5241398572727605159132135424, 0, 93, 63, 'n') / result: (0, 4881432813338567651, 30, 63)

[2]libmpf._normalize. / x: (0, 427233028165828746596581376, 0, 89, 63, 'n') / result: (0, 3183134110017335017, 27, 62)

[3]libmpf._normalize1 / x: (1, 691798828645688991590693360997195822751, -104, 130, 63, 'n') / result: (1, 4687811205878645137, -37, 63)

[3]libmpf._normalize1 / x: (1, 44827883850850452850598573654375599967, -101, 126, 63, 'n') / result: (1, 1215062226475498035, -36, 61)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (0, 38330826642332369525315471545732515465, -97, 125, 63, 'n') / result: (0, 259739784492387553, -30, 58)

[3]libmpf._normalize1 / x: (0, 9935199502973412250979647551774498075, -96, 123, 63, 'n') / result: (0, 4308705954080270973, -35, 62)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (1, 894537680999502101753, -86, 70, 63, 'n') / result: (1, 3494287816404305085, -78, 62)

[3]libmpf._normalize1 / x: (1, 927442594086090638049, -87, 70, 63, 'n') / result: (1, 3622822633148791555, -79, 62)

[3]libmpf._normalize1 / x: (1, 138314929579940246111421, -78, 77, 63, 'n') / result: (1, 8442073338619399787, -64, 63)

[3]libmpf._normalize1 / x: (1, 122355738918931391478531, -79, 77, 63, 'n') / result: (1, 3734000821500591781, -64, 62)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 181476274949707333465, 28, 68, 63, 'n') / result: (1, 5671133592178354171, 33, 63)

[3]libmpf._normalize1 / x: (1, 2781349387119857909815, 27, 72, 63, 'n') / result: (1, 169760094428702265, 41, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1922416700343614314592529214118227335, -192, 121, 63, 'n') / result: (1, 3334861380695938589, -133, 62)

[3]libmpf._normalize1 / x: (1, 25786157594594035310287441929792583371, -197, 125, 63, 'n') / result: (1, 2795740808411244239, -134, 62)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 184460172167968182629, 37, 68, 63, 'n') / result: (1, 5764380380249005707, 42, 63)

[3]libmpf._normalize1 / x: (0, 546158349116224634705, 34, 69, 63, 'n') / result: (0, 8533724204941009917, 40, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11184969892908301466415265112329032567, -199, 124, 63, 'n') / result: (1, 2425353731415228065, -137, 62)

[3]libmpf._normalize1 / x: (1, 9376784579852376476773065562465229517, -200, 123, 63, 'n') / result: (1, 8133064169923619605, -140, 63)

[2]libmpf._normalize. / x: (1, 25352013020030488420436334870528, 0, 105, 63, 'n') / result: (1, 5764380380249005707, 42, 63)

[2]libmpf._normalize. / x: (0, 9382928991566141235898028654592, 0, 103, 63, 'n') / result: (0, 8533724204941009917, 40, 63)

[3]libmpf._normalize1 / x: (0, 516786493432292686269252972197370765345, -100, 129, 63, 'n') / result: (0, 875470373266339999, -31, 60)

[3]libmpf._normalize1 / x: (0, 5487475845769620691423010307778644525, -98, 123, 63, 'n') / result: (0, 297476661672257681, -34, 59)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (0, 1733908831174798512703603914097872551, -86, 121, 63, 'n') / result: (0, 6015704709284858511, -28, 63)

[3]libmpf._normalize1 / x: (0, 589166037472528858479780251946645769, -89, 119, 63, 'n') / result: (0, 8176321251614616349, -33, 63)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (1, 541645617975572235867, -87, 69, 63, 'n') / result: (1, 8463212780868316185, -81, 63)

[3]libmpf._normalize1 / x: (1, 736184502251620526151, -92, 70, 63, 'n') / result: (1, 5751441423840785361, -85, 63)

[3]libmpf._normalize1 / x: (1, 1106527899852302837197849, -81, 80, 63, 'n') / result: (1, 8442137907808706949, -64, 63)

[3]libmpf._normalize1 / x: (1, 7830773042253032895493073, -85, 83, 63, 'n') / result: (1, 3734003564001575897, -64, 62)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 494669280101401541133, 41, 69, 63, 'n') / result: (0, 966150937698049885, 50, 60)

[3]libmpf._normalize1 / x: (0, 1468953194985724429371, 40, 71, 63, 'n') / result: (0, 1434524604478246513, 50, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 8134523558478764703762180118406712195, -203, 123, 63, 'n') / result: (1, 7055574491389754371, -143, 63)

[3]libmpf._normalize1 / x: (1, 27277918777752367934565070206774334815, -206, 125, 63, 'n') / result: (1, 2957477879972225311, -143, 62)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (0, 41513002717456178990, 51, 66, 63, 'n') / result: (0, 2594562669841011187, 55, 62)

[2]libmpf._normalize. / x: (1, 46726004259735964592, 51, 66, 63, 'n') / result: (1, 2920375266233497787, 55, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 23664068533756406411249428841541998313, -209, 125, 63, 'n') / result: (1, 2565663451414456135, -146, 62)

[3]libmpf._normalize1 / x: (1, 9919243191909951976510384935913139133, -209, 123, 63, 'n') / result: (1, 4301786007232327725, -148, 62)

[2]libmpf._normalize. / x: (0, 93478971784683017776011540237910016, 0, 117, 63, 'n') / result: (0, 2594562669841011187, 55, 62)

[2]libmpf._normalize. / x: (1, 105217607686329549464615771560738816, 0, 117, 63, 'n') / result: (1, 2920375266233497787, 55, 62)

[3]libmpf._normalize1 / x: (1, 39189927913812223714634815960869373555, -93, 125, 63, 'n') / result: (1, 531122562296319069, -27, 59)

[3]libmpf._normalize1 / x: (0, 18809546951950776916930909199549033405, -93, 124, 63, 'n') / result: (0, 8157340667509252167, -32, 63)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (0, 1265645807986850843947249181230664937, -79, 120, 63, 'n') / result: (0, 4391090990772848909, -21, 62)

[3]libmpf._normalize1 / x: (1, 19438647033777681749654841512052462891, -84, 124, 63, 'n') / result: (1, 4215084668840133849, -22, 62)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (1, 1065411843981213147241, -90, 70, 63, 'n') / result: (1, 8323530031103227713, -83, 63)

[3]libmpf._normalize1 / x: (0, 1022707372496398644011, -91, 70, 63, 'n') / result: (0, 3994950673814057203, -83, 62)

[3]libmpf._normalize1 / x: (1, 4426119922939242452105025, -83, 82, 63, 'n') / result: (1, 2110538445920582987, -62, 61)

[3]libmpf._normalize1 / x: (1, 1957689265612584409829133, -83, 81, 63, 'n') / result: (1, 7467991888475740089, -65, 63)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 253722959363324057643, 55, 68, 63, 'n') / result: (1, 7928842480103876801, 60, 63)

[3]libmpf._normalize1 / x: (1, 126132256830434325137, 55, 67, 63, 'n') / result: (1, 7883266051902145321, 59, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 8605115830456875058941060803101380405, -212, 123, 63, 'n') / result: (1, 3731874111148299833, -151, 62)

[3]libmpf._normalize1 / x: (1, 14427990097323566510982927773333003175, -214, 124, 63, 'n') / result: (1, 3128571641623511073, -152, 62)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 117337462214497550215, 60, 67, 63, 'n') / result: (1, 916698923550762111, 67, 60)

[2]libmpf._normalize. / x: (0, 316925817063146414640, 61, 69, 63, 'n') / result: (0, 4951965891611662729, 67, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12516532117028181904828984841223969099, -217, 124, 63, 'n') / result: (1, 5428180525306617939, -156, 63)

[3]libmpf._normalize1 / x: (1, 10493083707144412008902298417318690819, -218, 123, 63, 'n') / result: (1, 9101299321086577667, -158, 63)

[2]libmpf._normalize. / x: (1, 135280883483087570306504974535132971008, 0, 127, 63, 'n') / result: (1, 916698923550762111, 67, 60)

[2]libmpf._normalize. / x: (0, 730781179714394202117005530806471360512, 0, 130, 63, 'n') / result: (0, 4951965891611662729, 67, 63)

[3]libmpf._normalize1 / x: (0, 64973352784920263542930985699484110159, -91, 126, 63, 'n') / result: (0, 7044425024307764945, -28, 63)

[3]libmpf._normalize1 / x: (1, 99177507968762852492422409586674007087, -91, 127, 63, 'n') / result: (1, 5376423480071555635, -27, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (0, 6138961859252550336556214423111150365, -75, 123, 63, 'n') / result: (0, 5324700627685813259, -15, 63)

[3]libmpf._normalize1 / x: (1, 4685358786481301756870774220096156695, -74, 122, 63, 'n') / result: (1, 8127801880283318509, -15, 63)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (1, 357938384260172726967, -91, 69, 63, 'n') / result: (1, 5592787254065198859, -85, 63)

[3]libmpf._normalize1 / x: (0, 546369171909633755697, -91, 69, 63, 'n') / result: (0, 8537018311088027433, -85, 63)

[3]libmpf._normalize1 / x: (1, 17704485284544223874610955, -85, 84, 63, 'n') / result: (1, 8442156450531112611, -64, 63)

[3]libmpf._normalize1 / x: (1, 7830748525432026551535831, -85, 83, 63, 'n') / result: (1, 3733991873470319057, -64, 62)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 365888289807382395361, 67, 69, 63, 'n') / result: (0, 714625566030043741, 76, 60)

[3]libmpf._normalize1 / x: (1, 39822359075291569539, 67, 66, 63, 'n') / result: (1, 311112180275715387, 74, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 18205864897495537316419791902502790617, -222, 124, 63, 'n') / result: (1, 7895535309536898821, -161, 63)

[3]libmpf._normalize1 / x: (1, 30525334420783744026202500256558663401, -224, 125, 63, 'n') / result: (1, 6619126778972056485, -162, 63)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 42332451214971963149, 75, 66, 63, 'n') / result: (1, 2645778200935747697, 79, 62)

[3]libmpf._normalize1 / x: (1, 96625345261173254483, 75, 67, 63, 'n') / result: (1, 6039084078823328405, 79, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 26481258032720781553290394974152271663, -227, 125, 63, 'n') / result: (1, 5742207497845017325, -165, 63)

[3]libmpf._normalize1 / x: (1, 22200243215115450200569640780411101455, -228, 125, 63, 'n') / result: (1, 4813910384706950171, -166, 63)

[2]libmpf._normalize. / x: (1, 1599274790042383911534909271951757421838336, 0, 141, 63, 'n') / result: (1, 2645778200935747697, 79, 62)

[2]libmpf._normalize. / x: (1, 3650402334856575055834489081471515114864640, 0, 142, 63, 'n') / result: (1, 6039084078823328405, 79, 63)

[3]libmpf._normalize1 / x: (0, 1313605284930275885344657834883793795, -87, 120, 63, 'n') / result: (0, 1139370962967876139, -27, 60)

[3]libmpf._normalize1 / x: (0, 82091886912187439665814845645186239437, -87, 126, 63, 'n') / result: (0, 8900420213362797045, -24, 63)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (1, 6941667362094991674045322888580925313, -73, 123, 63, 'n') / result: (1, 3010468333862044291, -12, 62)

[3]libmpf._normalize1 / x: (1, 54226198939715321852886705243385122015, -70, 126, 63, 'n') / result: (1, 734902033700881363, -4, 60)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (0, 750823774603519282525, -99, 70, 63, 'n') / result: (0, 5865810739089994395, -92, 63)

[3]libmpf._normalize1 / x: (0, 733150935621014334153, -93, 70, 63, 'n') / result: (0, 2863870842269587243, -85, 62)

[3]libmpf._normalize1 / x: (1, 2266174110555849916831141221, -92, 91, 63, 'n') / result: (1, 2110539107169816193, -62, 61)

[3]libmpf._normalize1 / x: (1, 7830745661561184281438421, -85, 83, 63, 'n') / result: (1, 7467981015740570337, -65, 63)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 361882986896110791319, 79, 69, 63, 'n') / result: (1, 2827210835125865557, 86, 62)

[3]libmpf._normalize1 / x: (0, 324103407878438892105, 79, 69, 63, 'n') / result: (0, 5064115748100607689, 85, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19259096751069659313618257642622591975, -231, 124, 63, 'n') / result: (1, 8352301815047297927, -170, 63)

[3]libmpf._normalize1 / x: (1, 16145631429174872873446461791930545713, -232, 124, 63, 'n') / result: (1, 3501025734332327397, -170, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 245097111226542042483, 86, 68, 63, 'n') / result: (0, 1914821181457359707, 93, 61)

[3]libmpf._normalize1 / x: (0, 68567684740801648361, 87, 66, 63, 'n') / result: (0, 8570960592600206045, 90, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 28013231637919504455257296534374536181, -236, 125, 63, 'n') / result: (1, 6074401320034398493, -174, 63)

[3]libmpf._normalize1 / x: (1, 11742277403036271180383430987954288591, -236, 124, 63, 'n') / result: (1, 5092401068119748941, -175, 63)

[2]libmpf._normalize. / x: (0, 18963470468782417181340605715014651629161938944, 0, 154, 63, 'n') / result: (0, 1914821181457359707, 93, 61)

[2]libmpf._normalize. / x: (0, 10610335292716945272821143220334796732450734080, 0, 153, 63, 'n') / result: (0, 8570960592600206045, 90, 63)

[3]libmpf._normalize1 / x: (1, 142455508119821031039860952152604996471, -85, 127, 63, 'n') / result: (1, 7722528569301818947, -21, 63)

[3]libmpf._normalize1 / x: (1, 91067604056500614668251232389714771333, -84, 127, 63, 'n') / result: (1, 4936784708055385135, -20, 63)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (1, 48416321828610325657141282637082752193, -63, 126, 63, 'n') / result: (1, 5249308131033666575, 0, 63)

[3]libmpf._normalize1 / x: (1, 30951126315532826455865204251124318565, -62, 125, 63, 'n') / result: (1, 6711455678434791369, 0, 63)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (0, 515623411082367142313, -95, 69, 63, 'n') / result: (0, 8056615798161986599, -89, 63)

[3]libmpf._normalize1 / x: (0, 659245672736157226711, -95, 70, 63, 'n') / result: (0, 2575178409125614167, -87, 62)

[3]libmpf._normalize1 / x: (1, 283271755762865441440082905, -89, 88, 63, 'n') / result: (1, 8442156188573403401, -64, 63)

[3]libmpf._normalize1 / x: (1, 31322980071066328001146281, -87, 85, 63, 'n') / result: (1, 1866995100442548275, -63, 61)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 108501502595271240875, 91, 67, 63, 'n') / result: (0, 6781343912204452555, 95, 63)

[3]libmpf._normalize1 / x: (1, 1286573876431126587045, 90, 71, 63, 'n') / result: (1, 5025679204809088231, 98, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 20373259373032366878685095140966057079, -240, 124, 63, 'n') / result: (1, 8835492829140943263, -179, 63)

[3]libmpf._normalize1 / x: (1, 17079676222598212625707358394483766023, -241, 124, 63, 'n') / result: (1, 1851782206588999615, -178, 61)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 1495347648205202587895, 96, 71, 63, 'n') / result: (1, 5841201750801572609, 104, 63)

[3]libmpf._normalize1 / x: (0, 285323600372989336599, 96, 68, 63, 'n') / result: (0, 8916362511655916769, 101, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 29633831815319806370521026326835715389, -245, 125, 63, 'n') / result: (1, 6425812966647958737, -183, 63)

[3]libmpf._normalize1 / x: (1, 6210791353672077318743944276898386845, -244, 123, 63, 'n') / result: (1, 5387002782804362517, -184, 63)

[2]libmpf._normalize. / x: (1, 118473646487324767653589651508497944019710450335744, 0, 167, 63, 'n') / result: (1, 5841201750801572609, 104, 63)

[2]libmpf._normalize. / x: (0, 22605664579506211930671565284257242779516338700288, 0, 164, 63, 'n') / result: (0, 8916362511655916769, 101, 63)

[3]libmpf._normalize1 / x: (0, 648583988880502980823551030717718304901, -83, 129, 63, 'n') / result: (0, 549372007643402799, -13, 59)

[3]libmpf._normalize1 / x: (0, 68571402503226793372406489335115626659, -82, 126, 63, 'n') / result: (0, 3717263178218822317, -18, 62)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (1, 4122312086482027824099265679998974123, -51, 122, 63, 'n') / result: (1, 1787767887930826881, 10, 61)

[3]libmpf._normalize1 / x: (1, 27893155666847643080700830051122882209, -56, 125, 63, 'n') / result: (1, 6048363994294514755, 6, 63)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (0, 475718291238019886747, -96, 69, 63, 'n') / result: (0, 3716549150297030365, -89, 62)

[3]libmpf._normalize1 / x: (0, 402361710876457145659, -98, 69, 63, 'n') / result: (0, 6286901732444642901, -92, 63)

[3]libmpf._normalize1 / x: (1, 283271752046316291130392867, -89, 88, 63, 'n') / result: (1, 4221078038905803727, -63, 62)

[3]libmpf._normalize1 / x: (1, 1002335355987220763558633899, -92, 90, 63, 'n') / result: (1, 7467980354929125037, -65, 63)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 942922476994526928687, 102, 70, 63, 'n') / result: (0, 3683290925759870815, 110, 62)

[3]libmpf._normalize1 / x: (0, 3030331192634170908277, 101, 72, 63, 'n') / result: (0, 5918615610613615055, 110, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 21551877683868950088566370092593390611, -249, 125, 63, 'n') / result: (1, 4673318521198515445, -187, 63)

[3]libmpf._normalize1 / x: (1, 18067756665227861293025808285125337951, -250, 124, 63, 'n') / result: (1, 7835640411351800025, -189, 63)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 155585473410838335515, 111, 68, 63, 'n') / result: (0, 4862046044088697985, 116, 63)

[3]libmpf._normalize1 / x: (1, 211775800950186089295, 111, 68, 63, 'n') / result: (1, 3308996889846657645, 117, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 15674092860995600064107000661163630335, -253, 124, 63, 'n') / result: (1, 3398777106326193051, -191, 62)

[3]libmpf._normalize1 / x: (1, 26280373331240525518043162996895180075, -255, 125, 63, 'n') / result: (1, 712330946486527275, -190, 60)

[2]libmpf._normalize. / x: (0, 403922982412374921222279527581025166360831090187304960, 0, 179, 63, 'n') / result: (0, 4862046044088697985, 116, 63)

[2]libmpf._normalize. / x: (1, 549801412993674097643092969774969033377919205313085440, 0, 179, 63, 'n') / result: (1, 3308996889846657645, 117, 62)

[3]libmpf._normalize1 / x: (1, 25953414330414277677996311047863771735, -75, 125, 63, 'n') / result: (1, 5627749640090316651, -13, 63)

[2]libmpf._normalize. / x: (0, 7783157013668617689376119650434984020, -74, 123, 63, 'n') / result: (0, 3375406297206122491, -13, 62)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (1, 29081623393289886727363340789102237001, -46, 125, 63, 'n') / result: (1, 788258981560254063, 19, 60)

[3]libmpf._normalize1 / x: (0, 17442548267501149059232345474800286841, -46, 124, 63, 'n') / result: (0, 7564499490123206939, 15, 63)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (0, 493762775527029180613, -98, 69, 63, 'n') / result: (0, 7715043367609830947, -92, 63)

[3]libmpf._normalize1 / x: (1, 592297130621169656971, -99, 70, 63, 'n') / result: (1, 4627321332977887945, -92, 63)

[3]libmpf._normalize1 / x: (1, 2266174008655486961397658077, -92, 91, 63, 'n') / result: (1, 2110539012267707811, -62, 61)

[3]libmpf._normalize1 / x: (1, 1002335360614542096471943881, -92, 90, 63, 'n') / result: (1, 933497548675669447, -62, 60)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 604258899857104311865, 116, 70, 63, 'n') / result: (1, 1180193163783406859, 125, 61)

[2]libmpf._normalize. / x: (1, 74210701737551357770, 117, 67, 63, 'n') / result: (1, 4638168858596959861, 121, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11399340262542254592382723523386930353, -257, 124, 63, 'n') / result: (1, 4943675791019917165, -196, 63)

[3]libmpf._normalize1 / x: (1, 2389124848294593228913014817899561825, -256, 121, 63, 'n') / result: (1, 4144470961376158691, -197, 62)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 120910449257124051025, 122, 67, 63, 'n') / result: (0, 7556903078570253189, 126, 63)

[3]libmpf._normalize1 / x: (0, 730480704597662238955, 122, 70, 63, 'n') / result: (0, 2853440252334618121, 130, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 16580858563697824861342692991476699495, -262, 124, 63, 'n') / result: (1, 7190801150574424967, -201, 63)

[3]libmpf._normalize1 / x: (1, 13900362753713996968526081983047195273, -263, 124, 63, 'n') / result: (1, 6028321398365321733, -202, 63)

[2]libmpf._normalize. / x: (0, 642870216542003090523024845207730056680997546014902583296, 0, 189, 63, 'n') / result: (0, 7556903078570253189, 126, 63)

[2]libmpf._normalize. / x: (0, 2853440252334618121, 130, 62, 63, 'n') / result: (0, 2853440252334618121, 130, 62)

[3]libmpf._normalize1 / x: (0, 83271452104683382115039261721582419781, -75, 126, 63, 'n') / result: (0, 2257077231948008837, -10, 61)

[3]libmpf._normalize1 / x: (1, 702148126920578617220908321066871120761, -76, 130, 63, 'n') / result: (1, 4757940778836993983, -9, 63)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (1, 18317333370195189190212011611601014591, -39, 124, 63, 'n') / result: (1, 3971938526821370151, 23, 62)

[3]libmpf._normalize1 / x: (0, 38613117073705388893272090428817262669, -38, 125, 63, 'n') / result: (0, 8372885083549701255, 24, 63)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (0, 642066822593576676377, -102, 70, 63, 'n') / result: (0, 627018381439039723, -92, 60)

[3]libmpf._normalize1 / x: (1, 676741556450790829109, -100, 70, 63, 'n') / result: (1, 660880426221475419, -90, 60)

[3]libmpf._normalize1 / x: (1, 2266174008028468579843147541, -92, 91, 63, 'n') / result: (1, 8442156046735005751, -64, 63)

[3]libmpf._normalize1 / x: (1, 250583840814515950332188251, -90, 88, 63, 'n') / result: (1, 3733990204550563549, -64, 62)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 2961589087179094446661, 126, 72, 63, 'n') / result: (0, 5784353685896668841, 135, 63)

[3]libmpf._normalize1 / x: (1, 972144790328944155623, 127, 70, 63, 'n') / result: (1, 949360146805609527, 137, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 24117612456287745251947384314525965301, -267, 125, 63, 'n') / result: (1, 5229673564054127249, -205, 63)

[3]libmpf._normalize1 / x: (1, 20218709459947631956354089636762314799, -268, 124, 63, 'n') / result: (1, 4384233744265688533, -206, 62)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 56365019881783008809, 138, 66, 63, 'n') / result: (1, 7045627485222876101, 141, 63)

[3]libmpf._normalize1 / x: (1, 141693329610824399707, 136, 67, 63, 'n') / result: (1, 4427916550338262491, 141, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 17540081786391087456876448629095390547, -271, 124, 63, 'n') / result: (1, 7606797911351457817, -210, 63)

[3]libmpf._normalize1 / x: (1, 14704515970871005058861705784195575199, -272, 124, 63, 'n') / result: (1, 398566704024153503, -207, 59)

[2]libmpf._normalize. / x: (1, 7045627485222876101, 141, 63, 63, 'n') / result: (1, 7045627485222876101, 141, 63)

[2]libmpf._normalize. / x: (1, 4427916550338262491, 141, 62, 63, 'n') / result: (1, 4427916550338262491, 141, 62)

[3]libmpf._normalize1 / x: (0, 39476103597455229655393900499189683733, -69, 125, 63, 'n') / result: (0, 1070001932040594925, -4, 60)

[3]libmpf._normalize1 / x: (0, 56147486563289783485165747028252896571, -69, 126, 63, 'n') / result: (0, 760940336393993155, -3, 60)

[3]libmpf._normalize1 / x: (0, 15478498771225430759843386699, -55, 94, 63, 'n') / result: (0, 7207737663400094379, -24, 63)

[8]gammazeta.mpf_bernoulli / n: 34 / prec: 63 / result: (0, 7207737663400094379, -24, 63)

[3]libmpf._normalize1 / x: (0, 7712293225479864244377742304308426575, -28, 123, 63, 'n') / result: (0, 6689348055928405691, 32, 63)

[3]libmpf._normalize1 / x: (0, 5484658322227322021603302555679975745, -27, 123, 63, 'n') / result: (0, 2378591387319825739, 34, 62)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (1, 493444836109596663993, -102, 69, 63, 'n') / result: (1, 7710075564212447875, -96, 63)

[3]libmpf._normalize1 / x: (1, 350917197752190459359, -101, 69, 63, 'n') / result: (1, 5483081214877975927, -95, 63)

[3]libmpf._normalize1 / x: (1, 36258784136165572843129367171, -96, 95, 63, 'n') / result: (1, 8442156048530147607, -64, 63)

[3]libmpf._normalize1 / x: (1, 8018682911547591625540322679, -95, 93, 63, 'n') / result: (1, 1866995103551911103, -63, 61)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 77448451511323463037, 141, 67, 63, 'n') / result: (1, 605066027432214555, 148, 60)

[3]libmpf._normalize1 / x: (0, 639315170126763989273, 141, 70, 63, 'n') / result: (0, 2497324883307671833, 149, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 25512846234750672665462276224487983851, -276, 125, 63, 'n') / result: (1, 5532216662801060231, -214, 63)

[3]libmpf._normalize1 / x: (1, 1336774179170091368987427798563234109, -273, 121, 63, 'n') / result: (1, 4637867101371968035, -215, 63)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 185098864297884675745, 149, 68, 63, 'n') / result: (0, 5784339509308896117, 154, 63)

[3]libmpf._normalize1 / x: (1, 63731735072333332897, 149, 66, 63, 'n') / result: (1, 1991616721010416653, 154, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 18554797261636852849133452466876347893, -280, 124, 63, 'n') / result: (1, 8046860600437905791, -219, 63)

[3]libmpf._normalize1 / x: (1, 15555190448524699566704064698549196105, -281, 124, 63, 'n') / result: (1, 421624281942906185, -216, 59)

[2]libmpf._normalize. / x: (0, 5784339509308896117, 154, 63, 63, 'n') / result: (0, 5784339509308896117, 154, 63)

[2]libmpf._normalize. / x: (1, 1991616721010416653, 154, 61, 63, 'n') / result: (1, 1991616721010416653, 154, 61)

[3]libmpf._normalize1 / x: (1, 53263485456226103075390296653777303987, -65, 126, 63, 'n') / result: (1, 22557963533511879, 6, 55)

[3]libmpf._normalize1 / x: (1, 3484281813538710603415856186262731637, -65, 122, 63, 'n') / result: (1, 6044265458864645299, -6, 63)

[3]libmpf._normalize1 / x: (1, 1929743914758391793175373481, -47, 91, 63, 'n') / result: (1, 1797214071041337953, -17, 61)

[8]gammazeta.mpf_bernoulli / n: 36 / prec: 63 / result: (1, 1797214071041337953, -17, 61)

[3]libmpf._normalize1 / x: (0, 40541489476464929020773436979043687, -11, 115, 63, 'n') / result: (0, 4501009506936984763, 42, 62)

[3]libmpf._normalize1 / x: (0, 10862838931780669777244872369731732947, -23, 124, 63, 'n') / result: (0, 4711005427678687387, 38, 63)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (1, 1079329750525950881703, -104, 70, 63, 'n') / result: (1, 8432263675983991263, -97, 63)

[3]libmpf._normalize1 / x: (1, 564843098547806026615, -107, 69, 63, 'n') / result: (1, 4412836707404734583, -100, 62)

[3]libmpf._normalize1 / x: (1, 72517568280763409360219312607, -97, 96, 63, 'n') / result: (1, 8442156049511792297, -64, 63)

[3]libmpf._normalize1 / x: (1, 256597853173935768729301934199, -100, 98, 63, 'n') / result: (1, 7467980414336074863, -65, 63)

[1]ctx_mp_python.convert / x: -35 / result: -35.0

[2]libmpf._normalize1 / x: (1, 35, 0, 6, 63, 'n') / result: (1, 35, 0, 6)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 341865053296540529805, 154, 69, 63, 'n') / result: (1, 2670820728879222889, 161, 62)

[3]libmpf._normalize1 / x: (1, 335197180416258145335, 154, 69, 63, 'n') / result: (1, 5237455944004033521, 160, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 26988796016926331418445909709977956573, -285, 125, 63, 'n') / result: (1, 5852262254863931485, -223, 63)

[3]libmpf._normalize1 / x: (1, 1414108222593154506064005881686290555, -282, 121, 63, 'n') / result: (1, 38329480176627835, -217, 56)

[1]ctx_mp_python.convert / x: -36 / result: -36.0

[2]libmpf._normalize1 / x: (1, 9, 2, 4, 63, 'n') / result: (1, 9, 2, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 87161411800489149231, 161, 67, 63, 'n') / result: (1, 5447588237530571827, 165, 63)

[2]libmpf._normalize. / x: (0, 140615829006809102804, 162, 67, 63, 'n') / result: (0, 8788489312925568925, 166, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19628215285037331942822268359586726455, -289, 124, 63, 'n') / result: (1, 4256190730810131989, -227, 62)

[3]libmpf._normalize1 / x: (1, 128555292963014046005818716516935505, -283, 117, 63, 'n') / result: (1, 3568126154624263913, -228, 62)

[2]libmpf._normalize. / x: (1, 5447588237530571827, 165, 63, 63, 'n') / result: (1, 5447588237530571827, 165, 63)

[2]libmpf._normalize. / x: (0, 8788489312925568925, 166, 63, 63, 'n') / result: (0, 8788489312925568925, 166, 63)

[2]libmpf._normalize. / x: (0, 54544413138933472860267971897386577428, -62, 126, 63, 'n') / result: (0, 5913717122217856347, 1, 63)

[3]libmpf._normalize1 / x: (1, 130184264936034517403718927664816788249, -63, 127, 63, 'n') / result: (1, 7057303143353855135, 1, 63)

[3]libmpf._normalize1 / x: (0, 17181666013769096711720228171, -45, 94, 63, 'n') / result: (0, 8000836714063350443, -14, 63)

[8]gammazeta.mpf_bernoulli / n: 38 / prec: 63 / result: (0, 8000836714063350443, -14, 63)

[3]libmpf._normalize1 / x: (0, 47314685068025686766924710100092811721, -13, 126, 63, 'n') / result: (0, 2564934217061045337, 51, 62)

[3]libmpf._normalize1 / x: (1, 56464330091620212538062185618560074805, -13, 126, 63, 'n') / result: (1, 3060937467663663803, 51, 62)

[1]ctx_mp_python.convert / x: -523022617466601111760007224100074291200000000 / result: -5.23022617466601112e+44

[3]libmpf._normalize1 / x: (1, 447955718439862076567, -105, 69, 63, 'n') / result: (1, 3499654050311422473, -98, 62)

[3]libmpf._normalize1 / x: (0, 534580744140049401693, -105, 69, 63, 'n') / result: (0, 8352824127188271901, -99, 63)

[3]libmpf._normalize1 / x: (1, 145035136565026472778150298121, -98, 97, 63, 'n') / result: (1, 8442156049715498973, -64, 63)

[3]libmpf._normalize1 / x: (1, 128298926578615060231182449891, -99, 97, 63, 'n') / result: (1, 7467980413849876509, -65, 63)

[1]ctx_mp_python.convert / x: -37 / result: -37.0

[2]libmpf._normalize1 / x: (1, 37, 0, 6, 63, 'n') / result: (1, 37, 0, 6)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 1431949268598210807099, 165, 71, 63, 'n') / result: (0, 5593551830461760965, 173, 63)

[2]libmpf._normalize. / x: (1, 134508516264676036280, 166, 67, 63, 'n') / result: (1, 2101695566635563067, 172, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 14275065661845332321747653946249692767, -293, 124, 63, 'n') / result: (1, 3095411440589186901, -231, 62)

[3]libmpf._normalize1 / x: (1, 11967329090375125738183656919743957339, -294, 124, 63, 'n') / result: (1, 5190001679453474783, -233, 63)

[1]ctx_mp_python.convert / x: -38 / result: -38.0

[2]libmpf._normalize1 / x: (1, 19, 1, 5, 63, 'n') / result: (1, 19, 1, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 286114314389791624015, 173, 68, 63, 'n') / result: (1, 4470536162340494125, 179, 62)

[3]libmpf._normalize1 / x: (1, 351616412366247569277, 173, 69, 63, 'n') / result: (1, 2747003221611309135, 180, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 10381865935887514415511570736550031903, -297, 123, 63, 'n') / result: (1, 4502416640856999129, -236, 62)

[3]libmpf._normalize1 / x: (1, 17407024131454728347973479823239933949, -299, 124, 63, 'n') / result: (1, 7549093351932326957, -238, 63)

[2]libmpf._normalize. / x: (1, 4470536162340494125, 179, 62, 63, 'n') / result: (1, 4470536162340494125, 179, 62)

[2]libmpf._normalize. / x: (1, 2747003221611309135, 180, 62, 63, 'n') / result: (1, 2747003221611309135, 180, 62)

[3]libmpf._normalize1 / x: (0, 19519049063747036931113962265488382055, -58, 124, 63, 'n') / result: (0, 8465038159906275507, 3, 63)

[3]libmpf._normalize1 / x: (0, 132693718962462044012598172202395574945, -59, 127, 63, 'n') / result: (0, 7193340918714116175, 5, 63)

[3]libmpf._normalize1 / x: (1, 5304203340691314808984868911, -38, 93, 63, 'n') / result: (1, 2469962155768328723, -7, 62)

[8]gammazeta.mpf_bernoulli / n: 40 / prec: 63 / result: (1, 2469962155768328723, -7, 62)

[3]libmpf._normalize1 / x: (1, 20908323902103270808840496044979487561, -4, 124, 63, 'n') / result: (1, 9067540079076386217, 57, 63)

[3]libmpf._normalize1 / x: (1, 17767279842763648658702620807811394525, -2, 124, 63, 'n') / result: (1, 7705329361872903801, 59, 63)

[1]ctx_mp_python.convert / x: -815915283247897734345611269596115894272000000000 / result: -8.15915283247897734e+47

[3]libmpf._normalize1 / x: (0, 1039498090586530997279, -109, 70, 63, 'n') / result: (0, 1015134854088409177, -99, 60)

[3]libmpf._normalize1 / x: (0, 883334960657055864213, -107, 70, 63, 'n') / result: (0, 6901054380133248939, -100, 63)

[3]libmpf._normalize1 / x: (1, 290070273129037810692764286887, -99, 98, 63, 'n') / result: (1, 2110539012421488665, -62, 61)

[3]libmpf._normalize1 / x: (1, 256597853150329066098215948373, -100, 98, 63, 'n') / result: (1, 466748775853064337, -61, 59)

[1]ctx_mp_python.convert / x: -39 / result: -39.0

[2]libmpf._normalize1 / x: (1, 39, 0, 6, 63, 'n') / result: (1, 39, 0, 6)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 210229540694304008025, 179, 68, 63, 'n') / result: (1, 6569673146697000251, 184, 63)

[2]libmpf._normalize. / x: (0, 263601891324758350640, 180, 68, 63, 'n') / result: (0, 4118779551949349229, 186, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 15100895906745475514386090198967462187, -302, 124, 63, 'n') / result: (1, 3274484829714181185, -240, 62)

[3]libmpf._normalize1 / x: (1, 25319307827570513960383793063990159271, -304, 125, 63, 'n') / result: (1, 5490249710496237787, -242, 63)

[1]ctx_mp_python.convert / x: -40 / result: -40.0

[2]libmpf._normalize1 / x: (1, 5, 3, 3, 63, 'n') / result: (1, 5, 3, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (0, 177005650051712224270, 187, 68, 63, 'n') / result: (0, 172857080128625219, 197, 58)

[3]libmpf._normalize1 / x: (1, 99563804021552929535, 185, 67, 63, 'n') / result: (1, 388921109459191131, 193, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 10982469750360345829559143817780115555, -306, 124, 63, 'n') / result: (1, 1190721756259702249, -243, 61)

[3]libmpf._normalize1 / x: (1, 18414042056414919244220390725442587761, -308, 124, 63, 'n') / result: (1, 3992908880360900209, -246, 62)

[2]libmpf._normalize. / x: (0, 172857080128625219, 197, 58, 63, 'n') / result: (0, 172857080128625219, 197, 58)

[2]libmpf._normalize. / x: (1, 388921109459191131, 193, 59, 63, 'n') / result: (1, 388921109459191131, 193, 59)

[3]libmpf._normalize1 / x: (1, 27898486363902547458888820295658290347, -53, 125, 63, 'n') / result: (1, 6049519904960072637, 9, 63)

[3]libmpf._normalize1 / x: (1, 917308314055966710311117470397987923, -50, 120, 63, 'n') / result: (1, 6365105068406364741, 7, 63)

[3]libmpf._normalize1 / x: (0, 7230088225199077963422274409, -33, 93, 63, 'n') / result: (0, 841693047573682615, 0, 60)

[8]gammazeta.mpf_bernoulli / n: 42 / prec: 63 / result: (0, 841693047573682615, 0, 60)

[3]libmpf._normalize1 / x: (1, 5091838845163498349749900879984105755, 9, 122, 63, 'n') / result: (1, 2208233095148938777, 70, 61)

[3]libmpf._normalize1 / x: (1, 5357464683153646693438773034260677715, 7, 123, 63, 'n') / result: (1, 4646859878791638731, 67, 63)

[1]ctx_mp_python.convert / x: -1405006117752879898543142606244511569936384000000000 / result: -1.4050061177528799e+51

[3]libmpf._normalize1 / x: (0, 602151714634641170381, -108, 70, 63, 'n') / result: (0, 73504847977861471, -95, 57)

[3]libmpf._normalize1 / x: (0, 316782074526940006281, -109, 69, 63, 'n') / result: (0, 2474859957241718799, -102, 62)

[3]libmpf._normalize1 / x: (1, 18129392070491358319641538209, -95, 94, 63, 'n') / result: (1, 4221078024825863149, -63, 62)

[3]libmpf._normalize1 / x: (1, 1026391412598841404387806730225, -102, 100, 63, 'n') / result: (1, 466748775851938901, -61, 59)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)

[2]libmpf._normalize. / x: (1, 10681782542428108762425, -73, 74, 63, 'n') / result: (1, 2607857066022487491, -61, 62)

[2]libmpf._normalize. / x: (1, 915136914361105948578, -73, 70, 63, 'n') / result: (1, 7149507143446140223, -66, 63)

[3]libmpf._normalize1 / x: (1, 18427754977077472931, -63, 64, 63, 'n') / result: (1, 4606938744269368233, -61, 62)

[3]libmpf._normalize1 / x: (0, 194289650310953168737, -66, 68, 63, 'n') / result: (0, 6071551572217286523, -61, 63)

[2]libmpf._normalize1 / x: (0, 43, 0, 6, 63, 'n') / result: (0, 43, 0, 6)

[2]libmpf._normalize. / x: (0, 36376095460795824230704307, -83, 85, 63, 'n') / result: (0, 8672736993025737817, -61, 63)

[3]libmpf._normalize1 / x: (0, 627773893652404672411, -71, 70, 63, 'n') / result: (0, 4904483544159411503, -64, 63)

[3]libmpf._normalize1 / x: (0, 878579810766445621153, -75, 70, 63, 'n') / result: (0, 6863904771612856415, -68, 63)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (1, 155415446915021221688795, -69, 78, 73, 'd') / result: (1, 2428366358047206588887, -63, 72)

[2]libmpf._normalize. / x: (0, 8118678223169885697662241162, -93, 93, 63, 'n') / result: (0, 7561108305277196409, -63, 63)

[2]libmpf._normalize. / x: (0, 5671576370291063494733601898, -93, 93, 63, 'n') / result: (0, 5282067107307783789, -63, 63)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[2]libmpf._normalize1 / x: (1, 4440441340429177762537, -70, 72, 73, 'd') / result: (1, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (0, 155415446915021221688795, -69, 78, 73, 'd') / result: (0, 2428366358047206588887, -63, 72)

[2]libmpf._normalize. / x: (0, 3598662904899361264242083, -87, 82, 67, 'n') / result: (0, 27455619086451425661, -70, 65)

[2]libmpf._normalize. / x: (0, 129898851570718171162595858637, -97, 97, 67, 'n') / result: (0, 60488866442217571271, -66, 66)

[2]libmpf._normalize. / x: (1, 90745221924657015915737630339, -97, 97, 67, 'n') / result: (1, 21128268429231135155, -65, 65)

[3]libmpf._normalize1 / x: (0, 1660759276008759892469451663722825785131, -136, 131, 63, 'n') / result: (0, 2813435648475235873, -67, 62)

[3]libmpf._normalize1 / x: (1, 580089689949267437208514665239126212455, -135, 129, 63, 'n') / result: (1, 7861681275992980523, -69, 63)

[3]libmpf._normalize1 / x: (0, 269531973362803846559, -68, 68, 63, 'n') / result: (0, 8422874167587620205, -63, 63)

[3]libmpf._normalize1 / x: (0, 795623662849059024963, -69, 70, 63, 'n') / result: (0, 6215809866008273633, -62, 63)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[3]libmpf._normalize1 / x: (0, 225489978404478016439781565211336316781, -126, 128, 73, 'd') / result: (0, 1564651036543005083455, -69, 71)

[3]libmpf._normalize1 / x: (0, 813490501934828503967, -71, 70, 63, 'n') / result: (0, 6355394546365847687, -64, 63)

[3]libmpf._normalize1 / x: (1, 600329790903044332639, -70, 70, 63, 'n') / result: (1, 4690076491430033849, -63, 63)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 7561108305277196409, -64, 63, 63, 'n') / result: (0, 7561108305277196409, -64, 63)

[2]libmpf._normalize1 / x: (0, 5282067107307783789, -64, 63, 63, 'n') / result: (0, 5282067107307783789, -64, 63)

[2]libmpf._normalize. / x: (0, 13916502851643044096, -64, 64, 63, 'n') / result: (0, 54361339264230641, -56, 56)

[2]libmpf._normalize1 / x: (1, 4098085875552283909, -64, 62, 63, 'n') / result: (1, 4098085875552283909, -64, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 51898727375273746638638075511470613735, -131, 126, 63, 'n') / result: (0, 2813435648475235873, -67, 62)

[3]libmpf._normalize1 / x: (0, 36255605621829214825927625993521656435, -131, 125, 63, 'n') / result: (0, 7861681275992980523, -69, 63)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 70, 0, 7, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 275158844659754318305, -68, 68, 63, 'n') / result: (0, 8598713895617322447, -63, 63)

[3]libmpf._normalize1 / x: (1, 98470247696633255555, -66, 67, 63, 'n') / result: (1, 769298810129947309, -59, 60)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (0, 52872758198500938285628439731748200635, -128, 126, 63, 'n') / result: (0, 2866237965205774149, -64, 62)

[3]libmpf._normalize1 / x: (1, 4730352755558805031747777343321951345, -124, 122, 63, 'n') / result: (1, 4102926987359718981, -64, 62)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 2866237965205774149, -65, 62, 63, 'n') / result: (1, 2866237965205774149, -65, 62)

[2]libmpf._normalize1 / x: (0, 4102926987359718981, -65, 62, 63, 'n') / result: (0, 4102926987359718981, -65, 62)

[3]libmpf._normalize1 / x: (0, 24966767738080314043, -65, 65, 63, 'n') / result: (0, 6241691934520078511, -63, 63)

[2]libmpf._normalize1 / x: (1, 4093244763744848837, -65, 62, 63, 'n') / result: (1, 4093244763744848837, -65, 62)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 1225, 2, 11, 63, 'n') / result: (1, 1225, 2, 11)

[2]libmpf._normalize1 / x: (0, 35, 1, 6, 63, 'n') / result: (0, 35, 1, 6)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 19311154372194882469392783356406175295, -135, 124, 63, 'n') / result: (0, 4187439104707327811, -73, 62)

[3]libmpf._normalize1 / x: (0, 53961831623187668577007458841490605045, -137, 126, 63, 'n') / result: (0, 1462638376928926609, -72, 61)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (0, 3675, 2, 12, 63, 'n') / result: (0, 3675, 2, 12)

[2]libmpf._normalize1 / x: (0, 85715, 2, 17, 63, 'n') / result: (0, 85715, 2, 17)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 28742183251638894838325628827479257565, -141, 125, 63, 'n') / result: (0, 6232467504680673951, -79, 63)

[3]libmpf._normalize1 / x: (0, 10039410534546542991550032210389846735, -140, 123, 63, 'n') / result: (0, 8707800569623377021, -80, 63)

[2]libmpf._normalize. / x: (0, 14700, 0, 14, 63, 'n') / result: (0, 3675, 2, 12)

[2]libmpf._normalize. / x: (0, 342860, 0, 19, 63, 'n') / result: (0, 85715, 2, 17)

[3]libmpf._normalize1 / x: (1, 700580489665864807815165, -78, 80, 63, 'n') / result: (1, 5345004956557196105, -61, 63)

[3]libmpf._normalize1 / x: (0, 1100433071420773845972105, -78, 80, 63, 'n') / result: (0, 1049454757138036581, -58, 60)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 6573195900421309108967706600078297305, -126, 123, 63, 'n') / result: (0, 5701338620327675845, -66, 63)

[3]libmpf._normalize1 / x: (1, 1290601554790824870747710736465175221, -123, 120, 63, 'n') / result: (1, 8955347260911245491, -66, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[3]libmpf._normalize1 / x: (1, 486514228934628338773, -77, 69, 63, 'n') / result: (1, 7601784827103567793, -71, 63)

[3]libmpf._normalize1 / x: (0, 764189632931092948565, -77, 70, 63, 'n') / result: (0, 5970231507274163661, -70, 63)

[3]libmpf._normalize1 / x: (0, 1590271350410036531023, -71, 71, 63, 'n') / result: (0, 6211997462539205199, -63, 63)

[3]libmpf._normalize1 / x: (1, 125013600932560999123, -70, 67, 63, 'n') / result: (1, 7813350058285062445, -66, 63)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (0, 5989025, 2, 23, 63, 'n') / result: (0, 5989025, 2, 23)

[2]libmpf._normalize1 / x: (1, 514395, 2, 19, 63, 'n') / result: (1, 514395, 2, 19)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 42779063444299750455286913778393745665, -147, 126, 63, 'n') / result: (0, 4638115352320501545, -84, 63)

[3]libmpf._normalize1 / x: (0, 59769513880091046647208007932283439715, -148, 126, 63, 'n') / result: (0, 3240111839859861217, -84, 62)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 29981875, 3, 25, 63, 'n') / result: (1, 29981875, 3, 25)

[2]libmpf._normalize1 / x: (1, 208587085, 3, 28, 63, 'n') / result: (1, 208587085, 3, 28)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 31835582098083535223017975702870661175, -152, 125, 63, 'n') / result: (0, 6903241454616560439, -90, 63)

[3]libmpf._normalize1 / x: (0, 22239819118173412705139734954848157055, -152, 125, 63, 'n') / result: (0, 301405752545103369, -86, 59)

[2]libmpf._normalize. / x: (1, 239855000, 0, 28, 63, 'n') / result: (1, 29981875, 3, 25)

[2]libmpf._normalize. / x: (1, 1668696680, 0, 31, 63, 'n') / result: (1, 208587085, 3, 28)

[3]libmpf._normalize1 / x: (0, 798937434822699196202186715, -87, 90, 63, 'n') / result: (0, 1488136937511524551, -58, 61)

[3]libmpf._normalize1 / x: (1, 1584514365623039671840320315, -87, 91, 63, 'n') / result: (1, 2951387997014521941, -58, 62)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (0, 5228815472935047018823199095696732053, -125, 122, 63, 'n') / result: (0, 9070548952451197263, -66, 63)

[3]libmpf._normalize1 / x: (1, 10370190293932406939439431602371500223, -125, 123, 63, 'n') / result: (1, 8994706276615685915, -65, 63)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (1, 825621522427557866427, -82, 70, 63, 'n') / result: (1, 6450168143965295831, -75, 63)

[3]libmpf._normalize1 / x: (0, 818718153533729989063, -81, 70, 63, 'n') / result: (0, 1599058893620566385, -72, 61)

[3]libmpf._normalize1 / x: (0, 25437891438416619199273, -75, 75, 63, 'n') / result: (0, 3105211357228591211, -62, 62)

[3]libmpf._normalize1 / x: (1, 498455344836623430095, -72, 69, 63, 'n') / result: (1, 7788364763072241095, -66, 63)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 14451186575, 3, 34, 63, 'n') / result: (1, 14451186575, 3, 34)

[2]libmpf._normalize1 / x: (0, 3141666675, 3, 32, 63, 'n') / result: (0, 3141666675, 3, 32)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 47383191959938284982617644899276366185, -158, 126, 63, 'n') / result: (0, 160540498944571173, -90, 58)

[3]libmpf._normalize1 / x: (0, 2068820383085898856132442675529762135, -154, 121, 63, 'n') / result: (0, 7177662572236880229, -96, 63)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (0, 153311893350, 4, 38, 63, 'n') / result: (0, 76655946675, 5, 37)

[2]libmpf._normalize. / x: (0, 496366530100, 4, 39, 63, 'n') / result: (0, 124091632525, 6, 37)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 1101934696742750813549247555797124795, -158, 120, 63, 'n') / result: (0, 7646207949732134007, -101, 63)

[3]libmpf._normalize1 / x: (0, 49266792378603730898089445506929319035, -164, 126, 63, 'n') / result: (0, 667689541603430719, -98, 60)

[2]libmpf._normalize. / x: (0, 2452990293600, 0, 42, 63, 'n') / result: (0, 76655946675, 5, 37)

[2]libmpf._normalize. / x: (0, 7941864481600, 0, 43, 63, 'n') / result: (0, 124091632525, 6, 37)

[3]libmpf._normalize1 / x: (1, 739547654938390440008566490875, -96, 100, 63, 'n') / result: (1, 1345229347750119705, -57, 61)

[3]libmpf._normalize1 / x: (0, 1153559922694324762151583414975, -95, 100, 63, 'n') / result: (0, 8393253102944616419, -58, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 1654340099892645747299383501208404905, -122, 121, 63, 'n') / result: (0, 89681956516674647, -58, 57)

[3]libmpf._normalize1 / x: (1, 10321879462392527204582989894843797779, -123, 123, 63, 'n') / result: (1, 4476401654903795423, -62, 62)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (1, 597068871342404029541, -86, 70, 63, 'n') / result: (1, 4664600557362531481, -79, 63)

[3]libmpf._normalize1 / x: (0, 931318917002460751879, -85, 70, 63, 'n') / result: (0, 454745564942607789, -74, 59)

[3]libmpf._normalize1 / x: (0, 407001598414108544676711, -79, 79, 63, 'n') / result: (0, 6210351538301216807, -63, 63)

[3]libmpf._normalize1 / x: (1, 1993366633781551112531, -74, 71, 63, 'n') / result: (1, 7786588413209184033, -66, 63)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (0, 16836236926775, 5, 44, 63, 'n') / result: (0, 16836236926775, 5, 44)

[2]libmpf._normalize. / x: (1, 3551599561300, 6, 42, 63, 'n') / result: (1, 887899890325, 8, 40)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 52482843230910550375075983254829604905, -169, 126, 63, 'n') / result: (0, 5690201264916936935, -106, 63)

[3]libmpf._normalize1 / x: (0, 4582957430567788920912132251147212385, -166, 122, 63, 'n') / result: (0, 993770480526036419, -104, 60)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 78989229249525, 8, 47, 63, 'n') / result: (1, 78989229249525, 8, 47)

[2]libmpf._normalize1 / x: (1, 560855495946725, 6, 49, 63, 'n') / result: (1, 560855495946725, 6, 49)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 39056999613700874694698076127765188025, -174, 125, 63, 'n') / result: (0, 8469136766387999159, -112, 63)

[3]libmpf._normalize1 / x: (0, 6821145943170662580121869042907777885, -172, 123, 63, 'n') / result: (0, 5916401000341054029, -112, 63)

[2]libmpf._normalize. / x: (1, 20221242687878400, 0, 55, 63, 'n') / result: (1, 78989229249525, 8, 47)

[2]libmpf._normalize. / x: (1, 35894751740590400, 0, 55, 63, 'n') / result: (1, 560855495946725, 6, 49)

[3]libmpf._normalize1 / x: (0, 642363674922771683084328126007125, -106, 109, 63, 'n') / result: (0, 2282134214662689271, -58, 61)

[3]libmpf._normalize1 / x: (1, 6619289721145418353171827799149175, -106, 113, 63, 'n') / result: (1, 734888785508027537, -53, 60)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (0, 12756953272648110613679942411356138355, -124, 124, 63, 'n') / result: (0, 5532446581000458839, -63, 63)

[3]libmpf._normalize1 / x: (1, 4107971317850247511448630579880261685, -119, 122, 63, 'n') / result: (1, 1781548570928551605, -58, 61)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (1, 409255076269427663321, -91, 69, 63, 'n') / result: (1, 6394610566709807239, -85, 63)

[3]libmpf._normalize1 / x: (0, 527150356066307422297, -88, 69, 63, 'n') / result: (0, 8236724313536053473, -82, 63)

[3]libmpf._normalize1 / x: (0, 26048095903892380148660089, -85, 85, 63, 'n') / result: (0, 48518359482087903, -56, 56)

[3]libmpf._normalize1 / x: (1, 510293621523763548733215, -82, 79, 63, 'n') / result: (1, 7786462730770317821, -66, 63)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (1, 18208136231643925, 7, 55, 63, 'n') / result: (1, 18208136231643925, 7, 55)

[2]libmpf._normalize1 / x: (0, 27164683653387525, 6, 55, 63, 'n') / result: (0, 27164683653387525, 6, 55)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 58131348262252464661397329252607754985, -180, 126, 63, 'n') / result: (0, 6302613407544557513, -117, 63)

[3]libmpf._normalize1 / x: (0, 40609613057016037683593304508534246035, -180, 125, 63, 'n') / result: (0, 2201451535010624755, -116, 61)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize1 / x: (0, 1132845290185002625, 7, 60, 63, 'n') / result: (0, 1132845290185002625, 7, 60)

[2]libmpf._normalize1 / x: (0, 1138746117948137125, 7, 60, 63, 'n') / result: (0, 1138746117948137125, 7, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 43260538241676252766643285993178495895, -185, 126, 63, 'n') / result: (0, 2345158477225881865, -121, 62)

[3]libmpf._normalize1 / x: (0, 15110553695633874487078064579259553325, -184, 124, 63, 'n') / result: (0, 3276579028853022891, -122, 62)

[2]libmpf._normalize. / x: (0, 145004197143680336000, 0, 67, 63, 'n') / result: (0, 1132845290185002625, 7, 60)

[2]libmpf._normalize. / x: (0, 145759503097361552000, 0, 67, 63, 'n') / result: (0, 1138746117948137125, 7, 60)

[3]libmpf._normalize1 / x: (0, 1582211822068889021288552007497862875, -115, 121, 63, 'n') / result: (0, 2744699991710940585, -56, 62)

[3]libmpf._normalize1 / x: (0, 9052937344583372249560880988161565125, -115, 123, 63, 'n') / result: (0, 981521433637244585, -52, 60)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (1, 3203834048497003116997766809311934635, -118, 122, 63, 'n') / result: (1, 2778883068530783801, -58, 62)

[3]libmpf._normalize1 / x: (1, 1145710568700935938572505090700958635, -114, 120, 63, 'n') / result: (1, 7949964080801008155, -57, 63)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (0, 398669629454192827567, -94, 69, 63, 'n') / result: (0, 6229212960221762931, -88, 63)

[3]libmpf._normalize1 / x: (0, 570266750364341689207, -92, 69, 63, 'n') / result: (0, 4455208987221419447, -85, 62)

[3]libmpf._normalize1 / x: (0, 208384773460352001403983219, -88, 88, 63, 'n') / result: (0, 3105175099676132223, -62, 62)

[3]libmpf._normalize1 / x: (1, 4082344516981121168317001, -85, 82, 63, 'n') / result: (1, 3893227116566773575, -65, 62)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 67250930064334569875, 7, 66, 63, 'n') / result: (0, 4203183129020910617, 11, 62)

[3]libmpf._normalize1 / x: (1, 91825377610379692125, 7, 67, 63, 'n') / result: (1, 2869543050324365379, 12, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 16096944462019070794815391019997413975, -189, 124, 63, 'n') / result: (0, 6980936862439834389, -128, 63)

[3]libmpf._normalize1 / x: (0, 22490126430710882956394158131891195765, -190, 125, 63, 'n') / result: (0, 2438384393565040291, -127, 62)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (1, 113043556148415520116, 13, 67, 63, 'n') / result: (1, 7065222259275970007, 17, 63)

[3]libmpf._normalize1 / x: (1, 112676892911839487047, 12, 67, 63, 'n') / result: (1, 1760576451747491985, 18, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 47916485840428861901963194975836255435, -196, 126, 63, 'n') / result: (0, 2597557902303194191, -132, 62)

[3]libmpf._normalize1 / x: (0, 16736838274017401270034348023072816765, -195, 124, 63, 'n') / result: (0, 3629223283445641363, -133, 62)

[2]libmpf._normalize. / x: (1, 926052811967819940757504, 0, 80, 63, 'n') / result: (1, 7065222259275970007, 17, 63)

[2]libmpf._normalize. / x: (1, 461524553366894538915840, 0, 79, 63, 'n') / result: (1, 1760576451747491985, 18, 61)

[2]libmpf._normalize. / x: (1, 11962798860142613399093872470985653782, -115, 124, 63, 'n') / result: (1, 5188037005269495027, -54, 63)

[3]libmpf._normalize1 / x: (1, 43934066225465232618534343002750836081, -116, 126, 63, 'n') / result: (1, 4763341004777143087, -53, 63)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (1, 27913197340332764601137844409272443985, -116, 125, 63, 'n') / result: (1, 1513177459870269383, -52, 61)

[3]libmpf._normalize1 / x: (1, 25628205298188052361355364194830237285, -115, 125, 63, 'n') / result: (1, 5557231172240000269, -53, 63)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (0, 610704775829664459251, -97, 70, 63, 'n') / result: (0, 1192782765292313397, -88, 61)

[3]libmpf._normalize1 / x: (0, 560712095454986969959, -96, 69, 63, 'n') / result: (0, 4380563245742085703, -89, 62)

[3]libmpf._normalize1 / x: (0, 208384774653134766691638069, -88, 88, 63, 'n') / result: (0, 1552587558724990239, -61, 61)

[3]libmpf._normalize1 / x: (1, 65317507891134692948781497, -89, 86, 63, 'n') / result: (1, 7786453710929714793, -66, 63)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 154632813874061267809, 17, 68, 63, 'n') / result: (1, 4832275433564414619, 22, 63)

[2]libmpf._normalize. / x: (0, 270170272947376346050, 18, 68, 63, 'n') / result: (0, 4221410514802755407, 24, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 17829390080159576519904841095945085265, -200, 124, 63, 'n') / result: (0, 1933066345900051491, -137, 61)

[3]libmpf._normalize1 / x: (0, 24910643012491015841377667486103893645, -201, 125, 63, 'n') / result: (0, 1350408663607680507, -137, 61)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 624823400107336659313, 23, 70, 63, 'n') / result: (0, 4881432813338567651, 30, 63)

[3]libmpf._normalize1 / x: (0, 50930145760277360269, 23, 66, 63, 'n') / result: (0, 3183134110017335017, 27, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 13268383315467591828926019066089664765, -205, 124, 63, 'n') / result: (0, 5754244006400153275, -144, 63)

[3]libmpf._normalize1 / x: (0, 9269076469764098916604542938985402405, -205, 123, 63, 'n') / result: (0, 8039642276362004879, -145, 63)

[2]libmpf._normalize. / x: (0, 5241398572727605159132135424, 0, 93, 63, 'n') / result: (0, 4881432813338567651, 30, 63)

[2]libmpf._normalize. / x: (0, 427233028165828746596581376, 0, 89, 63, 'n') / result: (0, 3183134110017335017, 27, 62)

[3]libmpf._normalize1 / x: (0, 423832028578550545527608286222975764457, -118, 129, 63, 'n') / result: (0, 2871997538461268145, -51, 62)

[3]libmpf._normalize1 / x: (0, 175296424835485006849373290793959007591, -117, 128, 63, 'n') / result: (0, 2375709557944684733, -51, 62)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (1, 23483462735426123207885163271561082025, -111, 125, 63, 'n') / result: (1, 2546082131523138941, -48, 62)

[3]libmpf._normalize1 / x: (1, 19425464725182269295182103614303321685, -111, 124, 63, 'n') / result: (1, 8424452422633259489, -50, 63)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (0, 548040419091469811637, -100, 69, 63, 'n') / result: (0, 8563131548304215807, -94, 63)

[3]libmpf._normalize1 / x: (0, 906675471924798877883, -101, 70, 63, 'n') / result: (0, 7083402124412491233, -94, 63)

[3]libmpf._normalize1 / x: (0, 13336625586363756617152663295, -94, 94, 63, 'n') / result: (0, 776293779860934977, -60, 60)

[3]libmpf._normalize1 / x: (1, 2090160245432908049996409375, -94, 91, 63, 'n') / result: (1, 7786453684541985579, -66, 63)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 181476274949707333465, 28, 68, 63, 'n') / result: (1, 5671133592178354171, 33, 63)

[3]libmpf._normalize1 / x: (1, 2781349387119857909815, 27, 72, 63, 'n') / result: (1, 169760094428702265, 41, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 39496582892554691952201410016567009125, -212, 125, 63, 'n') / result: (0, 8564456195572321153, -150, 63)

[3]libmpf._normalize1 / x: (0, 55183338982781612155467035261356448785, -213, 126, 63, 'n') / result: (0, 2991494800506792513, -149, 62)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 184460172167968182629, 37, 68, 63, 'n') / result: (1, 5764380380249005707, 42, 63)

[3]libmpf._normalize1 / x: (0, 546158349116224634705, 34, 69, 63, 'n') / result: (0, 8533724204941009917, 40, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 58785611747058146158063912578056246495, -218, 126, 63, 'n') / result: (0, 6373548796704983183, -155, 63)

[3]libmpf._normalize1 / x: (0, 20533335435453623126817512565666020895, -217, 124, 63, 'n') / result: (0, 8904914754996963759, -156, 63)

[2]libmpf._normalize. / x: (1, 25352013020030488420436334870528, 0, 105, 63, 'n') / result: (1, 5764380380249005707, 42, 63)

[2]libmpf._normalize. / x: (0, 9382928991566141235898028654592, 0, 103, 63, 'n') / result: (0, 8533724204941009917, 40, 63)

[3]libmpf._normalize1 / x: (1, 369908563677940842531482276221356801051, -116, 129, 63, 'n') / result: (1, 5013195854507700223, -50, 63)

[3]libmpf._normalize1 / x: (1, 48272524165174795832223930896805119415, -115, 126, 63, 'n') / result: (1, 1308429389281038123, -50, 61)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (1, 9928862049447490149502986725196901127, -105, 123, 63, 'n') / result: (1, 1076489380431984677, -42, 60)

[3]libmpf._normalize1 / x: (1, 2591403823956525552990012232552918227, -105, 121, 63, 'n') / result: (1, 561921131144181737, -43, 59)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (0, 775404756564307801853, -104, 70, 63, 'n') / result: (0, 3028924830329327351, -96, 62)

[3]libmpf._normalize1 / x: (0, 809513453311255174855, -106, 70, 63, 'n') / result: (0, 3162161926997090527, -98, 62)

[3]libmpf._normalize1 / x: (0, 53346502348483951297489522423, -96, 96, 63, 'n') / result: (0, 6210350239240093075, -63, 63)

[3]libmpf._normalize1 / x: (1, 33442563923764366873711533857, -98, 95, 63, 'n') / result: (1, 3893226841902868691, -65, 62)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 494669280101401541133, 41, 69, 63, 'n') / result: (0, 966150937698049885, 50, 60)

[3]libmpf._normalize1 / x: (0, 1468953194985724429371, 40, 71, 63, 'n') / result: (0, 1434524604478246513, 50, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 43747431997810713415644645899168668945, -223, 126, 63, 'n') / result: (0, 2371553040634412347, -159, 62)

[3]libmpf._normalize1 / x: (0, 61122486877629389768542236734225663985, -224, 126, 63, 'n') / result: (0, 6626913306044252099, -161, 63)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[2]libmpf._normalize. / x: (0, 41513002717456178990, 51, 66, 63, 'n') / result: (0, 2594562669841011187, 55, 62)

[2]libmpf._normalize. / x: (1, 46726004259735964592, 51, 66, 63, 'n') / result: (1, 2920375266233497787, 55, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 16278114231743521269820162813614156005, -227, 124, 63, 'n') / result: (0, 3529753362804706749, -165, 62)

[3]libmpf._normalize1 / x: (0, 45486501862421871450710942501749365085, -229, 126, 63, 'n') / result: (0, 4931656413800373655, -166, 63)

[2]libmpf._normalize. / x: (0, 93478971784683017776011540237910016, 0, 117, 63, 'n') / result: (0, 2594562669841011187, 55, 62)

[2]libmpf._normalize. / x: (1, 105217607686329549464615771560738816, 0, 117, 63, 'n') / result: (1, 2920375266233497787, 55, 62)

[3]libmpf._normalize1 / x: (0, 32718620030182137810321523044542403611, -111, 125, 63, 'n') / result: (0, 3547359891745121447, -48, 62)

[3]libmpf._normalize1 / x: (1, 7820917201550315036106654122515850441, -111, 123, 63, 'n') / result: (1, 6783564336600082647, -51, 63)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (1, 8453229998357796617004503191587768331, -100, 123, 63, 'n') / result: (1, 7332008262991328137, -40, 63)

[3]libmpf._normalize1 / x: (0, 16164987848957173991742346258352855931, -103, 124, 63, 'n') / result: (0, 7010445977616459701, -42, 63)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (0, 889483782045724514323, -108, 70, 63, 'n') / result: (0, 434318252952013923, -97, 59)

[3]libmpf._normalize1 / x: (1, 850473400783304647323, -110, 70, 63, 'n') / result: (1, 6644323443619567557, -103, 63)

[3]libmpf._normalize1 / x: (0, 106693004697402220849436314723, -97, 97, 63, 'n') / result: (0, 6210350239265373725, -63, 63)

[3]libmpf._normalize1 / x: (1, 1070162045567104063374968657861, -103, 100, 63, 'n') / result: (1, 3893226841927040599, -65, 62)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 253722959363324057643, 55, 68, 63, 'n') / result: (1, 7928842480103876801, 60, 63)

[3]libmpf._normalize1 / x: (1, 126132256830434325137, 55, 67, 63, 'n') / result: (1, 7883266051902145321, 59, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 24227890949571752587479686402318444835, -233, 125, 63, 'n') / result: (0, 2626793200226758511, -170, 62)

[3]libmpf._normalize1 / x: (0, 33850419990639532241910661528863746825, -234, 125, 63, 'n') / result: (0, 7340139778679625905, -172, 63)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 117337462214497550215, 60, 67, 63, 'n') / result: (1, 916698923550762111, 67, 60)

[2]libmpf._normalize. / x: (0, 316925817063146414640, 61, 69, 63, 'n') / result: (0, 4951965891611662729, 67, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 18030058381076653089155104389122198065, -238, 124, 63, 'n') / result: (0, 7819291386721513707, -177, 63)

[3]libmpf._normalize1 / x: (0, 50382020451184420080185181720679430575, -240, 126, 63, 'n') / result: (0, 5462429602738326255, -177, 63)

[2]libmpf._normalize. / x: (1, 135280883483087570306504974535132971008, 0, 127, 63, 'n') / result: (1, 916698923550762111, 67, 60)

[2]libmpf._normalize. / x: (0, 730781179714394202117005530806471360512, 0, 130, 63, 'n') / result: (0, 4951965891611662729, 67, 63)

[2]libmpf._normalize. / x: (1, 34217701075227393957782574534408405372, -110, 125, 63, 'n') / result: (1, 7419781168644224303, -48, 63)

[2]libmpf._normalize. / x: (0, 33713460906815754513427068060224002098, -110, 125, 63, 'n') / result: (0, 7310441511434953081, -48, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (1, 6466071175593674389904294842070227171, -95, 123, 63, 'n') / result: (1, 5608422732819649111, -35, 63)

[3]libmpf._normalize1 / x: (0, 6370785615310857101301731270443626917, -95, 123, 63, 'n') / result: (0, 5525775683647545911, -35, 63)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (0, 377010824006825159811, -111, 69, 63, 'n') / result: (0, 2945397062553321561, -104, 62)

[3]libmpf._normalize1 / x: (1, 371455102978920039559, -111, 69, 63, 'n') / result: (1, 2901992992022812809, -104, 62)

[3]libmpf._normalize1 / x: (0, 13656704601270429666678014492761, -104, 104, 63, 'n') / result: (0, 6210350239266713137, -63, 63)

[3]libmpf._normalize1 / x: (1, 2140324091137110119810486851721, -104, 101, 63, 'n') / result: (1, 7786453683864638587, -66, 63)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 365888289807382395361, 67, 69, 63, 'n') / result: (0, 714625566030043741, 76, 60)

[3]libmpf._normalize1 / x: (1, 39822359075291569539, 67, 66, 63, 'n') / result: (1, 311112180275715387, 74, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 53670871459949106868925721590845380405, -245, 126, 63, 'n') / result: (0, 5819007543606707875, -182, 63)

[3]libmpf._normalize1 / x: (0, 37493596614834917269773147416739675825, -245, 125, 63, 'n') / result: (0, 4065063890409917213, -182, 62)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 42332451214971963149, 75, 66, 63, 'n') / result: (1, 2645778200935747697, 79, 62)

[3]libmpf._normalize1 / x: (1, 96625345261173254483, 75, 67, 63, 'n') / result: (1, 6039084078823328405, 79, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 39941113644613288832848534783224768125, -250, 125, 63, 'n') / result: (0, 8660848436996030325, -188, 63)

[3]libmpf._normalize1 / x: (0, 27902211434295752386648297966605971395, -250, 125, 63, 'n') / result: (0, 756290956355333435, -185, 60)

[2]libmpf._normalize. / x: (1, 1599274790042383911534909271951757421838336, 0, 141, 63, 'n') / result: (1, 2645778200935747697, 79, 62)

[2]libmpf._normalize. / x: (1, 3650402334856575055834489081471515114864640, 0, 142, 63, 'n') / result: (1, 6039084078823328405, 79, 63)

[3]libmpf._normalize1 / x: (0, 13623753391655963576603073787492857875, -109, 124, 63, 'n') / result: (0, 2954180604928031013, -47, 62)

[3]libmpf._normalize1 / x: (1, 68311416912082956828295732192560675185, -109, 126, 63, 'n') / result: (1, 925792332770542133, -43, 60)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (1, 17998474380587784289684674982079285871, -93, 124, 63, 'n') / result: (1, 487849625621449237, -28, 59)

[3]libmpf._normalize1 / x: (0, 5640430228036494484391914624905450911, -89, 123, 63, 'n') / result: (0, 4892293365592061201, -29, 63)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (0, 973374390231458483163, -118, 70, 63, 'n') / result: (0, 950560927960408675, -108, 60)

[3]libmpf._normalize1 / x: (1, 610079523159985914605, -115, 70, 63, 'n') / result: (1, 2383123137343694979, -107, 62)

[3]libmpf._normalize1 / x: (0, 218507273620327825244963585794659, -108, 108, 63, 'n') / result: (0, 3105175119633370077, -62, 62)

[3]libmpf._normalize1 / x: (1, 17122592729099264081613964880003, -107, 104, 63, 'n') / result: (1, 3893226841932861153, -65, 62)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 361882986896110791319, 79, 69, 63, 'n') / result: (1, 2827210835125865557, 86, 62)

[3]libmpf._normalize1 / x: (0, 324103407878438892105, 79, 69, 63, 'n') / result: (0, 5064115748100607689, 85, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 59447238912912801979783921089210784875, -256, 126, 63, 'n') / result: (0, 6445282557764487683, -193, 63)

[3]libmpf._normalize1 / x: (0, 5191109104055023700001169500103735525, -253, 122, 63, 'n') / result: (0, 9005138829161179505, -194, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 245097111226542042483, 86, 68, 63, 'n') / result: (0, 1914821181457359707, 93, 61)

[3]libmpf._normalize1 / x: (0, 68567684740801648361, 87, 66, 63, 'n') / result: (0, 8570960592600206045, 90, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 44239805702632782863728009928715036445, -261, 126, 63, 'n') / result: (0, 4796489345313107113, -198, 63)

[3]libmpf._normalize1 / x: (0, 61810415378515631031773936283605774575, -262, 126, 63, 'n') / result: (0, 6701498663561808003, -199, 63)

[2]libmpf._normalize. / x: (0, 18963470468782417181340605715014651629161938944, 0, 154, 63, 'n') / result: (0, 1914821181457359707, 93, 61)

[2]libmpf._normalize. / x: (0, 10610335292716945272821143220334796732450734080, 0, 153, 63, 'n') / result: (0, 8570960592600206045, 90, 63)

[3]libmpf._normalize1 / x: (0, 89512429363890101857510522956850756121, -109, 127, 63, 'n') / result: (0, 151639953719976419, -40, 58)

[3]libmpf._normalize1 / x: (0, 92439207515490756194541836713524438569, -108, 127, 63, 'n') / result: (0, 1252784870139168083, -42, 61)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (0, 950705294968655360146098317100851361, -82, 120, 63, 'n') / result: (0, 6596843175670326077, -25, 63)

[3]libmpf._normalize1 / x: (0, 7854323219442035092372672186707979377, -84, 123, 63, 'n') / result: (0, 1703134859584479165, -22, 61)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (1, 647987638695685730463, -120, 70, 63, 'n') / result: (1, 5062403427310044769, -113, 63)

[3]libmpf._normalize1 / x: (1, 669174819927601872385, -119, 70, 63, 'n') / result: (1, 1306982070171097407, -110, 61)

[3]libmpf._normalize1 / x: (0, 6992232755850485345923495869479327, -113, 113, 63, 'n') / result: (0, 3105175119633367829, -62, 62)

[3]libmpf._normalize1 / x: (1, 136980741832795419636151009040703, -110, 107, 63, 'n') / result: (1, 7786453683865796599, -66, 63)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 108501502595271240875, 91, 67, 63, 'n') / result: (0, 6781343912204452555, 95, 63)

[3]libmpf._normalize1 / x: (1, 1286573876431126587045, 90, 71, 63, 'n') / result: (1, 5025679204809088231, 98, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 32922646104284861666509024000784179895, -266, 125, 63, 'n') / result: (0, 3569480443023707619, -203, 62)

[3]libmpf._normalize1 / x: (0, 45998448653779074251255463096636889245, -267, 126, 63, 'n') / result: (0, 4987161796139019909, -204, 63)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 1495347648205202587895, 96, 71, 63, 'n') / result: (1, 5841201750801572609, 104, 63)

[3]libmpf._normalize1 / x: (0, 285323600372989336599, 96, 68, 63, 'n') / result: (0, 8916362511655916769, 101, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 24500573845049199379887271460388525885, -271, 125, 63, 'n') / result: (0, 2656357538994387065, -208, 62)

[3]libmpf._normalize1 / x: (0, 34231403649323962232055806422043366235, -272, 125, 63, 'n') / result: (0, 927844055095631611, -207, 60)

[2]libmpf._normalize. / x: (1, 118473646487324767653589651508497944019710450335744, 0, 167, 63, 'n') / result: (1, 5841201750801572609, 104, 63)

[2]libmpf._normalize. / x: (0, 22605664579506211930671565284257242779516338700288, 0, 164, 63, 'n') / result: (0, 8916362511655916769, 101, 63)

[3]libmpf._normalize1 / x: (1, 70338275179633378319836775197492995199, -106, 126, 63, 'n') / result: (1, 3813045537932087171, -42, 62)

[3]libmpf._normalize1 / x: (1, 63030542327282823696191320711104096599, -107, 126, 63, 'n') / result: (1, 6833785092417958009, -44, 63)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (0, 28611875903088828833194738089550911567, -80, 125, 63, 'n') / result: (0, 6204211602602912469, -18, 63)

[3]libmpf._normalize1 / x: (0, 51278540753720080194807514165758619293, -82, 126, 63, 'n') / result: (0, 5559630528706978693, -19, 63)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (1, 412729326048778642331, -122, 69, 63, 'n') / result: (1, 3224447859756083143, -115, 62)

[3]libmpf._normalize1 / x: (1, 369849177973033859695, -123, 69, 63, 'n') / result: (1, 2889446702914327029, -116, 62)

[3]libmpf._normalize1 / x: (0, 27968931023401938160675908304263225, -115, 115, 63, 'n') / result: (0, 3105175119633367471, -62, 62)

[3]libmpf._normalize1 / x: (1, 8766767477298909745789655601762805, -116, 113, 63, 'n') / result: (1, 7786453683865799165, -66, 63)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 942922476994526928687, 102, 70, 63, 'n') / result: (0, 3683290925759870815, 110, 62)

[3]libmpf._normalize1 / x: (0, 3030331192634170908277, 101, 72, 63, 'n') / result: (0, 5918615610613615055, 110, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 18232985187013357675980509876778271975, -276, 124, 63, 'n') / result: (0, 988412107532795187, -212, 60)

[3]libmpf._normalize1 / x: (0, 6368633237083527857286287352278134565, -275, 123, 63, 'n') / result: (0, 5523908793127481219, -215, 63)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 155585473410838335515, 111, 68, 63, 'n') / result: (0, 4862046044088697985, 116, 63)

[3]libmpf._normalize1 / x: (1, 211775800950186089295, 111, 68, 63, 'n') / result: (1, 3308996889846657645, 117, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 6784366581214272623780280530234074605, -280, 123, 63, 'n') / result: (0, 5884499989032455067, -220, 63)

[3]libmpf._normalize1 / x: (0, 37915583923101933290050080626856169885, -283, 125, 63, 'n') / result: (0, 8221631692096716233, -221, 63)

[2]libmpf._normalize. / x: (0, 403922982412374921222279527581025166360831090187304960, 0, 179, 63, 'n') / result: (0, 4862046044088697985, 116, 63)

[2]libmpf._normalize. / x: (1, 549801412993674097643092969774969033377919205313085440, 0, 179, 63, 'n') / result: (1, 3308996889846657645, 117, 62)

[2]libmpf._normalize. / x: (0, 55816063591727982066475575827110991280, -104, 126, 63, 'n') / result: (0, 6051589740574054575, -41, 63)

[3]libmpf._normalize1 / x: (1, 37913216803531231967258771787394258355, -105, 125, 63, 'n') / result: (1, 8221118404860498767, -43, 63)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (0, 31271834218134681447060627638950718325, -74, 125, 63, 'n') / result: (0, 6780998119381631517, -12, 63)

[3]libmpf._normalize1 / x: (1, 42482961149984667793085527355168389717, -76, 125, 63, 'n') / result: (1, 9212023754486132119, -14, 63)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (1, 530949302607709126787, -126, 69, 63, 'n') / result: (1, 4148041426622727553, -119, 62)

[3]libmpf._normalize1 / x: (0, 721297588045355456365, -128, 70, 63, 'n') / result: (0, 5635137406604339503, -121, 63)

[3]libmpf._normalize1 / x: (0, 447502896374431006420701531186412159, -119, 119, 63, 'n') / result: (0, 1552587559816683721, -61, 61)

[3]libmpf._normalize1 / x: (1, 280536559273565106217730230055147217, -121, 118, 63, 'n') / result: (1, 7786453683865799009, -66, 63)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 604258899857104311865, 116, 70, 63, 'n') / result: (1, 1180193163783406859, 125, 61)

[2]libmpf._normalize. / x: (1, 74210701737551357770, 117, 67, 63, 'n') / result: (1, 4638168858596959861, 121, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 40390647553275669575570394388010204805, -288, 125, 63, 'n') / result: (0, 4379162782535780515, -225, 62)

[3]libmpf._normalize1 / x: (0, 56432497001826133269390624986828684695, -289, 126, 63, 'n') / result: (0, 6118423584816160917, -226, 63)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 120910449257124051025, 122, 67, 63, 'n') / result: (0, 7556903078570253189, 126, 63)

[3]libmpf._normalize1 / x: (0, 730480704597662238955, 122, 70, 63, 'n') / result: (0, 2853440252334618121, 130, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 30058156318716777358723640120649753725, -293, 125, 63, 'n') / result: (0, 6517823676332324487, -231, 63)

[3]libmpf._normalize1 / x: (0, 41996276838568285219741915820655732555, -294, 125, 63, 'n') / result: (0, 2276622729233920341, -230, 61)

[2]libmpf._normalize. / x: (0, 642870216542003090523024845207730056680997546014902583296, 0, 189, 63, 'n') / result: (0, 7556903078570253189, 126, 63)

[2]libmpf._normalize. / x: (0, 2853440252334618121, 130, 62, 63, 'n') / result: (0, 2853440252334618121, 130, 62)

[3]libmpf._normalize1 / x: (1, 158624060113977040225426305182516637309, -105, 127, 63, 'n') / result: (1, 8599027529202257955, -41, 63)

[3]libmpf._normalize1 / x: (0, 165989980796620875230522718722645048865, -104, 127, 63, 'n') / result: (0, 8998334889526175743, -40, 63)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (0, 69785495898135857599568863525569931065, -70, 126, 63, 'n') / result: (0, 7566158626073715525, -7, 63)

[3]libmpf._normalize1 / x: (1, 73026078866541050153875611866288686349, -69, 126, 63, 'n') / result: (1, 7917503335520158979, -6, 63)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (1, 611537589954826847421, -131, 70, 63, 'n') / result: (1, 4777637421522084745, -124, 63)

[3]libmpf._normalize1 / x: (0, 639935156999988553525, -130, 70, 63, 'n') / result: (0, 2499746707031205287, -122, 62)

[3]libmpf._normalize1 / x: (0, 14320092683981792199683242693976136823, -124, 124, 63, 'n') / result: (0, 3105175119633367441, -62, 62)

[3]libmpf._normalize1 / x: (1, 561073118547130209965003896371010137, -122, 119, 63, 'n') / result: (1, 3893226841932899487, -65, 62)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 2961589087179094446661, 126, 72, 63, 'n') / result: (0, 5784353685896668841, 135, 63)

[3]libmpf._normalize1 / x: (1, 972144790328944155623, 127, 70, 63, 'n') / result: (1, 949360146805609527, 137, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 44737721032508691879718576210719534105, -299, 126, 63, 'n') / result: (0, 4850473433549636827, -236, 63)

[3]libmpf._normalize1 / x: (0, 15626521614350989847769663027580837515, -298, 124, 63, 'n') / result: (0, 3388461736534207019, -236, 62)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 56365019881783008809, 138, 66, 63, 'n') / result: (1, 7045627485222876101, 141, 63)

[3]libmpf._normalize1 / x: (1, 141693329610824399707, 136, 67, 63, 'n') / result: (1, 4427916550338262491, 141, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 33293187745122747441700572767347195205, -304, 125, 63, 'n') / result: (0, 7219309296445971091, -242, 63)

[3]libmpf._normalize1 / x: (0, 23258078681824729074632816287532176885, -304, 125, 63, 'n') / result: (0, 5043291886934633703, -242, 63)

[2]libmpf._normalize. / x: (1, 7045627485222876101, 141, 63, 63, 'n') / result: (1, 7045627485222876101, 141, 63)

[2]libmpf._normalize. / x: (1, 4427916550338262491, 141, 62, 63, 'n') / result: (1, 4427916550338262491, 141, 62)

[2]libmpf._normalize. / x: (1, 28533288389020208425953883128371462018, -101, 125, 63, 'n') / result: (1, 6187170651906225791, -39, 63)

[2]libmpf._normalize. / x: (1, 67499655050332189968804778634743479684, -101, 126, 63, 'n') / result: (1, 7318327264759231151, -38, 63)

[3]libmpf._normalize1 / x: (0, 15478498771225430759843386699, -55, 94, 63, 'n') / result: (0, 7207737663400094379, -24, 63)

[8]gammazeta.mpf_bernoulli / n: 34 / prec: 63 / result: (0, 7207737663400094379, -24, 63)

[3]libmpf._normalize1 / x: (1, 44595502937628218577714113007083928789, -63, 126, 63, 'n') / result: (1, 604381764600752619, 3, 60)

[3]libmpf._normalize1 / x: (1, 52748583059292904596298153284876800229, -62, 126, 63, 'n') / result: (1, 5719012834841744291, 1, 63)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (0, 356661436406189683097, -134, 69, 63, 'n') / result: (0, 2786417471923356899, -127, 62)

[3]libmpf._normalize1 / x: (0, 421867322107146703547, -133, 69, 63, 'n') / result: (0, 6591676907924167243, -127, 63)

[3]libmpf._normalize1 / x: (0, 114560741471854337601579970248490026211, -127, 127, 63, 'n') / result: (0, 3105175119633367441, -62, 62)

[3]libmpf._normalize1 / x: (1, 17954339793508166711575837078467438005, -127, 124, 63, 'n') / result: (1, 7786453683865798971, -66, 63)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (1, 77448451511323463037, 141, 67, 63, 'n') / result: (1, 605066027432214555, 148, 60)

[3]libmpf._normalize1 / x: (0, 639315170126763989273, 141, 70, 63, 'n') / result: (0, 2497324883307671833, 149, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 49552651527624554329439025245023898765, -310, 126, 63, 'n') / result: (0, 167890913870836537, -242, 58)

[3]libmpf._normalize1 / x: (0, 34616675247367038624784441963558754745, -310, 125, 63, 'n') / result: (0, 938286862685513247, -245, 60)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 35, 1, 6, 63, 'n') / result: (1, 35, 1, 6)

[3]libmpf._normalize1 / x: (0, 185098864297884675745, 149, 68, 63, 'n') / result: (0, 5784339509308896117, 154, 63)

[3]libmpf._normalize1 / x: (1, 63731735072333332897, 149, 66, 63, 'n') / result: (1, 1991616721010416653, 154, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 1152387244828478007661372680116834855, -310, 120, 63, 'n') / result: (0, 7996292828080772739, -253, 63)

[3]libmpf._normalize1 / x: (0, 6440311673928751371574042357991429505, -313, 123, 63, 'n') / result: (0, 1396519981671461577, -251, 61)

[2]libmpf._normalize. / x: (0, 5784339509308896117, 154, 63, 63, 'n') / result: (0, 5784339509308896117, 154, 63)

[2]libmpf._normalize. / x: (1, 1991616721010416653, 154, 61, 63, 'n') / result: (1, 1991616721010416653, 154, 61)

[3]libmpf._normalize1 / x: (0, 57378602720359156079712412381438321587, -99, 126, 63, 'n') / result: (0, 48601566971559431, -29, 56)

[3]libmpf._normalize1 / x: (0, 16386232319584942695801210490805963469, -99, 124, 63, 'n') / result: (0, 7106395471898472583, -38, 63)

[3]libmpf._normalize1 / x: (1, 1929743914758391793175373481, -47, 91, 63, 'n') / result: (1, 1797214071041337953, -17, 61)

[8]gammazeta.mpf_bernoulli / n: 36 / prec: 63 / result: (1, 1797214071041337953, -17, 61)

[3]libmpf._normalize1 / x: (1, 87347420035944555497150277095384743, -46, 117, 63, 'n') / result: (1, 4848755843275518201, 8, 63)

[3]libmpf._normalize1 / x: (1, 12771713936480383851592067273407842599, -55, 124, 63, 'n') / result: (1, 5538847998518170381, 6, 63)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (0, 581359184713790544049, -137, 69, 63, 'n') / result: (0, 9083737261152977251, -131, 63)

[3]libmpf._normalize1 / x: (0, 664100288971626478995, -139, 70, 63, 'n') / result: (0, 5188283507590831867, -132, 63)

[3]libmpf._normalize1 / x: (0, 1832971863549669401589780581686219686243, -131, 131, 63, 'n') / result: (0, 3105175119633367441, -62, 62)

[3]libmpf._normalize1 / x: (1, 574538873392261334754811235172425916677, -132, 129, 63, 'n') / result: (1, 7786453683865798971, -66, 63)

[2]libmpf._normalize. / x: (0, 3105175119633367441, -62, 62, 63, 'n') / result: (0, 3105175119633367441, -62, 62)

[2]libmpf._normalize. / x: (1, 7786453683865798971, -66, 63, 63, 'n') / result: (1, 7786453683865798971, -66, 63)

[2]libmpf._normalize1 / x: (1, 6108702368905369025, -62, 63, 63, 'n') / result: (1, 6108702368905369025, -62, 63)

[3]libmpf._normalize1 / x: (0, 186503196627087369765, -66, 68, 63, 'n') / result: (0, 5828224894596480305, -61, 63)

[2]libmpf._normalize1 / x: (1, 6108702368905369025, -62, 63, 63, 'n') / result: (1, 6108702368905369025, -62, 63)

[3]libmpf._normalize1 / x: (0, 186503196627087369765, -66, 68, 63, 'n') / result: (0, 5828224894596480305, -61, 63)

[3]libmpf._normalize1 / x: (1, 6108702368905369025, -62, 63, 53, 'n') / result: (1, 5965529657134149, -52, 53)

[3]libmpf._normalize1 / x: (0, 5828224894596480305, -61, 63, 53, 'n') / result: (0, 5691625873629375, -51, 53)

zeta_ / result: (-1.32461367588691 + 2.52758963698224j) / count: 10510
zeta / count: 0 / s: Complex { re: 0.0, im: 70.0 }
gamma_ / s: (1.0, -70.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-70j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-70j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-70.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4925812092436480, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4925812092436480 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=4925812092436480, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4925812092436480, -46, 53, 53, 'd') / result: (1, 35, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4925812092436480, -46, 53, 53, 'd') / result: (1, 35, 1, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 35, 1, 6)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-70.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 35, 1, 6)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 35, 1, 6), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 35, 1, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 35, 1, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 35, 1, 6), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=322818021289917153280, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=700000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=700000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-70j) / result: (1.0 - 70.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-70j) / result: (1.0 - 70.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 35, 1, 6)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 35, 1, 6)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 35, 1, 6)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 35, 1, 6), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=490 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 35, 1, 6), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=4835703278458516698824704, y=-338499229492096168917729280, prec=82 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=82, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 35, 1, 6)), prec=82, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 35, 1, 6), prec=82, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 35, 1, 6), t=(1, 35, 1, 6), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1225, 2, 11), prec=102, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4901 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4901, exp=0, bc=13, prec=102, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 4901, 0, 13, 102, 'd') / result: (0, 4901, 0, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 4901, 0, 13, 102, 'd') / result: (0, 4901, 0, 13)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 4901, 0, 13), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4900 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4900, exp=0, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4900, 0, 13, 10, 'd') / result: (0, 153, 5, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4900, 0, 13, 10, 'd') / result: (0, 153, 5, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 4901, 0, 13), prec=82, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=4901, n=89 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=3033572066268824363640303910912, prec=102 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=213250875960949083790935305982199956900937728, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=76090455170697356249773483966463588535369791071994200768390988464653403042917606456557568 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=98424779221995506542106423314453799008946283906057856014902711953658085035602276761206784 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=111941618779049247020144125568153613712820560946935554376778321634320494284142832473079808 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119380982756374199969428553109310914411902333146325824129524709144450417183435566037860352 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123284061410250120365347220981936516101621756815216374284053274718733727820388094470782976 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125283196299750628594209274773535321897410402579425193524835211853259640101362438781272064 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126294887587732444869693332863748834994037399853316290563140838535843019135614737310547968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126803792737867941780417705330538728679092780021917333247929247447325458313508881554210816 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=102, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=43085895060442497834358153874690, exp=-102, prec=82, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=43085895060442497834358153874690 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=43085895060442497834358153874690, exp=-102, bc=106, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 43085895060442497834358153874690, -102, 106, 82, 'd') / result: (0, 2568119469907432665488609, -78, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 43085895060442497834358153874690, -102, 106, 82, 'd') / result: (0, 2568119469907432665488609, -78, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 2568119469907432665488609, -78, 82), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 35, 1, 6)), prec=82, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 35, 1, 6), x=(0, 1, 0, 1), prec=82, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 35, 1, 6), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 35, 1, 6), x=(0, 1, 0, 1), prec=82, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 35, 1, 6), t=(0, 1, 0, 1), prec=86, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35, exp=1, bc=6, prec=86, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 35, 1, 6, 86, 'd') / result: (0, 35, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 35, 1, 6, 86, 'd') / result: (0, 35, 1, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 35, 1, 6), prec=86, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 35, 1, 6), prec=123, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1244461227596574952094627135750466601897 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1244461227596574952094627135750466601897, exp=-136, bc=130, prec=123, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 1244461227596574952094627135750466601897, -136, 130, 123, 'd') / result: (0, 9722353340598241813239274498050520327, -129, 123)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1244461227596574952094627135750466601897, -136, 130, 123, 'd') / result: (0, 9722353340598241813239274498050520327, -129, 123)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 9722353340598241813239274498050520327, -129, 123), prec=123 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=151911770946847528331863664032039380, prec=123 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=1, prec=123 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=122 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=2787593149816327892691964784081045188247552, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=664600476781160997046295488563773440, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=664600476781160997046295488563773440, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=10328999512347634358623676688012047497318823171316894051322637426162590488067364778518581413120551325743612687890989973504, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10328999512347634358623676688012047497318823171316894051322637426162590488067364778518581413120551325743612687890989973504 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=30029914574708654043708814807348761436030351443454986298718509317477438022062124524872795656503836279259546356635926274197294579195040433668812636961252449125591132385807646598506952315972477104935964297333093795331197630715978954398841659090334092305017532 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=30029914574708654043708814807348761436030351443454986298718509317477438022062124524872795656503836279259546356635926274197294579195040433668812636961252449125591132385807646598506952315972477104935964297333093795331197630715978954398841659090334092305017532 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=436, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=2787593149816327892691964784081045188247552, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=3138487016050771648187139513501314789921024079999965069312, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=3138487016050771648187139513501314789921024079999965069312, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=2787593149816327892691964784081045188247552, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=3138487016050771648187139513500276316217043990175626526738, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=123, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=16551670187937116182970922466608329974, exp=-123, prec=86, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=16551670187937116182970922466608329974 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=16551670187937116182970922466608329974, exp=-123, bc=124, prec=86, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 16551670187937116182970922466608329974, -123, 124, 86, 'd') / result: (0, 15053656341421734562546519, -83, 84)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 16551670187937116182970922466608329974, -123, 124, 86, 'd') / result: (0, 15053656341421734562546519, -83, 84)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 15053656341421734562546519, -83, 84), prec=82, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15053656341421734562546519, exp=-83, bc=84, prec=82, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15053656341421734562546519, -83, 84, 82, 'd') / result: (0, 3763414085355433640636629, -81, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15053656341421734562546519, -83, 84, 82, 'd') / result: (0, 3763414085355433640636629, -81, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 3763414085355433640636629, -81, 82), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2568119469907432665488609, -79, 82), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 3763414085355433640636629, -81, 82), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-516997401046120957467877053, exp=-82, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=516997401046120957467877053 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1103405332087303469214158028, exp=-82, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1103405332087303469214158028 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 516997401046120957467877053, -82, 89), (1, 275851333021825867303539507, -80, 88)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 516997401046120957467877053, -82, 89), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=78, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1240226291269439526593, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3992506113129994301095, exp=-226, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3992506113129994301095 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3992506113129994301095, exp=-226, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3992506113129994301095, -226, 72, 57, 'n') / result: (0, 121841617221984689, -211, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3992506113129994301095, -226, 72, 57, 'n') / result: (0, 121841617221984689, -211, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 275851333021825867303539507, -80, 88), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=275851333021825867303539507, exp=-80, mag=8, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=94, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=63971671448488985140476847, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-62164993767721677778684581, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=62164993767721677778684581 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=62164993767721677778684581, exp=-87, bc=86, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 62164993767721677778684581, -87, 86, 57, 'n') / result: (1, 57895662046709729, -57, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 62164993767721677778684581, -87, 86, 57, 'n') / result: (1, 57895662046709729, -57, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-141706585506421113443210447, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=141706585506421113443210447 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=141706585506421113443210447, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 141706585506421113443210447, -87, 87, 57, 'n') / result: (1, 32993635513452141, -55, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 141706585506421113443210447, -87, 87, 57, 'n') / result: (1, 32993635513452141, -55, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 121841617221984689, -211, 57), t=(1, 57895662046709729, -57, 56), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=7054101093908593444879755665339281, exp=-268, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 7054101093908593444879755665339281, -268, 113, 53, 'n') / result: (1, 764807173094807, -205, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 7054101093908593444879755665339281, -268, 113, 53, 'n') / result: (1, 764807173094807, -205, 50)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 121841617221984689, -211, 57), t=(1, 32993635513452141, -55, 55), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=4019997908991716029985025836269149, exp=-266, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 4019997908991716029985025836269149, -266, 112, 53, 'n') / result: (1, 3486792373052803, -206, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 4019997908991716029985025836269149, -266, 112, 53, 'n') / result: (1, 3486792373052803, -206, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 764807173094807, -205, 50), (1, 3486792373052803, -206, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.48731460087087e-47 - 3.39036909503708e-47j) / count: 159
gamma__ / s: Complex { re: 1.0, im: -70.0 } / result: Complex { re: -1.487314600870867e-47, im: -3.390369095037078e-47 }
zeta__ / s: Complex { re: 0.0, im: 70.0 } / result: Complex { re: -1.3246136758869096, im: 2.5275896369822415 } / z: Complex { re: 0.0, im: -0.0 }
zeta_ / s: (0.0, 80.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=80j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=80j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=80j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=80.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -46, 53, 53, 'd') / result: (0, 5, 4, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -46, 53, 53, 'd') / result: (0, 5, 4, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 5, 4, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='80.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 5, 4, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 4, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 4, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 4, 3), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=800000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=800000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 80j / result: (0.0 + 80.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 80j / result: (0.0 + 80.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 5, 4, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 5, 4, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 5, 4, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 5, 4, 3), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=4, bc=3, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 4, 3, 10, 'd') / result: (0, 5, 4, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 4, 3, 10, 'd') / result: (0, 5, 4, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 5, 4, 3), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, 4, 3), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: convert / f_locals: x=80j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 536 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=80.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -46, 53, 53, 'd') / result: (0, 5, 4, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -46, 53, 53, 'd') / result: (0, 5, 4, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 5, 4, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='80.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 5, 4, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 4, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 4, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 4, 3), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=800000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=800000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 80j / result: (0.0 + 80.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 80j / result: (0.0 + 80.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 537 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __nonzero__ / f_locals: s=mpc(real='0.0', imag='80.0') / f_lineno: 426 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 540 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_is_nonzero / f_locals: z=((0, 0, 0, 0), (0, 5, 4, 3)) / f_lineno: 84 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 427 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _im / f_locals: x=mpc(real='0.0', imag='80.0') / f_lineno: 75 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 76 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 5, 4, 3) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 77 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 5, 4, 3) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('80.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 5, 4, 3), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=4, bc=3, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 4, 3, 53, 'n') / result: (0, 5, 4, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 4, 3, 53, 'n') / result: (0, 5, 4, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _re / f_locals: x=mpc(real='0.0', imag='80.0') / f_lineno: 70 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 71 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 72 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('80.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 5, 4, 3), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=4, bc=3, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 4, 3, 53, 'n') / result: (0, 5, 4, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 4, 3, 53, 'n') / result: (0, 5, 4, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('80.0'), t=26500 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('80.0'), t=26500 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=26500 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=26500, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=26500, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26500 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 5, 4, 3), t=(0, 6625, 2, 13) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, 4, 3), t=(0, 6625, 2, 13) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: s=mpc(real='0.0', imag='80.0'), t=1 / f_lineno: 442 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 567 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpf('1.0') / f_lineno: 128 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('0.0'), other=mpf('1.0') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpc(real='0.0', imag='80.0') / f_lineno: 408 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 569 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 5, 4, 3)), prec=53, rnd='n' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 411 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 5, 4, 3), prec=53, rnd='n' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 5, 4, 3), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=4, bc=3, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 4, 3, 53, 'n') / result: (0, 5, 4, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 4, 3, 53, 'n') / result: (0, 5, 4, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('80.0'), other=mpf('+inf') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 570 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 5, 4, 3), t=(0, 0, -456, -2) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: isnan / f_locals: x=mpf('80.0') / f_lineno: 318 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 576 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='80.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='80.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('0.0'), t=106 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=106 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=106 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=106, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 53, 1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _hurwitz / f_locals: s=mpc(real='0.0', imag='80.0'), a=1, d=0, kwargs={} / f_lineno: 582 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 580 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 584 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _convert_param / f_locals: x=1 / f_lineno: 1060 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 590 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='80.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='80.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=0 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=0 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=0 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 603 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _hurwitz_em / f_locals: s=mpc(real='0.0', imag='80.0'), a=1, d=0, prec=63, verbose=None / f_lineno: 660 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 604 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 662 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: isint / f_locals: x=mpc(real='0.0', imag='80.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 670 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __sub__ / f_locals: s=mpc(real='0.0', imag='80.0'), t=1 / f_lineno: 479 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 672 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 482 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_sub_mpf / f_locals: z=((0, 0, 0, 0), (0, 5, 4, 3)), p=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 101 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 487 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1, 0, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __add__ / f_locals: self=mpf('1.0'), other=0 / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=63, rnd='n', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _zetasum / f_locals: s=mpc(real='0.0', imag='80.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 725 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='80.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='80.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='80.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=63, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=31.5 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=31.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8866461766385664, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8866461766385664 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8866461766385664, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 63, -1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _zetasum_fast / f_locals: s=mpc(real='0.0', imag='80.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 1291 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 741 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: isint / f_locals: x=mpf('1.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: __int__ / f_locals: s=mpf('1.0') / f_lineno: 143 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1294 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_zetasum / f_locals: s=((0, 0, 0, 0), (0, 5, 4, 3)), a=1, n=20, derivatives=[0], reflect=False, prec=63 / f_lineno: 1338 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1351 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 4, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1352 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: zetasum_sieved / f_locals: critical_line=False, sre=0, sim=755578637259143234191360, a=1, n=20, wp=73 / f_lineno: 1278 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1356 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: primesieve / f_locals: n=21 / f_lineno: 1251 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1281 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1286 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1287 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-523727202107500775824880, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10359864497609337098428, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-830087975947998807598720, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=714127659950256948648, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1216056904630157859220320, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=474747081481842438326, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1470288138651949914151440, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13287046362244843968860, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1811798442511134327748400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12999035056325224739569, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1938020940149502978982320, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5462552219092154155273, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2140715477566415866425200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10468540704166532849235, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2923106861994380523490500502707409441741226957482681016524306391604013108123064232320758539913116025185442390673150162501632, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2923106861994380523490500502707409441741226957482681016524306391604013108123064232320758539913116025185442390673150162501632 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=103008964210452264876323299538623232269790007079632780765807351907312782543242621038653380002226271810412122328895894337411001141108609385361460849423537932912141749437108961768523477034426788398698652854996782468894697768670404476828509051706998130727909067372698791 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=103008964210452264876323299538623232269790007079632780765807351907312782543242621038653380002226271810412122328895894337411001141108609385361460849423537932912141749437108961768523477034426788398698652854996782468894697768670404476828509051706998130727909067372698791 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2224755191371281918855520, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=607586150010218324930, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-22181915467444067796637, exp=-73, prec=63, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1357 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=22181915467444067796637 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=22181915467444067796637, exp=-73, bc=75, prec=63, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 22181915467444067796637, -73, 75, 63, 'n') / result: (1, 676938338239870233, -58, 60)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 22181915467444067796637, -73, 75, 63, 'n') / result: (1, 676938338239870233, -58, 60)

[2]libmpf._normalize. / x: (0, 44361352200125799608945, -73, 76, 63, 'n') / result: (0, 2707602062995959449, -59, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 676938338239870233, -58, 60, 63, 'n') / result: (1, 676938338239870233, -58, 60)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[2]libmpf._normalize. / x: (0, 29894728251118529325738970, -83, 85, 63, 'n') / result: (0, 1781864658064754565, -59, 61)

[3]libmpf._normalize1 / x: (0, 763879266319838071703, -71, 70, 63, 'n') / result: (0, 5967806768123734935, -64, 63)

[3]libmpf._normalize1 / x: (0, 858612087794480947945, -74, 70, 63, 'n') / result: (0, 3353953467947191203, -66, 62)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (1, 18246294098583086746665, -66, 74, 73, 'd') / result: (1, 2280786762322885843333, -63, 71)

[2]libmpf._normalize. / x: (1, 6137309166729861903796655579, -93, 93, 63, 'n') / result: (1, 5715814574370032087, -63, 63)

[2]libmpf._normalize. / x: (1, 7772589710475556490811124285, -93, 93, 63, 'n') / result: (1, 7238788260589872013, -63, 63)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[2]libmpf._normalize1 / x: (1, 3649258819716617349333, -70, 72, 73, 'd') / result: (1, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (0, 18246294098583086746665, -66, 74, 73, 'd') / result: (0, 2280786762322885843333, -63, 71)

[2]libmpf._normalize. / x: (0, 3516875111606193962782702, -86, 82, 67, 'n') / result: (0, 107326510974310118493, -71, 67)

[2]libmpf._normalize. / x: (1, 98196946667677790460746489319, -97, 97, 67, 'n') / result: (1, 22863258297480128347, -65, 65)

[2]libmpf._normalize. / x: (0, 124361435367608903852977988568, -97, 97, 67, 'n') / result: (0, 115820612169437952203, -67, 67)

[3]libmpf._normalize1 / x: (1, 2453833742572987870789508263078418221071, -136, 131, 63, 'n') / result: (1, 4156956054087296063, -67, 62)

[3]libmpf._normalize1 / x: (0, 12430622203054498438231690534116200390079, -138, 134, 63, 'n') / result: (0, 5264573280428997827, -67, 63)

[3]libmpf._normalize1 / x: (1, 417008906380232530097, -67, 69, 63, 'n') / result: (1, 6515764162191133283, -61, 63)

[3]libmpf._normalize1 / x: (1, 337821057607412682867, -67, 69, 63, 'n') / result: (1, 2639227012557911585, -60, 62)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[3]libmpf._normalize1 / x: (0, 70317259512555756215873073130579206989, -122, 126, 73, 'd') / result: (0, 7806784053938171232353, -69, 73)

[3]libmpf._normalize1 / x: (1, 504501948290660945683, -71, 69, 63, 'n') / result: (1, 1970710735510394319, -63, 61)

[3]libmpf._normalize1 / x: (0, 408699620389283520751, -71, 69, 63, 'n') / result: (0, 1596482892145638753, -63, 61)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (1, 5715814574370032087, -64, 63, 63, 'n') / result: (1, 5715814574370032087, -64, 63)

[2]libmpf._normalize1 / x: (1, 7238788260589872013, -64, 63, 63, 'n') / result: (1, 7238788260589872013, -64, 63)

[3]libmpf._normalize1 / x: (1, 9657236045390820725, -64, 64, 63, 'n') / result: (1, 2414309011347705181, -62, 62)

[2]libmpf._normalize1 / x: (1, 4045822476298594507, -64, 62, 63, 'n') / result: (1, 4045822476298594507, -64, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize. / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 19170576113851467741917379288634130661, -129, 124, 63, 'n') / result: (1, 8313912108174592127, -68, 63)

[3]libmpf._normalize1 / x: (1, 24278558990340817263898017432609501639, -129, 125, 63, 'n') / result: (1, 1316143320107249457, -65, 61)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 80, 0, 7, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 6580716600536247285, -61, 63, 63, 'n') / result: (1, 6580716600536247285, -61, 63)

[3]libmpf._normalize1 / x: (0, 41569560540872960635, -64, 66, 63, 'n') / result: (0, 5196195067609120079, -61, 63)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (1, 40464264983901362106001298644037038425, -126, 125, 63, 'n') / result: (1, 2193572200178749095, -62, 61)

[3]libmpf._normalize1 / x: (0, 31950960189752446233371875702594459195, -126, 125, 63, 'n') / result: (0, 3464130045072746719, -63, 62)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (0, 2193572200178749095, -63, 61, 63, 'n') / result: (0, 2193572200178749095, -63, 61)

[2]libmpf._normalize1 / x: (1, 3464130045072746719, -64, 62, 63, 'n') / result: (1, 3464130045072746719, -64, 62)

[2]libmpf._normalize1 / x: (1, 2635045822516661267, -63, 62, 63, 'n') / result: (1, 2635045822516661267, -63, 62)

[2]libmpf._normalize. / x: (1, 7509952521371341226, -64, 63, 63, 'n') / result: (1, 3754976260685670613, -63, 62)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 25, 8, 5, 63, 'n') / result: (1, 25, 8, 5)

[2]libmpf._normalize1 / x: (0, 5, 4, 3, 63, 'n') / result: (0, 5, 4, 3)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 27884474347420316717040712359807458781, -134, 125, 63, 'n') / result: (1, 6046481533217885183, -72, 63)

[3]libmpf._normalize1 / x: (1, 4414283452789239502831817121196926771, -131, 122, 63, 'n') / result: (1, 3828780567584725693, -71, 62)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 75, 8, 7, 63, 'n') / result: (0, 75, 8, 7)

[2]libmpf._normalize1 / x: (0, 15995, 5, 14, 63, 'n') / result: (0, 15995, 5, 14)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 20279617707214775793296712588601645149, -138, 124, 63, 'n') / result: (1, 8794882230135105721, -77, 63)

[3]libmpf._normalize1 / x: (1, 12841551862659605826114926764577678679, -137, 124, 63, 'n') / result: (1, 5569135371032328281, -76, 63)

[2]libmpf._normalize. / x: (0, 19200, 0, 15, 63, 'n') / result: (0, 75, 8, 7)

[2]libmpf._normalize. / x: (0, 511840, 0, 19, 63, 'n') / result: (0, 15995, 5, 14)

[3]libmpf._normalize1 / x: (0, 86439855590621559138295, -71, 77, 63, 'n') / result: (0, 5275870092201022897, -57, 63)

[3]libmpf._normalize1 / x: (1, 147357103716249809944595, -72, 77, 63, 'n') / result: (1, 4496981924934381407, -57, 62)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (1, 6488175023798045652948231612147888577, -122, 123, 63, 'n') / result: (1, 5627594765014424423, -62, 63)

[3]libmpf._normalize1 / x: (0, 5530311644890818128064109987157521487, -122, 123, 63, 'n') / result: (0, 2398390359965003417, -61, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[3]libmpf._normalize1 / x: (0, 480221419947897550763, -73, 69, 63, 'n') / result: (0, 7503459686685899231, -67, 63)

[3]libmpf._normalize1 / x: (1, 409325288100693916501, -73, 69, 63, 'n') / result: (1, 6395707626573342445, -67, 63)

[3]libmpf._normalize1 / x: (1, 34657273473580681041, -67, 65, 63, 'n') / result: (1, 2166079592098792565, -63, 61)

[3]libmpf._normalize1 / x: (1, 66475327797544072253, -67, 66, 63, 'n') / result: (1, 1038676996836626129, -61, 60)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 159725, 8, 18, 63, 'n') / result: (0, 159725, 8, 18)

[2]libmpf._normalize1 / x: (1, 95985, 5, 17, 63, 'n') / result: (1, 95985, 5, 17)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 29497625755948764791164478347406172363, -143, 125, 63, 'n') / result: (1, 6396277985552804161, -81, 63)

[3]libmpf._normalize1 / x: (1, 18678620891141244838900062603371312043, -142, 124, 63, 'n') / result: (1, 8100560539683386591, -81, 63)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 799375, 9, 20, 63, 'n') / result: (1, 799375, 9, 20)

[2]libmpf._normalize1 / x: (1, 25460015, 7, 25, 63, 'n') / result: (1, 25460015, 7, 25)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 21452818731599101667216153380280995683, -147, 125, 63, 'n') / result: (1, 4651838534947493935, -85, 63)

[3]libmpf._normalize1 / x: (1, 27168903114387265221742797181243358973, -147, 125, 63, 'n') / result: (1, 2945658378066686033, -84, 62)

[2]libmpf._normalize. / x: (1, 409280000, 0, 29, 63, 'n') / result: (1, 799375, 9, 20)

[2]libmpf._normalize. / x: (1, 3258881920, 0, 32, 63, 'n') / result: (1, 25460015, 7, 25)

[3]libmpf._normalize1 / x: (1, 67559379632706191471889245, -77, 86, 63, 'n') / result: (1, 8053705648506425795, -54, 63)

[3]libmpf._normalize1 / x: (0, 137273364205077676978544025, -78, 87, 63, 'n') / result: (0, 8182130110566477595, -54, 63)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (1, 28298027989140390703238704577542805385, -121, 125, 63, 'n') / result: (1, 6136156684576324415, -59, 63)

[3]libmpf._normalize1 / x: (0, 28749268595697647407291945668632080785, -121, 125, 63, 'n') / result: (0, 3117001946882467655, -58, 62)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (0, 558526617333880551197, -75, 69, 63, 'n') / result: (0, 2181744598960470903, -67, 61)

[3]libmpf._normalize1 / x: (1, 567432887752470556217, -75, 69, 63, 'n') / result: (1, 8866138871132352441, -69, 63)

[3]libmpf._normalize1 / x: (1, 32475528874620210137, -67, 65, 63, 'n') / result: (1, 4059441109327526267, -64, 62)

[3]libmpf._normalize1 / x: (1, 274767450061308641465, -69, 68, 63, 'n') / result: (1, 4293241407207947523, -63, 62)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 505203425, 9, 29, 63, 'n') / result: (1, 505203425, 9, 29)

[2]libmpf._normalize1 / x: (0, 383100075, 7, 29, 63, 'n') / result: (0, 383100075, 7, 29)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 15602049986617528484333396967127853805, -151, 124, 63, 'n') / result: (1, 3383155298143631953, -89, 62)

[3]libmpf._normalize1 / x: (1, 9879601132504460080328839568820567699, -150, 123, 63, 'n') / result: (1, 2142297002230317115, -88, 61)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 5346611025, 10, 33, 63, 'n') / result: (0, 5346611025, 10, 33)

[2]libmpf._normalize1 / x: (0, 79683247775, 8, 37, 63, 'n') / result: (0, 79683247775, 8, 37)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11346945444812747989520821467351309459, -155, 124, 63, 'n') / result: (1, 1230238290234047983, -92, 61)

[3]libmpf._normalize1 / x: (1, 7185164460003243695089515456228339345, -154, 123, 63, 'n') / result: (1, 6232136733760922517, -94, 63)

[2]libmpf._normalize. / x: (0, 5474929689600, 0, 43, 63, 'n') / result: (0, 5346611025, 10, 33)

[2]libmpf._normalize. / x: (0, 20398911430400, 0, 45, 63, 'n') / result: (0, 79683247775, 8, 37)

[3]libmpf._normalize1 / x: (0, 391355205828870624114098648475, -86, 99, 63, 'n') / result: (0, 5694967779401786161, -50, 63)

[2]libmpf._normalize. / x: (1, 131350193473045646214190937750, -84, 97, 63, 'n') / result: (1, 3822793761298690405, -49, 62)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (1, 7003574208976449595752511657161480001, -115, 123, 63, 'n') / result: (1, 6074632298028571905, -55, 63)

[3]libmpf._normalize1 / x: (0, 4701206544083364233215808655950183605, -114, 122, 63, 'n') / result: (0, 8155293357437206197, -55, 63)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (0, 631916035370794425977, -77, 70, 63, 'n') / result: (0, 4936844026334331453, -70, 63)

[3]libmpf._normalize1 / x: (1, 848357627734928167185, -77, 70, 63, 'n') / result: (1, 3313896983339563153, -69, 62)

[3]libmpf._normalize1 / x: (1, 254867386970627349635, -70, 68, 63, 'n') / result: (1, 1991151460708026169, -63, 61)

[3]libmpf._normalize1 / x: (1, 278081347044648204625, -69, 68, 63, 'n') / result: (1, 8690042095145256395, -64, 63)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 1556238678325, 10, 41, 63, 'n') / result: (0, 1556238678325, 10, 41)

[2]libmpf._normalize1 / x: (1, 2268698262425, 8, 42, 63, 'n') / result: (1, 2268698262425, 8, 42)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 4126161979931908360130658121577493549, -158, 122, 63, 'n') / result: (1, 7157750052270824629, -99, 63)

[3]libmpf._normalize1 / x: (1, 20902296610918527115122015352267017951, -160, 124, 63, 'n') / result: (1, 1133115769774713185, -96, 60)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 14455968668775, 12, 44, 63, 'n') / result: (1, 14455968668775, 12, 44)

[2]libmpf._normalize1 / x: (1, 59980848870575, 11, 46, 63, 'n') / result: (1, 59980848870575, 11, 46)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 24006760610512921370167254005144538687, -165, 125, 63, 'n') / result: (1, 5205636401651508821, -103, 63)

[3]libmpf._normalize1 / x: (1, 3800417565621550384872544015680111555, -162, 122, 63, 'n') / result: (1, 3296336784799165629, -102, 62)

[2]libmpf._normalize. / x: (1, 59211647667302400, 0, 56, 63, 'n') / result: (1, 14455968668775, 12, 44)

[2]libmpf._normalize. / x: (1, 122840778486937600, 0, 57, 63, 'n') / result: (1, 59980848870575, 11, 46)

[2]libmpf._normalize. / x: (1, 122464561792247017363825469702400, -91, 107, 63, 'n') / result: (1, 870163047695250337, -44, 60)

[3]libmpf._normalize1 / x: (0, 502845455413772041985165961979975, -92, 109, 63, 'n') / result: (0, 3572931855542350675, -45, 62)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (1, 4864143952494970018611131538481975685, -110, 122, 63, 'n') / result: (1, 527371544057727477, -47, 59)

[3]libmpf._normalize1 / x: (0, 19972411979392099723723702630501853375, -111, 124, 63, 'n') / result: (0, 4330826491566485667, -49, 62)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (0, 624185277383422246967, -79, 70, 63, 'n') / result: (0, 2381077870877923, -61, 52)

[3]libmpf._normalize1 / x: (1, 640733787544383671923, -78, 70, 63, 'n') / result: (1, 5005732715190497437, -71, 63)

[2]libmpf._normalize1 / x: (1, 1981627149224514477, -63, 61, 63, 'n') / result: (1, 1981627149224514477, -63, 61)

[3]libmpf._normalize1 / x: (1, 1117331120893783315997, -71, 70, 63, 'n') / result: (1, 2182287345495670539, -62, 61)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 2269130236804025, 12, 52, 63, 'n') / result: (1, 2269130236804025, 12, 52)

[2]libmpf._normalize1 / x: (0, 2852782626839175, 11, 52, 63, 'n') / result: (0, 2852782626839175, 11, 52)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 17459462262191215541634916233928101663, -169, 124, 63, 'n') / result: (1, 7571834766038558285, -108, 63)

[3]libmpf._normalize1 / x: (1, 11055760190899055664778859548528761687, -168, 124, 63, 'n') / result: (1, 4794671686980604551, -107, 63)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 68401303720803625, 13, 56, 63, 'n') / result: (0, 68401303720803625, 13, 56)

[2]libmpf._normalize1 / x: (0, 167266505810126125, 12, 58, 63, 'n') / result: (0, 167266505810126125, 12, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 25395581472278131696618609661354766855, -174, 125, 63, 'n') / result: (1, 5506788920755315117, -112, 63)

[3]libmpf._normalize1 / x: (1, 16081105732216808238763626579328964853, -173, 124, 63, 'n') / result: (1, 3487033954167712401, -111, 62)

[2]libmpf._normalize. / x: (0, 560343480080823296000, 0, 69, 63, 'n') / result: (0, 68401303720803625, 13, 56)

[2]libmpf._normalize. / x: (0, 685123607798276608000, 0, 70, 63, 'n') / result: (0, 167266505810126125, 12, 58)

[2]libmpf._normalize. / x: (0, 206592443659960027825078627185677000, -99, 118, 63, 'n') / result: (0, 5734092191621576679, -44, 63)

[3]libmpf._normalize1 / x: (1, 1875172015343779183038009432282146125, -100, 121, 63, 'n') / result: (1, 406613114563949409, -38, 59)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (1, 6693292475031554776667908226129638149, -106, 123, 63, 'n') / result: (1, 2902752897004036253, -45, 62)

[3]libmpf._normalize1 / x: (0, 474631451502766086271085971301149779, -100, 119, 63, 'n') / result: (0, 6586834570870365811, -44, 63)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (0, 416440488248944206839, -81, 69, 63, 'n') / result: (0, 406680164305609577, -71, 59)

[3]libmpf._normalize1 / x: (1, 472486756888501673711, -79, 69, 63, 'n') / result: (1, 1845651394095709663, -71, 61)

[3]libmpf._normalize1 / x: (1, 506889870037170096535, -71, 69, 63, 'n') / result: (1, 3960077109665391379, -64, 62)

[3]libmpf._normalize1 / x: (1, 1119176772287879025631, -71, 70, 63, 'n') / result: (1, 1092946066687381861, -61, 60)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 5938245891476205125, 13, 63, 63, 'n') / result: (0, 5938245891476205125, 13, 63)

[3]libmpf._normalize1 / x: (1, 12784140159239967375, 12, 64, 63, 'n') / result: (1, 799008759952497961, 16, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 18469513798020459417856959233315315751, -178, 124, 63, 'n') / result: (1, 4004937396912956449, -116, 62)

[3]libmpf._normalize1 / x: (1, 11695349623430405992742806639861208403, -177, 124, 63, 'n') / result: (1, 5072049387880308947, -116, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 145656139266828289135, 15, 67, 63, 'n') / result: (1, 9103508704176768071, 19, 63)

[3]libmpf._normalize1 / x: (1, 24897176897666037859, 17, 65, 63, 'n') / result: (1, 6224294224416509465, 19, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 13432373671287606850265230388214918147, -182, 124, 63, 'n') / result: (1, 364085217901177859, -117, 59)

[3]libmpf._normalize1 / x: (1, 17011417634080590535203532700520593241, -182, 124, 63, 'n') / result: (1, 7377526382371358469, -121, 63)

[2]libmpf._normalize. / x: (1, 4772860371495429378408448, 0, 82, 63, 'n') / result: (1, 9103508704176768071, 19, 63)

[2]libmpf._normalize. / x: (1, 3263322770330882914385920, 0, 82, 63, 'n') / result: (1, 6224294224416509465, 19, 63)

[3]libmpf._normalize1 / x: (0, 7111352351333014778330386832967030739, -102, 123, 63, 'n') / result: (0, 6168114934900123853, -42, 63)

[3]libmpf._normalize1 / x: (0, 103420151940855048128494038480965610259, -102, 127, 63, 'n') / result: (0, 5606417670652800053, -38, 63)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (0, 33186310972887402300563560671319794415, -104, 125, 63, 'n') / result: (0, 3598067045358405581, -41, 62)

[3]libmpf._normalize1 / x: (0, 30164210982749389041743864283997485415, -100, 125, 63, 'n') / result: (0, 3270410307880800031, -37, 62)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (1, 726073704714084296379, -85, 70, 63, 'n') / result: (1, 5672450818078783565, -78, 63)

[3]libmpf._normalize1 / x: (1, 659954052618719420471, -81, 70, 63, 'n') / result: (1, 80560797438808523, -68, 57)

[3]libmpf._normalize1 / x: (1, 64887575815575851137101, -78, 76, 63, 'n') / result: (1, 1980211664293696629, -63, 61)

[3]libmpf._normalize1 / x: (1, 139977657333423686731, -68, 67, 63, 'n') / result: (1, 8748603583338980421, -64, 63)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 379597924799022772277, 19, 69, 63, 'n') / result: (1, 5931217574984730817, 25, 63)

[3]libmpf._normalize1 / x: (0, 809196521251556068725, 19, 70, 63, 'n') / result: (0, 6321847822277781787, 26, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1221124879207964259115020944383174377, -183, 120, 63, 'n') / result: (1, 4236627990122796905, -125, 62)

[3]libmpf._normalize1 / x: (1, 24743880195026313507884927043996348207, -187, 125, 63, 'n') / result: (1, 2682736866316857625, -124, 62)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 547266348807115658679, 26, 69, 63, 'n') / result: (0, 8551036700111182167, 32, 63)

[3]libmpf._normalize1 / x: (0, 74371416743750143831, 27, 67, 63, 'n') / result: (0, 4648213546484383989, 31, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 14209453139874493197889503753171626715, -191, 124, 63, 'n') / result: (1, 6162367985633159135, -130, 63)

[3]libmpf._normalize1 / x: (1, 8997774616373204911653250428003472875, -190, 123, 63, 'n') / result: (1, 243885169665168875, -125, 58)

[2]libmpf._normalize. / x: (0, 36726422973873286971163410432, 0, 95, 63, 'n') / result: (0, 8551036700111182167, 32, 63)

[2]libmpf._normalize. / x: (0, 9981962583487302503730511872, 0, 94, 63, 'n') / result: (0, 4648213546484383989, 31, 63)

[3]libmpf._normalize1 / x: (1, 34556549213950876798932381295186867545, -98, 125, 63, 'n') / result: (1, 7493257146273558239, -36, 63)

[3]libmpf._normalize1 / x: (1, 162114148680102628447703439978864025515, -99, 127, 63, 'n') / result: (1, 8788225609480267047, -35, 63)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (0, 61270116915127608518414127551307402855, -96, 126, 63, 'n') / result: (0, 6642919386782220625, -33, 63)

[3]libmpf._normalize1 / x: (0, 71858685756854314588622449699484450415, -95, 126, 63, 'n') / result: (0, 973866790119182779, -29, 60)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (1, 714939294308050086129, -84, 70, 63, 'n') / result: (1, 2792731618390820649, -76, 62)

[3]libmpf._normalize1 / x: (1, 838493553979573873417, -83, 70, 63, 'n') / result: (1, 3275365445232710443, -75, 62)

[3]libmpf._normalize1 / x: (1, 16224686685512353605417, -76, 74, 63, 'n') / result: (1, 7922210295660328909, -65, 63)

[3]libmpf._normalize1 / x: (1, 17920415504123464612651, -75, 74, 63, 'n') / result: (1, 8750202882872785455, -64, 63)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 57662991357707627055, 32, 66, 63, 'n') / result: (0, 3603936959856726691, 36, 62)

[3]libmpf._normalize1 / x: (1, 1437889075215054906555, 31, 71, 63, 'n') / result: (1, 5616754200058808229, 39, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 20668295476181081016636529762771089405, -196, 124, 63, 'n') / result: (1, 560215271421196285, -131, 59)

[3]libmpf._normalize1 / x: (1, 817979510579382264695750038909406625, -191, 120, 63, 'n') / result: (1, 2837936519740146909, -133, 62)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 228274104962209055851, 40, 68, 63, 'n') / result: (1, 7133565780069032995, 45, 63)

[3]libmpf._normalize1 / x: (0, 26914348801186832377, 40, 65, 63, 'n') / result: (0, 3364293600148354047, 43, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1878935952380098274239684523888280855, -197, 121, 63, 'n') / result: (1, 6518868612901193135, -139, 63)

[3]libmpf._normalize1 / x: (1, 9518307032196448170700186501132441527, -199, 123, 63, 'n') / result: (1, 8255815330153154645, -139, 63)

[2]libmpf._normalize. / x: (1, 250990032726107957951446479011840, 0, 108, 63, 'n') / result: (1, 7133565780069032995, 45, 63)

[2]libmpf._normalize. / x: (0, 29592639460923968266433017675776, 0, 105, 63, 'n') / result: (0, 3364293600148354047, 43, 62)

[3]libmpf._normalize1 / x: (0, 213786098926273068380964574826132555615, -96, 128, 63, 'n') / result: (0, 5794683822576655689, -31, 63)

[3]libmpf._normalize1 / x: (0, 213642218948408017135080132282664179755, -96, 128, 63, 'n') / result: (0, 2895391973981097159, -30, 62)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (0, 11476634459193418961069265619797647361, -86, 124, 63, 'n') / result: (0, 4977196805391802849, -25, 63)

[3]libmpf._normalize1 / x: (0, 5734455290209051980728918555788757391, -85, 123, 63, 'n') / result: (0, 4973847106932518369, -25, 63)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (1, 448139822302376669761, -84, 69, 63, 'n') / result: (1, 7002184723474635465, -78, 63)

[3]libmpf._normalize1 / x: (1, 447838220149396881535, -84, 69, 63, 'n') / result: (1, 3498736094917163137, -77, 62)

[3]libmpf._normalize1 / x: (1, 64905748926772889057993, -78, 76, 63, 'n') / result: (1, 990383131817213273, -62, 60)

[3]libmpf._normalize1 / x: (1, 71685160752588775610497, -77, 76, 63, 'n') / result: (1, 8750629974681247023, -64, 63)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 188556490264140641855, 45, 68, 63, 'n') / result: (0, 2946195160377197529, 51, 62)

[3]libmpf._normalize1 / x: (0, 2225548058419568539601, 43, 71, 63, 'n') / result: (0, 1086693387900179951, 54, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 21863981991332052647222671490675991405, -205, 125, 63, 'n') / result: (1, 4740995354837231371, -143, 63)

[3]libmpf._normalize1 / x: (1, 27689620457298758316898512937442587935, -205, 125, 63, 'n') / result: (1, 3002114665510238053, -142, 62)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 321226127684662806559, 52, 69, 63, 'n') / result: (0, 156848695158526761, 63, 58)

[2]libmpf._normalize. / x: (1, 24511216292987607204, 55, 65, 63, 'n') / result: (1, 6127804073246901801, 57, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 15901077811877856471012302308486829313, -209, 124, 63, 'n') / result: (1, 6895993243399609267, -148, 63)

[3]libmpf._normalize1 / x: (1, 10068952893563184843423264741237447759, -208, 123, 63, 'n') / result: (1, 4366712240742164441, -147, 62)

[2]libmpf._normalize. / x: (0, 1446673868942314784502930796223397888, 0, 121, 63, 'n') / result: (0, 156848695158526761, 63, 58)

[2]libmpf._normalize. / x: (1, 883109636507972944889949195413225472, 0, 120, 63, 'n') / result: (1, 6127804073246901801, 57, 63)

[3]libmpf._normalize1 / x: (1, 61370438401092798514455754194540072225, -90, 126, 63, 'n') / result: (1, 831724533010657991, -24, 60)

[3]libmpf._normalize1 / x: (1, 45411583501939170004730404293302927061, -91, 126, 63, 'n') / result: (1, 1230883437220233487, -26, 61)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (0, 1981969404676627352865365231925206443, -76, 121, 63, 'n') / result: (0, 859542213740080507, -15, 60)

[3]libmpf._normalize1 / x: (0, 2933150600311131486225643974930711251, -78, 122, 63, 'n') / result: (0, 636025650616898051, -16, 60)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (1, 834204034345764989219, -86, 70, 63, 'n') / result: (1, 3258609509163144489, -78, 62)

[3]libmpf._normalize1 / x: (1, 617276446939519978095, -87, 70, 63, 'n') / result: (1, 4822472241714999829, -80, 63)

[3]libmpf._normalize1 / x: (1, 64909007536282052203817, -78, 76, 63, 'n') / result: (1, 7923462834018805201, -65, 63)

[3]libmpf._normalize1 / x: (1, 573486108492951919899157, -80, 79, 63, 'n') / result: (1, 4375351779883971557, -63, 62)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 42559521198282542841, 61, 66, 63, 'n') / result: (1, 5319940149785317855, 64, 63)

[3]libmpf._normalize1 / x: (1, 686637041819965882101, 57, 70, 63, 'n') / result: (1, 2682175944609241727, 65, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 23128840453640518503595526400339678201, -214, 125, 63, 'n') / result: (1, 1253816953345383503, -150, 61)

[3]libmpf._normalize1 / x: (1, 14645749663364632500439463296694612523, -213, 124, 63, 'n') / result: (1, 3175790720539755957, -151, 62)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 80687337035443079805, 66, 67, 63, 'n') / result: (1, 630369820589399061, 73, 60)

[3]libmpf._normalize1 / x: (0, 66610281220899387185, 67, 66, 63, 'n') / result: (0, 4163142576306211699, 71, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 4205243718843730636712463575702924109, -216, 122, 63, 'n') / result: (1, 3647467500641115645, -156, 62)

[3]libmpf._normalize1 / x: (1, 10651454300628823636378341173237246271, -217, 124, 63, 'n') / result: (1, 2309665978574367969, -155, 62)

[2]libmpf._normalize. / x: (1, 5953674625127859415045301058151133478912, 0, 133, 63, 'n') / result: (1, 630369820589399061, 73, 60)

[2]libmpf._normalize. / x: (0, 9829942482878019255586302188654535114752, 0, 133, 63, 'n') / result: (0, 4163142576306211699, 71, 62)

[3]libmpf._normalize1 / x: (0, 14213975640418509564743751675949488021, -84, 124, 63, 'n') / result: (0, 6164329307599114903, -23, 63)

[3]libmpf._normalize1 / x: (1, 3537377419329327840436407694134313983, -85, 122, 63, 'n') / result: (1, 383523228293802445, -22, 59)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (0, 5371990244291418043045963225906371371, -70, 123, 63, 'n') / result: (0, 4659458794745352901, -10, 63)

[3]libmpf._normalize1 / x: (1, 334226634893374448158961121264037865, -69, 119, 63, 'n') / result: (1, 2319163159385062901, -12, 62)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (1, 313219328021235895405, -86, 69, 63, 'n') / result: (1, 2447026000165905433, -79, 62)

[3]libmpf._normalize1 / x: (0, 311798755329006027031, -89, 69, 63, 'n') / result: (0, 1217963888003929793, -81, 61)

[3]libmpf._normalize1 / x: (1, 129820462098564270318617, -79, 77, 63, 'n') / result: (1, 1980903047158268285, -63, 61)

[3]libmpf._normalize1 / x: (1, 1146970999022015835908415, -81, 80, 63, 'n') / result: (1, 8750694267440916717, -64, 63)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 96500617758501614261, 73, 67, 63, 'n') / result: (0, 6031288609906350891, 77, 63)

[3]libmpf._normalize1 / x: (0, 114292348486177253841, 71, 67, 63, 'n') / result: (0, 7143271780386078365, 75, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12233436272999943670131352814049670935, -222, 124, 63, 'n') / result: (1, 5305407273659804575, -161, 63)

[3]libmpf._normalize1 / x: (1, 7746512218639144463735326344521776707, -221, 123, 63, 'n') / result: (1, 3359514150653626137, -160, 62)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 5088543094890923849, 78, 63, 63, 'n') / result: (0, 5088543094890923849, 78, 63)

[3]libmpf._normalize1 / x: (1, 1043582167169263004575, 76, 70, 63, 'n') / result: (1, 8152985681009867223, 83, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 17794089124363554430806492033139153725, -227, 124, 63, 'n') / result: (1, 482309752150891325, -162, 59)

[3]libmpf._normalize1 / x: (1, 11267654136202391948166098356017272811, -226, 124, 63, 'n') / result: (1, 2443283018657182645, -164, 62)

[2]libmpf._normalize. / x: (0, 1537917782908842968172144121246365941497856, 0, 141, 63, 'n') / result: (0, 5088543094890923849, 78, 63)

[2]libmpf._normalize. / x: (1, 78850839173769514721255165043159902384553984, 0, 146, 63, 'n') / result: (1, 8152985681009867223, 83, 63)

[3]libmpf._normalize1 / x: (1, 161814665685038565925641046291729268605, -84, 127, 63, 'n') / result: (1, 4385995301893360469, -19, 62)

[3]libmpf._normalize1 / x: (0, 490897105463045018682043307513545780195, -86, 129, 63, 'n') / result: (0, 3326448176311744977, -19, 62)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (0, 26721867966643555563791294065387655423, -65, 125, 63, 'n') / result: (0, 5794381460461150375, -3, 63)

[3]libmpf._normalize1 / x: (1, 20266530820703990280677106935551545459, -65, 124, 63, 'n') / result: (1, 8789206697820679763, -4, 63)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (1, 722571852143497662009, -89, 70, 63, 'n') / result: (1, 1411273148717768871, -80, 61)

[3]libmpf._normalize1 / x: (0, 1096033011608263622671, -90, 70, 63, 'n') / result: (0, 33448273059334217, -75, 55)

[3]libmpf._normalize1 / x: (1, 259642335470277258420391, -80, 78, 63, 'n') / result: (1, 7923655257271644849, -65, 63)

[3]libmpf._normalize1 / x: (1, 17921388411445938102199, -75, 74, 63, 'n') / result: (1, 2187669483819084241, -62, 61)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 20988679834567751339407, 78, 75, 63, 'n') / result: (1, 5124189412736267417, 90, 63)

[3]libmpf._normalize1 / x: (0, 349594625851999273013, 82, 69, 63, 'n') / result: (0, 5462416028937488641, 88, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1617644465851232220982408366649013975, -228, 121, 63, 'n') / result: (1, 1403082915348047491, -168, 61)

[3]libmpf._normalize1 / x: (1, 8194657553601739598361348489108271935, -230, 123, 63, 'n') / result: (1, 3553866208955902029, -169, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 58057216621105047707, 92, 66, 63, 'n') / result: (0, 7257152077638130963, 95, 63)

[3]libmpf._normalize1 / x: (0, 188580328422638230757, 91, 68, 63, 'n') / result: (0, 5893135263207444711, 96, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 4705874809749039188617365563701421673, -234, 122, 63, 'n') / result: (1, 8163391507479549039, -175, 63)

[3]libmpf._normalize1 / x: (1, 11919501896147984870038874759798650887, -235, 124, 63, 'n') / result: (1, 5169259940299493861, -174, 63)

[2]libmpf._normalize. / x: (0, 287485412098922461667982331978406275741367926784, 0, 158, 63, 'n') / result: (0, 7257152077638130963, 95, 63)

[2]libmpf._normalize. / x: (0, 466902278351941371651683013755101458611249872896, 0, 159, 63, 'n') / result: (0, 5893135263207444711, 96, 63)

[3]libmpf._normalize1 / x: (0, 62609618516379547523425554467702882127, -80, 126, 63, 'n') / result: (0, 424259277587171065, -13, 59)

[2]libmpf._normalize. / x: (1, 85622075875691943784223149468738200872, -79, 127, 63, 'n') / result: (1, 4641582033857195247, -15, 63)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (0, 2659889638231701935679026119808369235, -55, 122, 63, 'n') / result: (0, 2307086499473994953, 5, 62)

[3]libmpf._normalize1 / x: (1, 29100355865105326632381364994210281893, -57, 125, 63, 'n') / result: (1, 6310133809809697189, 5, 63)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (1, 453236038284005871005, -91, 69, 63, 'n') / result: (1, 3540906549093795867, -84, 62)

[3]libmpf._normalize1 / x: (0, 619825058499577270897, -90, 70, 63, 'n') / result: (0, 4842383269527947429, -83, 63)

[3]libmpf._normalize1 / x: (1, 4154280908430985228388379, -84, 82, 63, 'n') / result: (1, 1980915502753727545, -63, 61)

[3]libmpf._normalize1 / x: (1, 4587870590946890626234203, -83, 82, 63, 'n') / result: (1, 2187667174790807069, -62, 61)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 761472840172237879685, 95, 70, 63, 'n') / result: (0, 5949006563845608435, 102, 63)

[3]libmpf._normalize1 / x: (1, 437614464685711356295, 96, 69, 63, 'n') / result: (1, 3418863005357119971, 103, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 27379635256721682553480105765147903917, -241, 125, 63, 'n') / result: (1, 5937012005439672029, -179, 63)

[3]libmpf._normalize1 / x: (1, 17337457303487977994918151857491704783, -240, 124, 63, 'n') / result: (1, 7518923549526536525, -179, 63)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 350846125758562507335, 103, 69, 63, 'n') / result: (1, 5481970714977539177, 109, 63)

[3]libmpf._normalize1 / x: (1, 74534912207269609077, 104, 67, 63, 'n') / result: (1, 4658432012954350567, 108, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19912462004888496404665320036073960887, -245, 124, 63, 'n') / result: (1, 4317826913047034203, -183, 62)

[3]libmpf._normalize1 / x: (1, 25218119714164331628666952386538189575, -245, 125, 63, 'n') / result: (1, 5468308036019299291, -183, 63)

[2]libmpf._normalize. / x: (1, 3558002415244724950809259069812453979166984711962624, 0, 172, 63, 'n') / result: (1, 5481970714977539177, 109, 63)

[2]libmpf._normalize. / x: (1, 1511747619160059243288971259676420671793485580337152, 0, 171, 63, 'n') / result: (1, 4658432012954350567, 108, 63)

[3]libmpf._normalize1 / x: (0, 21866660167643586203112580444874393865, -75, 125, 63, 'n') / result: (0, 2370788045876142075, -12, 62)

[3]libmpf._normalize1 / x: (0, 80068512146002447533939915143383090115, -75, 126, 63, 'n') / result: (0, 1085130685204723155, -9, 60)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (1, 17789636312059902501745900843003844775, -50, 124, 63, 'n') / result: (1, 3857512467452472679, 12, 62)

[3]libmpf._normalize1 / x: (1, 8142474091864429866559567818674899935, -47, 123, 63, 'n') / result: (1, 7062470479845079733, 13, 63)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (0, 513234758224064321379, -93, 69, 63, 'n') / result: (0, 4009646548625502511, -86, 62)

[3]libmpf._normalize1 / x: (0, 469824188485599495943, -91, 69, 63, 'n') / result: (0, 1835250736271873031, -83, 61)

[3]libmpf._normalize1 / x: (1, 16617119624077392288304849, -86, 84, 63, 'n') / result: (1, 3961830049533222267, -64, 62)

[3]libmpf._normalize1 / x: (1, 4587868755696154354494457, -83, 82, 63, 'n') / result: (1, 2187666299675061395, -62, 61)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 38324071213780464901, 109, 66, 63, 'n') / result: (1, 4790508901722558113, 112, 63)

[3]libmpf._normalize1 / x: (0, 1002892978746173733629, 108, 70, 63, 'n') / result: (0, 3917550698227241147, 116, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 14481790549009815567334228523321716209, -249, 124, 63, 'n') / result: (1, 6280475509886595205, -188, 63)

[3]libmpf._normalize1 / x: (1, 18340450701210423002971779323659337073, -249, 124, 63, 'n') / result: (1, 3976951298923126757, -187, 62)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 1287149785744775073831, 114, 71, 63, 'n') / result: (0, 314245553160345477, 126, 59)

[3]libmpf._normalize1 / x: (1, 85738875041749961551, 116, 67, 63, 'n') / result: (1, 5358679690109372597, 120, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 21064422616741549918256848240797981615, -254, 124, 63, 'n') / result: (1, 4567618552644796513, -192, 62)

[3]libmpf._normalize1 / x: (1, 13338509600880307638220025556484318671, -253, 124, 63, 'n') / result: (1, 5784656434797275283, -192, 63)

[2]libmpf._normalize. / x: (0, 26733055155945488292161336992558946208786568496837296128, 0, 185, 63, 'n') / result: (0, 314245553160345477, 126, 59)

[2]libmpf._normalize. / x: (1, 7122907064537415414392353520048899494982658274331983872, 0, 183, 63, 'n') / result: (1, 5358679690109372597, 120, 63)

[3]libmpf._normalize1 / x: (1, 122860765348293173999571958072700608815, -72, 127, 63, 'n') / result: (1, 832536929399070263, -5, 60)

[3]libmpf._normalize1 / x: (1, 91862959146282550247564256580225125163, -72, 127, 63, 'n') / result: (1, 4979900993867334035, -8, 63)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (1, 4302168182698542214554518644839364813, -38, 122, 63, 'n') / result: (1, 3731536072063819215, 22, 62)

[3]libmpf._normalize1 / x: (1, 25733839367665194150933702946744358785, -41, 125, 63, 'n') / result: (1, 5580136909763120637, 21, 63)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (0, 584355412060921947115, -93, 69, 63, 'n') / result: (0, 570659582090744089, -83, 59)

[3]libmpf._normalize1 / x: (0, 436922374631840340685, -93, 69, 63, 'n') / result: (0, 6826912103622505323, -87, 63)

[3]libmpf._normalize1 / x: (1, 2077139382350091945176807, -83, 81, 63, 'n') / result: (1, 3961828961086448565, -64, 62)

[3]libmpf._normalize1 / x: (1, 73405893264226366051847317, -87, 86, 63, 'n') / result: (1, 4375332192434451941, -63, 62)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 63245882617146938317, 124, 66, 63, 'n') / result: (1, 3952867663571683645, 128, 62)

[3]libmpf._normalize1 / x: (1, 1453535521167797036927, 120, 71, 63, 'n') / result: (1, 5677873129561707175, 128, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 15319580084902945396010604211838675139, -258, 124, 63, 'n') / result: (1, 3321904401923488373, -196, 62)

[3]libmpf._normalize1 / x: (1, 19401468510371356564988578397426935449, -258, 124, 63, 'n') / result: (1, 8414045723341491321, -197, 63)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 167821910228893032325, 129, 68, 63, 'n') / result: (1, 1311108673663226815, 136, 61)

[3]libmpf._normalize1 / x: (0, 243282803486292953425, 129, 68, 63, 'n') / result: (0, 7602587608946654795, 134, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11141512789020323924066443656978382719, -262, 124, 63, 'n') / result: (1, 1207965237063086681, -199, 61)

[3]libmpf._normalize1 / x: (1, 28220317833267427731807192251152049163, -263, 125, 63, 'n') / result: (1, 764913247576499211, -198, 60)

[2]libmpf._normalize. / x: (1, 1311108673663226815, 136, 61, 63, 'n') / result: (1, 1311108673663226815, 136, 61)

[2]libmpf._normalize. / x: (0, 7602587608946654795, 134, 63, 63, 'n') / result: (0, 7602587608946654795, 134, 63)

[3]libmpf._normalize1 / x: (0, 8982867377538375591983602888423968775, -64, 123, 63, 'n') / result: (0, 3895697730350509109, -3, 62)

[3]libmpf._normalize1 / x: (1, 1160586395354488611369731423576941675, -65, 120, 63, 'n') / result: (1, 4026592931841462731, -7, 62)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (1, 31615574791278019894706279720187383887, -32, 125, 63, 'n') / result: (1, 3427767487308157757, 31, 62)

[3]libmpf._normalize1 / x: (0, 32677856138292155698291885589385677233, -36, 125, 63, 'n') / result: (0, 3542940261730513163, 27, 62)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (0, 554101168561337109105, -94, 69, 63, 'n') / result: (0, 4328915379385446165, -87, 62)

[3]libmpf._normalize1 / x: (1, 572718933368947935065, -98, 69, 63, 'n') / result: (1, 8948733333889811485, -92, 63)

[3]libmpf._normalize1 / x: (1, 33234225788686091738501355, -87, 85, 63, 'n') / result: (1, 3961828445039521663, -64, 62)

[3]libmpf._normalize1 / x: (1, 2348988593403977047674651677, -92, 91, 63, 'n') / result: (1, 4375332209102766677, -63, 62)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 192696121062493127165, 136, 68, 63, 'n') / result: (0, 376359611450181889, 145, 59)

[3]libmpf._normalize1 / x: (0, 183874559694886282155, 134, 68, 63, 'n') / result: (0, 5746079990465196317, 139, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 4051459196007390517537438287269667243, -265, 122, 63, 'n') / result: (1, 3514080689638070345, -205, 62)

[3]libmpf._normalize1 / x: (1, 2565483439387947975618835659195640833, -264, 121, 63, 'n') / result: (1, 8900808699071990819, -206, 63)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 19443630313297300207, 143, 65, 63, 'n') / result: (1, 1215226894581081263, 147, 61)

[3]libmpf._normalize1 / x: (1, 65963617822494298557, 144, 66, 63, 'n') / result: (1, 1030681528476473415, 150, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11786063115657863324659989599679175035, -271, 124, 63, 'n') / result: (1, 5111390094019011411, -210, 63)

[3]libmpf._normalize1 / x: (1, 29852898203787030989324083440453565257, -272, 125, 63, 'n') / result: (1, 3236657708753451207, -209, 62)

[2]libmpf._normalize. / x: (1, 1215226894581081263, 147, 61, 63, 'n') / result: (1, 1215226894581081263, 147, 61)

[2]libmpf._normalize. / x: (1, 1030681528476473415, 150, 60, 63, 'n') / result: (1, 1030681528476473415, 150, 60)

[3]libmpf._normalize1 / x: (1, 47163914319663454446222242039447298387, -63, 126, 63, 'n') / result: (1, 5113521836829930915, 0, 63)

[3]libmpf._normalize1 / x: (0, 25006134915202453613897604440664988701, -62, 125, 63, 'n') / result: (0, 5422341160105625081, 0, 63)

[3]libmpf._normalize1 / x: (0, 15478498771225430759843386699, -55, 94, 63, 'n') / result: (0, 7207737663400094379, -24, 63)

[8]gammazeta.mpf_bernoulli / n: 34 / prec: 63 / result: (0, 7207737663400094379, -24, 63)

[3]libmpf._normalize1 / x: (1, 36856923935937924925542962183049826785, -24, 125, 63, 'n') / result: (1, 7992071400495377411, 38, 63)

[3]libmpf._normalize1 / x: (0, 39082812603497875173659725344189519699, -24, 125, 63, 'n') / result: (0, 8474734066311249975, 38, 63)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (0, 589541212300740833951, -96, 69, 63, 'n') / result: (0, 4605790721099537765, -89, 62)

[3]libmpf._normalize1 / x: (1, 625145190153060752725, -96, 70, 63, 'n') / result: (1, 4883946798070787131, -89, 63)

[3]libmpf._normalize1 / x: (1, 132936898548953645854122651, -89, 87, 63, 'n') / result: (1, 7923656615552523485, -65, 63)

[3]libmpf._normalize1 / x: (1, 293623579059443929021312059, -89, 88, 63, 'n') / result: (1, 4375332281879245177, -63, 62)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 619533690703767303921, 147, 70, 63, 'n') / result: (1, 2420053479311591031, 155, 62)

[3]libmpf._normalize1 / x: (0, 46164759385534435325, 150, 66, 63, 'n') / result: (0, 11270693209358993, 162, 54)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 17143364531865983017992162460255817433, -276, 124, 63, 'n') / result: (1, 3717374613832008299, -214, 62)

[3]libmpf._normalize1 / x: (1, 10855599346831647632786389748160132021, -275, 124, 63, 'n') / result: (1, 4707865758186838119, -214, 63)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 98846858380215091687, 156, 67, 63, 'n') / result: (0, 3088964324381721615, 161, 62)

[2]libmpf._normalize1 / x: (0, 9034638843612309059, 159, 63, 63, 'n') / result: (0, 9034638843612309059, 159, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12467901477720714922481023013635793697, -280, 124, 63, 'n') / result: (1, 5407090347392012071, -219, 63)

[3]libmpf._normalize1 / x: (1, 15789962686300578374047306869701867157, -280, 124, 63, 'n') / result: (1, 3423902369590427723, -218, 62)

[2]libmpf._normalize. / x: (0, 3088964324381721615, 161, 62, 63, 'n') / result: (0, 3088964324381721615, 161, 62)

[2]libmpf._normalize. / x: (0, 9034638843612309059, 159, 63, 63, 'n') / result: (0, 9034638843612309059, 159, 63)

[3]libmpf._normalize1 / x: (1, 2470897018567483234275860276205586673, -59, 121, 63, 'n') / result: (1, 8572646129660227551, -1, 63)

[3]libmpf._normalize1 / x: (1, 133461606642116016570080573556025312349, -60, 127, 63, 'n') / result: (1, 3617484096619700341, 5, 62)

[3]libmpf._normalize1 / x: (1, 1929743914758391793175373481, -47, 91, 63, 'n') / result: (1, 1797214071041337953, -17, 61)

[8]gammazeta.mpf_bernoulli / n: 36 / prec: 63 / result: (1, 1797214071041337953, -17, 61)

[3]libmpf._normalize1 / x: (0, 15406880250283427046512596513472543103, -18, 124, 63, 'n') / result: (0, 3340834607716260779, 44, 62)

[3]libmpf._normalize1 / x: (0, 6501393320213188376213010842570341973, -12, 123, 63, 'n') / result: (0, 1409764952391577125, 50, 61)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (1, 801122987662540318207, -102, 70, 63, 'n') / result: (1, 1564693335278399059, -93, 61)

[3]libmpf._normalize1 / x: (1, 676115547865397010759, -97, 70, 63, 'n') / result: (1, 5282152717698414147, -90, 63)

[3]libmpf._normalize1 / x: (1, 2126990378347951668925083219, -93, 91, 63, 'n') / result: (1, 7923656621381460387, -65, 63)

[3]libmpf._normalize1 / x: (1, 587247163401040575710312003, -90, 89, 63, 'n') / result: (1, 8750664642468699451, -64, 63)

[1]ctx_mp_python.convert / x: -35 / result: -35.0

[2]libmpf._normalize1 / x: (1, 35, 0, 6, 63, 'n') / result: (1, 35, 0, 6)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 72579025518885924655, 161, 66, 63, 'n') / result: (0, 4536189094930370291, 165, 62)

[3]libmpf._normalize1 / x: (1, 1304680943328581733865, 159, 71, 63, 'n') / result: (1, 2548204967438636199, 168, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 18135129422139221704512227983121011413, -285, 124, 63, 'n') / result: (1, 3932429343557826961, -223, 62)

[3]libmpf._normalize1 / x: (1, 11483609226400420635975673493232920769, -284, 124, 63, 'n') / result: (1, 4980221628495167597, -223, 63)

[1]ctx_mp_python.convert / x: -36 / result: -36.0

[2]libmpf._normalize1 / x: (1, 9, 2, 4, 63, 'n') / result: (1, 9, 2, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 448538496644555124459, 167, 69, 63, 'n') / result: (1, 1752103502517793455, 175, 61)

[3]libmpf._normalize1 / x: (0, 23186743939243600127, 169, 65, 63, 'n') / result: (0, 90573218512670313, 177, 57)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 13189185034283070331469062206255424083, -289, 124, 63, 'n') / result: (1, 5719897226993202853, -228, 63)

[3]libmpf._normalize1 / x: (1, 16703431602036975470205165674889049191, -289, 124, 63, 'n') / result: (1, 3621979366178303707, -227, 62)

[2]libmpf._normalize. / x: (1, 1752103502517793455, 175, 61, 63, 'n') / result: (1, 1752103502517793455, 175, 61)

[2]libmpf._normalize. / x: (0, 90573218512670313, 177, 57, 63, 'n') / result: (0, 90573218512670313, 177, 57)

[3]libmpf._normalize1 / x: (0, 12646286594106609987247354582984729443, -53, 124, 63, 'n') / result: (0, 5484452559681878865, 8, 63)

[3]libmpf._normalize1 / x: (0, 5309943730707238794979599317446831707, -52, 122, 63, 'n') / result: (0, 9211284045773716197, 7, 63)

[3]libmpf._normalize1 / x: (0, 17181666013769096711720228171, -45, 94, 63, 'n') / result: (0, 8000836714063350443, -14, 63)

[8]gammazeta.mpf_bernoulli / n: 38 / prec: 63 / result: (0, 8000836714063350443, -14, 63)

[3]libmpf._normalize1 / x: (0, 43880209396041495082860980575170087195, -6, 126, 63, 'n') / result: (0, 1189375458907675835, 59, 61)

[3]libmpf._normalize1 / x: (0, 73697979577092344010072653856836225271, -7, 126, 63, 'n') / result: (0, 1997587739131896417, 58, 61)

[1]ctx_mp_python.convert / x: -523022617466601111760007224100074291200000000 / result: -5.23022617466601112e+44

[3]libmpf._normalize1 / x: (1, 415439534196091439463, -98, 69, 63, 'n') / result: (1, 3245621360906964371, -91, 62)

[3]libmpf._normalize1 / x: (1, 697741754839080543139, -99, 70, 63, 'n') / result: (1, 5451107459680316743, -92, 63)

[3]libmpf._normalize1 / x: (1, 531747597832609278139534739, -91, 89, 63, 'n') / result: (1, 1980914167436246865, -63, 61)

[3]libmpf._normalize1 / x: (1, 2348988659055269762536451399, -92, 91, 63, 'n') / result: (1, 4375332331387828593, -63, 62)

[1]ctx_mp_python.convert / x: -37 / result: -37.0

[2]libmpf._normalize1 / x: (1, 37, 0, 6, 63, 'n') / result: (1, 37, 0, 6)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 93811259517212857995, 175, 67, 63, 'n') / result: (0, 5863203719825803625, 179, 63)

[3]libmpf._normalize1 / x: (0, 31690860965387067519, 177, 65, 63, 'n') / result: (0, 247584851292086465, 184, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19184269140775375029725697234156102159, -294, 124, 63, 'n') / result: (1, 8319850511990113241, -233, 63)

[3]libmpf._normalize1 / x: (1, 12147950256026891251363207169732689521, -293, 124, 63, 'n') / result: (1, 5268333623532078119, -232, 63)

[1]ctx_mp_python.convert / x: -38 / result: -38.0

[2]libmpf._normalize1 / x: (1, 19, 1, 5, 63, 'n') / result: (1, 19, 1, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 205507738977180406325, 180, 68, 63, 'n') / result: (0, 3211058421518443849, 186, 62)

[3]libmpf._normalize1 / x: (1, 48132467297327589465, 183, 66, 63, 'n') / result: (1, 6016558412165948683, 186, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 27904391477491454589606637831849018923, -299, 125, 63, 'n') / result: (1, 3025400186178222997, -236, 62)

[3]libmpf._normalize1 / x: (1, 17669745826948205455613586755625587157, -298, 124, 63, 'n') / result: (1, 7663030725137568173, -237, 63)

[2]libmpf._normalize. / x: (0, 3211058421518443849, 186, 62, 63, 'n') / result: (0, 3211058421518443849, 186, 62)

[2]libmpf._normalize. / x: (1, 6016558412165948683, 186, 63, 63, 'n') / result: (1, 6016558412165948683, 186, 63)

[3]libmpf._normalize1 / x: (1, 65534545464594667262352260243222057065, -51, 126, 63, 'n') / result: (1, 7105269656556359975, 12, 63)

[3]libmpf._normalize1 / x: (0, 11798554536330453950994046616154908025, -51, 124, 63, 'n') / result: (0, 2558403692095636325, 11, 62)

[3]libmpf._normalize1 / x: (1, 5304203340691314808984868911, -38, 93, 63, 'n') / result: (1, 2469962155768328723, -7, 62)

[8]gammazeta.mpf_bernoulli / n: 40 / prec: 63 / result: (1, 2469962155768328723, -7, 62)

[3]libmpf._normalize1 / x: (0, 17549747158223239524599342762120061925, 5, 124, 63, 'n') / result: (0, 3805494799103388803, 67, 62)

[3]libmpf._normalize1 / x: (1, 6319160298654189405059605826459662975, 4, 123, 63, 'n') / result: (1, 5480997859268016939, 64, 63)

[1]ctx_mp_python.convert / x: -815915283247897734345611269596115894272000000000 / result: -8.15915283247897734e+47

[3]libmpf._normalize1 / x: (1, 872519899092165410153, -100, 70, 63, 'n') / result: (1, 6816561711657542267, -93, 63)

[3]libmpf._normalize1 / x: (0, 628338751142119007607, -102, 70, 63, 'n') / result: (0, 4908896493297804747, -95, 63)

[3]libmpf._normalize1 / x: (1, 2126990398146998824196924027, -93, 91, 63, 'n') / result: (1, 7923656695138658673, -65, 63)

[3]libmpf._normalize1 / x: (1, 18791909267533261606090889781, -95, 94, 63, 'n') / result: (1, 4375332330244887063, -63, 62)

[1]ctx_mp_python.convert / x: -39 / result: -39.0

[2]libmpf._normalize1 / x: (1, 39, 0, 6, 63, 'n') / result: (1, 39, 0, 6)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 606555951412495204751, 186, 70, 63, 'n') / result: (1, 4738718370410118787, 193, 63)

[3]libmpf._normalize1 / x: (1, 22238895647003509283, 186, 65, 63, 'n') / result: (1, 5559723911750877321, 188, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 10147051446360528942589855611930695391, -302, 123, 63, 'n') / result: (1, 8801164177973012355, -242, 63)

[3]libmpf._normalize1 / x: (1, 25701448475561026116951221329278382119, -303, 125, 63, 'n') / result: (1, 2786556627322752063, -240, 62)

[1]ctx_mp_python.convert / x: -40 / result: -40.0

[2]libmpf._normalize1 / x: (1, 5, 3, 3, 63, 'n') / result: (1, 5, 3, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 351298850074055116355, 192, 69, 63, 'n') / result: (0, 5489044532407111193, 198, 63)

[3]libmpf._normalize1 / x: (0, 1544188498089992398445, 191, 71, 63, 'n') / result: (0, 3015993160332016403, 200, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 29518695116685175106020848459066313065, -308, 125, 63, 'n') / result: (1, 6400846674889463531, -246, 63)

[3]libmpf._normalize1 / x: (1, 9345981263840373133741712616823701789, -306, 123, 63, 'n') / result: (1, 8106346552211642365, -246, 63)

[2]libmpf._normalize. / x: (0, 5489044532407111193, 198, 63, 63, 'n') / result: (0, 5489044532407111193, 198, 63)

[2]libmpf._normalize. / x: (0, 3015993160332016403, 200, 62, 63, 'n') / result: (0, 3015993160332016403, 200, 62)

[3]libmpf._normalize1 / x: (0, 62660210583427097250498643237763449897, -48, 126, 63, 'n') / result: (0, 1698408411073771403, 17, 61)

[3]libmpf._normalize1 / x: (1, 121715736387416759864952148948353687417, -48, 127, 63, 'n') / result: (1, 6598223290845510711, 16, 63)

[3]libmpf._normalize1 / x: (0, 7230088225199077963422274409, -33, 93, 63, 'n') / result: (0, 841693047573682615, 0, 60)

[8]gammazeta.mpf_bernoulli / n: 42 / prec: 63 / result: (0, 841693047573682615, 0, 60)

[3]libmpf._normalize1 / x: (0, 1429538551541458572575331077385258845, 17, 121, 63, 'n') / result: (0, 4959708170345698041, 75, 63)

[3]libmpf._normalize1 / x: (1, 5553678670243411108458884562696989265, 16, 123, 63, 'n') / result: (1, 2408524191825725485, 77, 62)

[1]ctx_mp_python.convert / x: -1405006117752879898543142606244511569936384000000000 / result: -1.4050061177528799e+51

[3]libmpf._normalize1 / x: (1, 338109322043702851287, -101, 69, 63, 'n') / result: (1, 5282958156932857051, -95, 63)

[3]libmpf._normalize1 / x: (0, 328384031340010274153, -100, 69, 63, 'n') / result: (0, 2565500244843830267, -93, 62)

[3]libmpf._normalize1 / x: (1, 8507961597870953453393296603, -95, 93, 63, 'n') / result: (1, 7923656700058796865, -65, 63)

[3]libmpf._normalize1 / x: (1, 4697977314317815156855792645, -93, 92, 63, 'n') / result: (1, 2187666163927789385, -62, 61)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)

[2]libmpf._normalize. / x: (1, 7863254022688065029702, -73, 73, 63, 'n') / result: (1, 3839479503265656753, -62, 62)

[2]libmpf._normalize. / x: (1, 4774429189964926339844, -73, 73, 63, 'n') / result: (1, 4662528505825123379, -63, 63)

[3]libmpf._normalize1 / x: (1, 14670492915103580481, -62, 64, 63, 'n') / result: (1, 229226451798493445, -56, 58)

[3]libmpf._normalize1 / x: (0, 38659104502110227805, -63, 66, 63, 'n') / result: (0, 1208097015690944619, -58, 61)

[2]libmpf._normalize1 / x: (0, 43, 0, 6, 63, 'n') / result: (0, 43, 0, 6)

[2]libmpf._normalize. / x: (0, 36376095460795824230704307, -83, 85, 63, 'n') / result: (0, 8672736993025737817, -61, 63)

[3]libmpf._normalize1 / x: (0, 627773893652404672411, -71, 70, 63, 'n') / result: (0, 4904483544159411503, -64, 63)

[3]libmpf._normalize1 / x: (0, 878579810766445621153, -75, 70, 63, 'n') / result: (0, 6863904771612856415, -68, 63)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (1, 22202206702145888812685, -66, 75, 73, 'd') / result: (1, 5550551675536472203171, -64, 73)

[2]libmpf._normalize. / x: (0, 7594464020070601724459249913, -93, 93, 63, 'n') / result: (0, 3536447891998384951, -62, 62)

[2]libmpf._normalize. / x: (0, 6356400778999854884985515341, -93, 93, 63, 'n') / result: (0, 5919859538785978113, -63, 63)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[2]libmpf._normalize1 / x: (1, 4440441340429177762537, -70, 72, 73, 'd') / result: (1, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (0, 22202206702145888812685, -66, 75, 73, 'd') / result: (0, 5550551675536472203171, -64, 73)

[2]libmpf._normalize. / x: (0, 3598662904899361264242083, -87, 82, 67, 'n') / result: (0, 27455619086451425661, -70, 65)

[2]libmpf._normalize. / x: (0, 121511424321129627591347998641, -97, 97, 67, 'n') / result: (0, 113166332543948318429, -67, 67)

[2]libmpf._normalize. / x: (1, 101702412463997678159768245461, -97, 97, 67, 'n') / result: (1, 94717752620575649813, -67, 67)

[3]libmpf._normalize1 / x: (0, 3107051719737336571728455617090649806569, -137, 132, 63, 'n') / result: (0, 328971896930082321, -64, 59)

[3]libmpf._normalize1 / x: (1, 2600534536675261351397832975835338051393, -137, 131, 63, 'n') / result: (1, 2202738433036643019, -67, 61)

[3]libmpf._normalize1 / x: (0, 21698412433436347869, -64, 65, 63, 'n') / result: (0, 5424603108359086967, -62, 63)

[3]libmpf._normalize1 / x: (0, 212744752468289328459, -67, 68, 63, 'n') / result: (0, 3324136757317020757, -61, 62)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[3]libmpf._normalize1 / x: (0, 73625859608603539223597259355344671285, -124, 126, 73, 'd') / result: (0, 8174112454529096541255, -71, 73)

[3]libmpf._normalize1 / x: (0, 401140967618047752161, -70, 69, 63, 'n') / result: (0, 195869613094749879, -59, 58)

[3]libmpf._normalize1 / x: (1, 491629492034203366153, -70, 69, 63, 'n') / result: (1, 1920427703258606899, -62, 61)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3536447891998384951, -63, 62, 63, 'n') / result: (0, 3536447891998384951, -63, 62)

[2]libmpf._normalize1 / x: (0, 5919859538785978113, -64, 63, 63, 'n') / result: (0, 5919859538785978113, -64, 63)

[2]libmpf._normalize1 / x: (0, 6670361701514383015, -63, 63, 63, 'n') / result: (0, 6670361701514383015, -63, 63)

[2]libmpf._normalize1 / x: (1, 1761851274248449483, -64, 61, 63, 'n') / result: (1, 1761851274248449483, -64, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize. / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 24273841560447941966387938607859810665, -130, 125, 63, 'n') / result: (0, 328971896930082321, -64, 59)

[3]libmpf._normalize1 / x: (0, 40633352135550958611966205121601644895, -131, 125, 63, 'n') / result: (0, 8810953732146572075, -69, 63)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 80, 0, 7, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 44054768660732860375, -65, 66, 63, 'n') / result: (0, 5506846082591607547, -62, 63)

[2]libmpf._normalize1 / x: (1, 1644859484650411605, -60, 61, 63, 'n') / result: (1, 1644859484650411605, -60, 61)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (0, 33861126779625798842874539150473346135, -127, 125, 63, 'n') / result: (0, 7342461443455476729, -65, 63)

[3]libmpf._normalize1 / x: (1, 10114100650186642485108644809914164025, -125, 123, 63, 'n') / result: (1, 548286494883470535, -61, 59)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 7342461443455476729, -66, 63, 63, 'n') / result: (1, 7342461443455476729, -66, 63)

[2]libmpf._normalize1 / x: (0, 548286494883470535, -62, 59, 63, 'n') / result: (0, 548286494883470535, -62, 59)

[3]libmpf._normalize1 / x: (0, 46020432168659587391, -66, 66, 63, 'n') / result: (0, 719069252635306053, -60, 60)

[2]libmpf._normalize1 / x: (0, 431294705285432657, -64, 59, 63, 'n') / result: (0, 431294705285432657, -64, 59)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 25, 8, 5, 63, 'n') / result: (1, 25, 8, 5)

[2]libmpf._normalize1 / x: (0, 5, 4, 3, 63, 'n') / result: (0, 5, 4, 3)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 2258031773064924833922973247902939215, -132, 121, 63, 'n') / result: (0, 7650509230932147, -64, 53)

[3]libmpf._normalize1 / x: (0, 60477547364540961653902088241423611125, -137, 126, 63, 'n') / result: (0, 6556988823923030381, -74, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 75, 8, 7, 63, 'n') / result: (0, 75, 8, 7)

[2]libmpf._normalize1 / x: (0, 15995, 5, 14, 63, 'n') / result: (0, 15995, 5, 14)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 52512366815463368230766819718673005, -132, 116, 63, 'n') / result: (0, 5830043871608944021, -79, 63)

[3]libmpf._normalize1 / x: (0, 45006546875937459832748382386235744115, -142, 126, 63, 'n') / result: (0, 4879619589896208655, -79, 63)

[2]libmpf._normalize. / x: (0, 19200, 0, 15, 63, 'n') / result: (0, 75, 8, 7)

[2]libmpf._normalize. / x: (0, 511840, 0, 19, 63, 'n') / result: (0, 15995, 5, 14)

[3]libmpf._normalize1 / x: (1, 74551489017424491024125, -74, 76, 63, 'n') / result: (1, 2275130890424331391, -59, 61)

[3]libmpf._normalize1 / x: (0, 96179323480322784808895, -74, 77, 63, 'n') / result: (0, 5870320036640794971, -60, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 2797917151323238022636937861118616431, -124, 122, 63, 'n') / result: (0, 2426806283119286817, -64, 62)

[3]libmpf._normalize1 / x: (1, 7219219423112134834924519475303795211, -125, 123, 63, 'n') / result: (1, 3130837352875090651, -64, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize. / x: (1, 207087469492845808384, -75, 68, 63, 'n') / result: (1, 808935427706428939, -67, 60)

[3]libmpf._normalize1 / x: (0, 534329574890682137771, -76, 69, 63, 'n') / result: (0, 8348899607666908403, -70, 63)

[3]libmpf._normalize1 / x: (0, 91231928909612745845, -67, 67, 63, 'n') / result: (0, 5701995556850796615, -63, 63)

[3]libmpf._normalize1 / x: (0, 35951760745934598451, -70, 65, 63, 'n') / result: (0, 8987940186483649613, -68, 63)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 159725, 8, 18, 63, 'n') / result: (0, 159725, 8, 18)

[2]libmpf._normalize1 / x: (1, 95985, 5, 17, 63, 'n') / result: (1, 95985, 5, 17)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 40016865949048922098460801905645744715, -147, 125, 63, 'n') / result: (0, 8677274599604009705, -85, 63)

[3]libmpf._normalize1 / x: (0, 33493244186744156150293553663395271825, -147, 125, 63, 'n') / result: (0, 3631344811085550627, -84, 62)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 799375, 9, 20, 63, 'n') / result: (1, 799375, 9, 20)

[2]libmpf._normalize1 / x: (1, 25460015, 7, 25, 63, 'n') / result: (1, 25460015, 7, 25)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 59559986528817000327963676362431507575, -153, 126, 63, 'n') / result: (0, 3228753339387538495, -89, 62)

[3]libmpf._normalize1 / x: (0, 24925204976181697600378084232564222205, -152, 125, 63, 'n') / result: (0, 1351198069241135117, -88, 61)

[2]libmpf._normalize. / x: (1, 409280000, 0, 29, 63, 'n') / result: (1, 799375, 9, 20)

[2]libmpf._normalize. / x: (1, 3258881920, 0, 32, 63, 'n') / result: (1, 25460015, 7, 25)

[3]libmpf._normalize1 / x: (0, 29239553709504511526965505, -81, 85, 63, 'n') / result: (0, 3485626424491943303, -58, 62)

[3]libmpf._normalize1 / x: (1, 90845020104903879968992425, -82, 87, 63, 'n') / result: (1, 5414785152966015337, -58, 63)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (0, 12247325445554698861384085116666865109, -125, 124, 63, 'n') / result: (0, 663928842760370153, -61, 60)

[3]libmpf._normalize1 / x: (1, 19025743986835487874753903750134786811, -125, 124, 63, 'n') / result: (1, 8251101185472023371, -64, 63)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (1, 483458229323817981633, -80, 69, 63, 'n') / result: (1, 7554034833184655963, -74, 63)

[3]libmpf._normalize1 / x: (0, 751033565682075727281, -80, 70, 63, 'n') / result: (0, 5867449731891216619, -73, 63)

[3]libmpf._normalize1 / x: (0, 11670132865597246811557, -74, 74, 63, 'n') / result: (0, 2849153531639952835, -62, 62)

[3]libmpf._normalize1 / x: (0, 293481535699368004235, -73, 68, 63, 'n') / result: (0, 2292824497651312533, -66, 61)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 505203425, 9, 29, 63, 'n') / result: (1, 505203425, 9, 29)

[2]libmpf._normalize1 / x: (0, 383100075, 7, 29, 63, 'n') / result: (0, 383100075, 7, 29)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 22161855452583069890272984782720195425, -157, 125, 63, 'n') / result: (0, 4805586365600057295, -95, 63)

[3]libmpf._normalize1 / x: (0, 9274494874858306083701987045335225555, -156, 123, 63, 'n') / result: (0, 4022170996810820813, -95, 62)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 5346611025, 10, 33, 63, 'n') / result: (0, 5346611025, 10, 33)

[2]libmpf._normalize1 / x: (0, 79683247775, 8, 37, 63, 'n') / result: (0, 79683247775, 8, 37)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 32985087185239917977018384882608297425, -163, 125, 63, 'n') / result: (0, 7152500637172178299, -101, 63)

[3]libmpf._normalize1 / x: (0, 27607798697252632060399254899662565395, -163, 125, 63, 'n') / result: (0, 5986487065020756559, -101, 63)

[2]libmpf._normalize. / x: (0, 5474929689600, 0, 43, 63, 'n') / result: (0, 5346611025, 10, 33)

[2]libmpf._normalize. / x: (0, 20398911430400, 0, 45, 63, 'n') / result: (0, 79683247775, 8, 37)

[3]libmpf._normalize1 / x: (1, 324056177051784307141956820325, -93, 99, 63, 'n') / result: (1, 2357819008843102399, -56, 62)

[3]libmpf._normalize1 / x: (0, 697964151454075534224456886625, -93, 100, 63, 'n') / result: (0, 634794697774919345, -53, 60)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 2899605588550415203419176914388054959, -121, 122, 63, 'n') / result: (0, 628751735691493973, -59, 60)

[3]libmpf._normalize1 / x: (1, 780659688613449287895428207515966145, -118, 120, 63, 'n') / result: (1, 2708457377172989205, -60, 62)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (1, 523249190479717447803, -84, 69, 63, 'n') / result: (1, 4087884300622792561, -77, 62)

[3]libmpf._normalize1 / x: (0, 563496706890187366791, -83, 69, 63, 'n') / result: (0, 4402318022579588803, -76, 62)

[3]libmpf._normalize1 / x: (0, 93356975040477351704719, -77, 77, 63, 'n') / result: (0, 1424514389655721309, -61, 61)

[3]libmpf._normalize1 / x: (0, 2352254603617523622595, -76, 71, 63, 'n') / result: (0, 9188494545380951651, -68, 63)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 1556238678325, 10, 41, 63, 'n') / result: (0, 1556238678325, 10, 41)

[2]libmpf._normalize1 / x: (1, 2268698262425, 8, 42, 63, 'n') / result: (1, 2268698262425, 8, 42)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 49094083252450110473751321459065938085, -169, 126, 63, 'n') / result: (0, 665348896481132865, -103, 60)

[3]libmpf._normalize1 / x: (0, 41090677130794615160462135754336475985, -169, 125, 63, 'n') / result: (0, 8910120282821591157, -107, 63)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 14455968668775, 12, 44, 63, 'n') / result: (1, 14455968668775, 12, 44)

[2]libmpf._normalize1 / x: (1, 59980848870575, 11, 46, 63, 'n') / result: (1, 59980848870575, 11, 46)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 4566891465344196322980032117782578975, -171, 122, 63, 'n') / result: (0, 7922293837170698299, -112, 63)

[3]libmpf._normalize1 / x: (0, 61158217124903613258092536488074722155, -175, 126, 63, 'n') / result: (0, 3315393593608033919, -111, 62)

[2]libmpf._normalize. / x: (1, 59211647667302400, 0, 56, 63, 'n') / result: (1, 14455968668775, 12, 44)

[2]libmpf._normalize. / x: (1, 122840778486937600, 0, 57, 63, 'n') / result: (1, 59980848870575, 11, 46)

[2]libmpf._normalize. / x: (0, 84335690589707145727865254119700, -100, 107, 63, 'n') / result: (0, 4793928985106228181, -56, 63)

[3]libmpf._normalize1 / x: (1, 666894813011043735785824128368825, -101, 110, 63, 'n') / result: (1, 2369286324505437363, -53, 62)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (0, 26797691241149321222428984800923152905, -122, 125, 63, 'n') / result: (0, 5810823012249973553, -60, 63)

[3]libmpf._normalize1 / x: (1, 13244126807724776446574901861501862815, -119, 124, 63, 'n') / result: (1, 5743724423043484517, -58, 63)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (1, 429847587364587532155, -88, 69, 63, 'n') / result: (1, 3358184276285840095, -81, 62)

[3]libmpf._normalize1 / x: (0, 424884062124673355971, -86, 69, 63, 'n') / result: (0, 6638813470698021187, -80, 63)

[3]libmpf._normalize1 / x: (0, 1493708242463361341465889, -81, 81, 63, 'n') / result: (0, 178063898380203407, -58, 58)

[3]libmpf._normalize1 / x: (0, 37642712471351075983683, -80, 75, 63, 'n') / result: (0, 9190115349450946285, -68, 63)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (1, 2269130236804025, 12, 52, 63, 'n') / result: (1, 2269130236804025, 12, 52)

[2]libmpf._normalize1 / x: (0, 2852782626839175, 11, 52, 63, 'n') / result: (0, 2852782626839175, 11, 52)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 54377870471075081795532712431571738085, -180, 126, 63, 'n') / result: (0, 736957566248437051, -114, 60)

[3]libmpf._normalize1 / x: (0, 22756545906940879352646514131796740385, -179, 125, 63, 'n') / result: (0, 2467269651057141521, -116, 62)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 68401303720803625, 13, 56, 63, 'n') / result: (0, 68401303720803625, 13, 56)

[2]libmpf._normalize1 / x: (0, 167266505810126125, 12, 58, 63, 'n') / result: (0, 167266505810126125, 12, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 5058406555448844817710212451429032165, -182, 122, 63, 'n') / result: (0, 8774936602772087677, -123, 63)

[3]libmpf._normalize1 / x: (0, 16935103930746700912799277403707707215, -184, 124, 63, 'n') / result: (0, 459026911824584469, -119, 59)

[2]libmpf._normalize. / x: (0, 560343480080823296000, 0, 69, 63, 'n') / result: (0, 68401303720803625, 13, 56)

[2]libmpf._normalize. / x: (0, 685123607798276608000, 0, 70, 63, 'n') / result: (0, 167266505810126125, 12, 58)

[3]libmpf._normalize1 / x: (1, 14021517212678562872276147449791875, -110, 114, 63, 'n') / result: (1, 3113402249938737681, -58, 62)

[3]libmpf._normalize1 / x: (0, 2472490239026616112533901136893065625, -111, 121, 63, 'n') / result: (0, 8578173723525956253, -53, 63)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (0, 3634212906745768583084237125593031011, -120, 122, 63, 'n') / result: (0, 394022152876862223, -57, 59)

[3]libmpf._normalize1 / x: (1, 10013132631017680490633390693632521543, -115, 123, 63, 'n') / result: (1, 8685008121547891239, -55, 63)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (1, 452223895170123339983, -96, 69, 63, 'n') / result: (1, 7065998362033177187, -90, 63)

[3]libmpf._normalize1 / x: (0, 622992922738338840943, -90, 70, 63, 'n') / result: (0, 4867132208893272195, -83, 63)

[3]libmpf._normalize1 / x: (0, 764778613075242644859600285, -90, 90, 63, 'n') / result: (0, 2849022347760359365, -62, 62)

[3]libmpf._normalize1 / x: (0, 301146566903017501139075, -83, 78, 63, 'n') / result: (0, 9190263882538375889, -68, 63)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 5938245891476205125, 13, 63, 63, 'n') / result: (0, 5938245891476205125, 13, 63)

[3]libmpf._normalize1 / x: (1, 12784140159239967375, 12, 64, 63, 'n') / result: (1, 799008759952497961, 16, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 60230329218367640620017787682791897955, -191, 126, 63, 'n') / result: (0, 6530185378807135015, -128, 63)

[3]libmpf._normalize1 / x: (0, 3150717010371479239430937545536018635, -187, 122, 63, 'n') / result: (0, 5465622764050866235, -128, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 145656139266828289135, 15, 67, 63, 'n') / result: (1, 9103508704176768071, 19, 63)

[3]libmpf._normalize1 / x: (1, 24897176897666037859, 17, 65, 63, 'n') / result: (1, 6224294224416509465, 19, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 44822570581110802318840814306713871225, -196, 126, 63, 'n') / result: (0, 4859672840042519081, -133, 63)

[3]libmpf._normalize1 / x: (0, 37515514170004590010017911943426647525, -196, 125, 63, 'n') / result: (0, 4067440196502970221, -133, 62)

[2]libmpf._normalize. / x: (1, 4772860371495429378408448, 0, 82, 63, 'n') / result: (1, 9103508704176768071, 19, 63)

[2]libmpf._normalize. / x: (1, 3263322770330882914385920, 0, 82, 63, 'n') / result: (1, 6224294224416509465, 19, 63)

[2]libmpf._normalize. / x: (1, 18923129475525517292015738178269420986, -114, 124, 63, 'n') / result: (1, 4103299617517849991, -52, 62)

[2]libmpf._normalize. / x: (1, 67276010823413680491129222919416215356, -114, 126, 63, 'n') / result: (1, 227939990909073195, -46, 58)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (1, 22076984388113103508620694872119177005, -114, 125, 63, 'n') / result: (1, 4787182887104158323, -52, 63)

[3]libmpf._normalize1 / x: (1, 1226385613968478550693891247262263225, -108, 120, 63, 'n') / result: (1, 8509759660605399281, -51, 63)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (0, 483015959703629002223, -95, 69, 63, 'n') / result: (0, 943390546296150395, -86, 60)

[3]libmpf._normalize1 / x: (0, 858615562899657649181, -94, 70, 63, 'n') / result: (0, 838491760644196923, -84, 60)

[3]libmpf._normalize1 / x: (0, 47798664260593211600378235, -86, 86, 63, 'n') / result: (0, 5698044807981635523, -63, 63)

[3]libmpf._normalize1 / x: (0, 602293972297795646458427, -84, 79, 63, 'n') / result: (0, 9190276676907282203, -68, 63)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 379597924799022772277, 19, 69, 63, 'n') / result: (1, 5931217574984730817, 25, 63)

[3]libmpf._normalize1 / x: (0, 809196521251556068725, 19, 70, 63, 'n') / result: (0, 6321847822277781787, 26, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 33356331595245248237755762142550754615, -201, 125, 63, 'n') / result: (0, 7233001436342353981, -139, 63)

[3]libmpf._normalize1 / x: (0, 27918522173026671632648530257493817715, -201, 125, 63, 'n') / result: (0, 6053864478516048701, -139, 63)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 547266348807115658679, 26, 69, 63, 'n') / result: (0, 8551036700111182167, 32, 63)

[3]libmpf._normalize1 / x: (0, 74371416743750143831, 27, 67, 63, 'n') / result: (0, 4648213546484383989, 31, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 49646633071992927609523369124456638115, -207, 126, 63, 'n') / result: (0, 5382698743324542497, -144, 63)

[3]libmpf._normalize1 / x: (0, 41553149280783883360061442597860266915, -207, 125, 63, 'n') / result: (0, 9010402944768072485, -145, 63)

[2]libmpf._normalize. / x: (0, 36726422973873286971163410432, 0, 95, 63, 'n') / result: (0, 8551036700111182167, 32, 63)

[2]libmpf._normalize. / x: (0, 9981962583487302503730511872, 0, 94, 63, 'n') / result: (0, 4648213546484383989, 31, 63)

[3]libmpf._normalize1 / x: (0, 142228340972088272778619569836274761331, -114, 127, 63, 'n') / result: (0, 7710213813547359345, -50, 63)

[2]libmpf._normalize. / x: (0, 102068219478867265530122588489592255528, -113, 127, 63, 'n') / result: (0, 2766564632517879263, -48, 62)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (1, 63044106531377853258716742257310866025, -110, 126, 63, 'n') / result: (1, 6835255726372744791, -47, 63)

[3]libmpf._normalize1 / x: (1, 22621369476413167856335118387496242535, -108, 125, 63, 'n') / result: (1, 4905227586184886909, -46, 63)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (0, 735639350847988174599, -98, 70, 63, 'n') / result: (0, 2873591214249953807, -90, 62)

[3]libmpf._normalize1 / x: (0, 527921497265999171807, -97, 69, 63, 'n') / result: (0, 8248773394781237059, -91, 63)

[3]libmpf._normalize1 / x: (0, 764778631043082599871105551, -90, 90, 63, 'n') / result: (0, 5698044829391558467, -63, 63)

[3]libmpf._normalize1 / x: (0, 77093636702891237527580483, -91, 86, 63, 'n') / result: (0, 2297569415059424565, -66, 61)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 57662991357707627055, 32, 66, 63, 'n') / result: (0, 3603936959856726691, 36, 62)

[3]libmpf._normalize1 / x: (1, 1437889075215054906555, 31, 71, 63, 'n') / result: (1, 5616754200058808229, 39, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 36946331588459853101409437483226568255, -212, 125, 63, 'n') / result: (0, 8011458594715598135, -150, 63)

[3]libmpf._normalize1 / x: (0, 61846547766748105464701329844617241275, -213, 126, 63, 'n') / result: (0, 6705416144943681849, -150, 63)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 228274104962209055851, 40, 68, 63, 'n') / result: (1, 7133565780069032995, 45, 63)

[3]libmpf._normalize1 / x: (0, 26914348801186832377, 40, 65, 63, 'n') / result: (0, 3364293600148354047, 43, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 54989888875847223220223541502596786025, -218, 126, 63, 'n') / result: (0, 5962015698393003263, -155, 63)

[3]libmpf._normalize1 / x: (0, 46025337872928822669330506813878711335, -218, 126, 63, 'n') / result: (0, 4990077131120879515, -155, 63)

[2]libmpf._normalize. / x: (1, 250990032726107957951446479011840, 0, 108, 63, 'n') / result: (1, 7133565780069032995, 45, 63)

[2]libmpf._normalize. / x: (0, 29592639460923968266433017675776, 0, 105, 63, 'n') / result: (0, 3364293600148354047, 43, 62)

[3]libmpf._normalize1 / x: (1, 186909809221639453388978439491408297945, -112, 128, 63, 'n') / result: (1, 633275066302977081, -44, 60)

[3]libmpf._normalize1 / x: (1, 122330202591788236165772964649268134339, -112, 127, 63, 'n') / result: (1, 6631533570530434539, -48, 63)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (1, 1254230027143918436041990026507456369, -99, 120, 63, 'n') / result: (1, 2175742272361583303, -40, 61)

[3]libmpf._normalize1 / x: (1, 13134053388094196809857435236799301011, -103, 124, 63, 'n') / result: (1, 5695987686764931311, -42, 63)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (0, 783603135207055312257, -101, 70, 63, 'n') / result: (0, 6121899493805119627, -94, 63)

[3]libmpf._normalize1 / x: (0, 512858745512761041735, -101, 69, 63, 'n') / result: (0, 8013417898636891277, -95, 63)

[3]libmpf._normalize1 / x: (0, 12236458102811221090923567243, -94, 94, 63, 'n') / result: (0, 2849022416121145033, -62, 62)

[3]libmpf._normalize1 / x: (0, 1233498195259677699043644557, -95, 90, 63, 'n') / result: (0, 9190277719942314171, -68, 63)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 188556490264140641855, 45, 68, 63, 'n') / result: (0, 2946195160377197529, 51, 62)

[3]libmpf._normalize1 / x: (0, 2225548058419568539601, 43, 71, 63, 'n') / result: (0, 1086693387900179951, 54, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 40922708000630491697015125013845482145, -223, 125, 63, 'n') / result: (0, 8873697783654702531, -161, 63)

[3]libmpf._normalize1 / x: (0, 34251414231016798261876893216209838725, -223, 125, 63, 'n') / result: (0, 7427091543993867185, -161, 63)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 321226127684662806559, 52, 69, 63, 'n') / result: (0, 156848695158526761, 63, 58)

[2]libmpf._normalize. / x: (1, 24511216292987607204, 55, 65, 63, 'n') / result: (1, 6127804073246901801, 57, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 60908216559077941130600741992040086365, -229, 126, 63, 'n') / result: (0, 3301841035778493965, -165, 62)

[3]libmpf._normalize1 / x: (0, 50978849088025002063390735859985241775, -229, 126, 63, 'n') / result: (0, 2763568946602369185, -165, 62)

[2]libmpf._normalize. / x: (0, 1446673868942314784502930796223397888, 0, 121, 63, 'n') / result: (0, 156848695158526761, 63, 58)

[2]libmpf._normalize. / x: (1, 883109636507972944889949195413225472, 0, 120, 63, 'n') / result: (1, 6127804073246901801, 57, 63)

[3]libmpf._normalize1 / x: (0, 50079534364983703695122916238331233545, -108, 126, 63, 'n') / result: (0, 1357408498889445207, -43, 61)

[3]libmpf._normalize1 / x: (0, 7508544780075954623870888434726495275, -108, 123, 63, 'n') / result: (0, 6512624450210435289, -48, 63)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (1, 3234655234598488357671791102608418811, -95, 122, 63, 'n') / result: (1, 5611232372149264135, -36, 63)

[3]libmpf._normalize1 / x: (1, 15519347923696052471468240293189850997, -100, 124, 63, 'n') / result: (1, 6730444293771865035, -39, 63)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (0, 680727573304786520061, -104, 70, 63, 'n') / result: (0, 332386510402727793, -93, 59)

[3]libmpf._normalize1 / x: (0, 816504950695436016873, -107, 70, 63, 'n') / result: (0, 3189472463654046941, -99, 62)

[3]libmpf._normalize1 / x: (0, 6118229051737997055806648177, -93, 93, 63, 'n') / result: (0, 5698044832551849127, -63, 63)

[3]libmpf._normalize1 / x: (0, 19735971127344315649155222749, -99, 94, 63, 'n') / result: (0, 1148784715178441003, -65, 60)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 42559521198282542841, 61, 66, 63, 'n') / result: (1, 5319940149785317855, 64, 63)

[3]libmpf._normalize1 / x: (1, 686637041819965882101, 57, 70, 63, 'n') / result: (1, 2682175944609241727, 65, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 22663522440587140885645301560489035475, -233, 125, 63, 'n') / result: (0, 1228592013312927987, -169, 61)

[3]libmpf._normalize1 / x: (0, 18968874079265117046044936044225571775, -233, 124, 63, 'n') / result: (0, 1028304724317160627, -169, 60)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 80687337035443079805, 66, 67, 63, 'n') / result: (1, 630369820589399061, 73, 60)

[3]libmpf._normalize1 / x: (0, 66610281220899387185, 67, 66, 63, 'n') / result: (0, 4163142576306211699, 71, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 8432938582544052422725319296265986605, -237, 123, 63, 'n') / result: (0, 7314408265304873597, -177, 63)

[3]libmpf._normalize1 / x: (0, 7058185703912601691711229801842372205, -237, 123, 63, 'n') / result: (0, 3061000109595268843, -176, 62)

[2]libmpf._normalize. / x: (1, 5953674625127859415045301058151133478912, 0, 133, 63, 'n') / result: (1, 630369820589399061, 73, 60)

[2]libmpf._normalize. / x: (0, 9829942482878019255586302188654535114752, 0, 133, 63, 'n') / result: (0, 4163142576306211699, 71, 62)

[3]libmpf._normalize1 / x: (1, 21964944334169745448267860876367779091, -105, 125, 63, 'n') / result: (1, 1190722018281500485, -41, 61)

[3]libmpf._normalize1 / x: (0, 15014427750499176404228679520263559919, -106, 124, 63, 'n') / result: (0, 6511470074287140955, -45, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (1, 1037671212338676546268170396658918145, -88, 120, 63, 'n') / result: (1, 1800072612389216457, -29, 61)

[3]libmpf._normalize1 / x: (0, 5674510878571132815167488814370555935, -92, 123, 63, 'n') / result: (0, 2460926808935780259, -31, 62)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (0, 484019761846864503825, -107, 69, 63, 'n') / result: (0, 472675548678578617, -97, 59)

[3]libmpf._normalize1 / x: (1, 330858099774841125015, -108, 69, 63, 'n') / result: (1, 2584828904490946289, -101, 62)

[3]libmpf._normalize1 / x: (0, 97891664828280628447843180985, -97, 97, 63, 'n') / result: (0, 5698044832579362465, -63, 63)

[3]libmpf._normalize1 / x: (0, 78943884506792433689916059919, -101, 96, 63, 'n') / result: (0, 9190277721126614335, -68, 63)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 96500617758501614261, 73, 67, 63, 'n') / result: (0, 6031288609906350891, 77, 63)

[3]libmpf._normalize1 / x: (0, 114292348486177253841, 71, 67, 63, 'n') / result: (0, 7143271780386078365, 75, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 50205401793750637679321345001685574755, -245, 126, 63, 'n') / result: (0, 2721640284764604129, -181, 62)

[3]libmpf._normalize1 / x: (0, 21010413258158442243976513517082177845, -244, 124, 63, 'n') / result: (0, 9111814279725451439, -183, 63)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[2]libmpf._normalize1 / x: (0, 5088543094890923849, 78, 63, 63, 'n') / result: (0, 5088543094890923849, 78, 63)

[3]libmpf._normalize1 / x: (1, 1043582167169263004575, 76, 70, 63, 'n') / result: (1, 8152985681009867223, 83, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 18681079737209539600809813864393137535, -249, 124, 63, 'n') / result: (0, 1012703361772875955, -185, 60)

[3]libmpf._normalize1 / x: (0, 62542625512657688535899262822162131185, -251, 126, 63, 'n') / result: (0, 1695221261344270035, -186, 61)

[2]libmpf._normalize. / x: (0, 1537917782908842968172144121246365941497856, 0, 141, 63, 'n') / result: (0, 5088543094890923849, 78, 63)

[2]libmpf._normalize. / x: (1, 78850839173769514721255165043159902384553984, 0, 146, 63, 'n') / result: (1, 8152985681009867223, 83, 63)

[3]libmpf._normalize1 / x: (0, 226291019416855305641858139314949155675, -107, 128, 63, 'n') / result: (0, 6133630371642849727, -42, 63)

[3]libmpf._normalize1 / x: (1, 519793378045542364839156571569879105045, -108, 129, 63, 'n') / result: (1, 7044513871506951709, -42, 63)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (1, 37369410969610776232502383199161563709, -88, 125, 63, 'n') / result: (1, 4051599655775564431, -25, 62)

[3]libmpf._normalize1 / x: (0, 42919008481914386704180212106358108503, -88, 126, 63, 'n') / result: (0, 2326644111850768485, -24, 62)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (0, 1010486412534087485231, -112, 70, 63, 'n') / result: (0, 3947212548961279239, -104, 62)

[3]libmpf._normalize1 / x: (1, 580275067028457560275, -111, 69, 63, 'n') / result: (1, 9066797922319649379, -105, 63)

[3]libmpf._normalize1 / x: (0, 12530133098023867653741892934919, -104, 104, 63, 'n') / result: (0, 5698044832581157449, -63, 63)

[3]libmpf._normalize1 / x: (0, 1263102152099612141086633571741, -105, 100, 63, 'n') / result: (0, 4595138860530322349, -67, 62)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 20988679834567751339407, 78, 75, 63, 'n') / result: (1, 5124189412736267417, 90, 63)

[3]libmpf._normalize1 / x: (0, 349594625851999273013, 82, 69, 63, 'n') / result: (0, 5462416028937488641, 88, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 6951099437101224037670254107021001325, -253, 123, 63, 'n') / result: (0, 6029117688694331267, -193, 63)

[3]libmpf._normalize1 / x: (0, 11635837304680500191608064399442024525, -254, 124, 63, 'n') / result: (0, 5046240033768989871, -193, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 58057216621105047707, 92, 66, 63, 'n') / result: (0, 7257152077638130963, 95, 63)

[3]libmpf._normalize1 / x: (0, 188580328422638230757, 91, 68, 63, 'n') / result: (0, 5893135263207444711, 96, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 41383289672044496596522068748116027805, -261, 125, 63, 'n') / result: (0, 560848157087844769, -195, 59)

[3]libmpf._normalize1 / x: (0, 34636911046490791263732716611512372465, -261, 125, 63, 'n') / result: (0, 938835355119812069, -196, 60)

[2]libmpf._normalize. / x: (0, 287485412098922461667982331978406275741367926784, 0, 158, 63, 'n') / result: (0, 7257152077638130963, 95, 63)

[2]libmpf._normalize. / x: (0, 466902278351941371651683013755101458611249872896, 0, 159, 63, 'n') / result: (0, 5893135263207444711, 96, 63)

[2]libmpf._normalize. / x: (1, 1462523369152879011295124060991534512, -100, 121, 63, 'n') / result: (1, 5074147245268386575, -42, 63)

[3]libmpf._normalize1 / x: (0, 20033887155325022172557909195842259483, -101, 124, 63, 'n') / result: (0, 2172078397713283145, -38, 61)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (1, 31812319479043571296708814665128689925, -84, 125, 63, 'n') / result: (1, 6898197178196394129, -22, 63)

[3]libmpf._normalize1 / x: (0, 13617825534333540052592646025551106755, -80, 124, 63, 'n') / result: (0, 2952895205770599875, -18, 62)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (0, 677588716561011546007, -117, 70, 63, 'n') / result: (0, 5293661848132902703, -110, 63)

[3]libmpf._normalize1 / x: (1, 580107648688699166737, -114, 69, 63, 'n') / result: (1, 141627843918139445, -102, 57)

[3]libmpf._normalize1 / x: (0, 801928518273532823437993758940975, -110, 110, 63, 'n') / result: (0, 5698044832581195063, -63, 63)

[3]libmpf._normalize1 / x: (0, 157887769012309889798425046987, -102, 97, 63, 'n') / result: (0, 1148784715131550109, -65, 60)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 761472840172237879685, 95, 70, 63, 'n') / result: (0, 5949006563845608435, 102, 63)

[3]libmpf._normalize1 / x: (1, 437614464685711356295, 96, 69, 63, 'n') / result: (1, 3418863005357119971, 103, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 3849608341585534566958706284205843135, -263, 122, 63, 'n') / result: (0, 208687686358267821, -199, 58)

[3]libmpf._normalize1 / x: (0, 6444076473765728607046461119081072635, -264, 123, 63, 'n') / result: (0, 5589345370015625341, -204, 63)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 350846125758562507335, 103, 69, 63, 'n') / result: (1, 5481970714977539177, 109, 63)

[3]libmpf._normalize1 / x: (1, 74534912207269609077, 104, 67, 63, 'n') / result: (1, 4658432012954350567, 108, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 1432412406171361699173846413387921715, -267, 121, 63, 'n') / result: (0, 4969678856531773225, -209, 63)

[3]libmpf._normalize1 / x: (0, 38364734355442477288303026551468412515, -272, 125, 63, 'n') / result: (0, 8319025667000000507, -210, 63)

[2]libmpf._normalize. / x: (1, 3558002415244724950809259069812453979166984711962624, 0, 172, 63, 'n') / result: (1, 5481970714977539177, 109, 63)

[2]libmpf._normalize. / x: (1, 1511747619160059243288971259676420671793485580337152, 0, 171, 63, 'n') / result: (1, 4658432012954350567, 108, 63)

[3]libmpf._normalize1 / x: (1, 70220920333659255609216779534012805831, -102, 126, 63, 'n') / result: (1, 3806683718984244891, -38, 62)

[2]libmpf._normalize. / x: (1, 68755566163010476042323696683406531314, -101, 126, 63, 'n') / result: (1, 3727246710220339821, -37, 62)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (0, 28564138845547077435271488852679064007, -76, 125, 63, 'n') / result: (0, 6193860278303945989, -14, 63)

[3]libmpf._normalize1 / x: (0, 27968068902438542658199577645944075617, -75, 125, 63, 'n') / result: (0, 3032304106424814551, -12, 62)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (1, 412040713961493872039, -118, 69, 63, 'n') / result: (1, 6438136155648341751, -112, 63)

[3]libmpf._normalize1 / x: (1, 403442342196902215663, -117, 69, 63, 'n') / result: (1, 24624166393853895, -103, 55)

[3]libmpf._normalize1 / x: (0, 3207714073094124855767974845040905, -112, 112, 63, 'n') / result: (0, 5698044832581183627, -63, 63)

[3]libmpf._normalize1 / x: (0, 315775538024595155413781203001, -103, 98, 63, 'n') / result: (0, 4595138860525842107, -67, 62)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 38324071213780464901, 109, 66, 63, 'n') / result: (1, 4790508901722558113, 112, 63)

[3]libmpf._normalize1 / x: (0, 1002892978746173733629, 108, 70, 63, 'n') / result: (0, 3917550698227241147, 116, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 34111402416731962319882918347266488375, -277, 125, 63, 'n') / result: (0, 7396731321349615963, -215, 63)

[3]libmpf._normalize1 / x: (0, 57100999970891128983570323012718202405, -278, 126, 63, 'n') / result: (0, 6190902821953488749, -215, 63)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 1287149785744775073831, 114, 71, 63, 'n') / result: (0, 314245553160345477, 126, 59)

[3]libmpf._normalize1 / x: (1, 85738875041749961551, 116, 67, 63, 'n') / result: (1, 5358679690109372597, 120, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 50770459410949897407773998073710952645, -283, 126, 63, 'n') / result: (0, 5504544239143900251, -220, 63)

[3]libmpf._normalize1 / x: (0, 42493767420198049473431719890454974835, -283, 125, 63, 'n') / result: (0, 4607183495407247441, -220, 62)

[2]libmpf._normalize. / x: (0, 26733055155945488292161336992558946208786568496837296128, 0, 185, 63, 'n') / result: (0, 314245553160345477, 126, 59)

[2]libmpf._normalize. / x: (1, 7122907064537415414392353520048899494982658274331983872, 0, 183, 63, 'n') / result: (1, 5358679690109372597, 120, 63)

[3]libmpf._normalize1 / x: (0, 135394247782269473733949133380012716805, -100, 127, 63, 'n') / result: (0, 7339736879378862707, -36, 63)

[3]libmpf._normalize1 / x: (0, 63161273848020758359002705866626337001, -100, 126, 63, 'n') / result: (0, 3423979516148799131, -36, 62)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (0, 37928386545729720923167061177001082657, -69, 125, 63, 'n') / result: (0, 8224407818350028119, -7, 63)

[3]libmpf._normalize1 / x: (0, 17693552336734773777551350504728987481, -69, 124, 63, 'n') / result: (0, 1918338788247381523, -6, 61)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (1, 643967675353454784559, -121, 70, 63, 'n') / result: (1, 157218670740589547, -109, 58)

[3]libmpf._normalize1 / x: (1, 600820483270180954157, -122, 70, 63, 'n') / result: (1, 73342344149192011, -109, 57)

[3]libmpf._normalize1 / x: (0, 400964259136765449782387155317781, -109, 109, 63, 'n') / result: (0, 5698044832581181393, -63, 63)

[3]libmpf._normalize1 / x: (0, 20209634433574016603178777064117, -109, 104, 63, 'n') / result: (0, 4595138860525825431, -67, 62)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 63245882617146938317, 124, 66, 63, 'n') / result: (1, 3952867663571683645, 128, 62)

[3]libmpf._normalize1 / x: (1, 1453535521167797036927, 120, 71, 63, 'n') / result: (1, 5677873129561707175, 128, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 37782667468613877136997630897945460165, -288, 125, 63, 'n') / result: (0, 8192810030353712001, -226, 63)

[3]libmpf._normalize1 / x: (0, 31623268777821804258499895642709184015, -288, 125, 63, 'n') / result: (0, 6857203342001484563, -226, 63)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 167821910228893032325, 129, 68, 63, 'n') / result: (1, 1311108673663226815, 136, 61)

[3]libmpf._normalize1 / x: (0, 243282803486292953425, 129, 68, 63, 'n') / result: (0, 7602587608946654795, 134, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 56234667860262514805202473889875336415, -294, 126, 63, 'n') / result: (0, 6096974906309739163, -231, 63)

[3]libmpf._normalize1 / x: (0, 47067190739083615638163598826958021645, -294, 126, 63, 'n') / result: (0, 1275758761302601779, -229, 61)

[2]libmpf._normalize. / x: (1, 1311108673663226815, 136, 61, 63, 'n') / result: (1, 1311108673663226815, 136, 61)

[2]libmpf._normalize. / x: (0, 7602587608946654795, 134, 63, 63, 'n') / result: (0, 7602587608946654795, 134, 63)

[2]libmpf._normalize. / x: (1, 17692864433454032061058315459623136150, -95, 124, 63, 'n') / result: (1, 3836528411248475031, -33, 62)

[3]libmpf._normalize1 / x: (0, 19590251835637988262321696900261174425, -97, 124, 63, 'n') / result: (0, 2123979359973684801, -34, 61)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (0, 31135385576687430263064412037060546133, -62, 125, 63, 'n') / result: (0, 3375705268341835221, 1, 62)

[3]libmpf._normalize1 / x: (1, 17237176228335627275277269923351032243, -63, 124, 63, 'n') / result: (1, 3737716782855396105, -1, 62)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (1, 545685272070706179223, -124, 69, 63, 'n') / result: (1, 4263166188052392025, -117, 62)

[3]libmpf._normalize1 / x: (0, 604204703148614153459, -126, 70, 63, 'n') / result: (0, 2360174621674274037, -118, 62)

[3]libmpf._normalize1 / x: (0, 102646850339011950884938363117131687, -117, 117, 63, 'n') / result: (0, 1424511208145295289, -61, 61)

[3]libmpf._normalize1 / x: (0, 10347332829989898861268666902215925, -118, 113, 63, 'n') / result: (0, 4595138860525826479, -67, 62)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 192696121062493127165, 136, 68, 63, 'n') / result: (0, 376359611450181889, 145, 59)

[3]libmpf._normalize1 / x: (0, 183874559694886282155, 134, 68, 63, 'n') / result: (0, 5746079990465196317, 139, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 41849055151823266828107194296021280645, -299, 125, 63, 'n') / result: (0, 4537283651207247749, -236, 62)

[3]libmpf._normalize1 / x: (0, 8756686649131835466447940865450562285, -297, 123, 63, 'n') / result: (0, 3797607475505419249, -236, 62)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 19443630313297300207, 143, 65, 63, 'n') / result: (1, 1215226894581081263, 147, 61)

[3]libmpf._normalize1 / x: (1, 65963617822494298557, 144, 66, 63, 'n') / result: (1, 1030681528476473415, 150, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 31143482903682431126457094756468959835, -304, 125, 63, 'n') / result: (0, 6753166364587531533, -242, 63)

[3]libmpf._normalize1 / x: (0, 26066416071834300922581788533014132335, -304, 125, 63, 'n') / result: (0, 5652252986798763533, -242, 63)

[2]libmpf._normalize. / x: (1, 1215226894581081263, 147, 61, 63, 'n') / result: (1, 1215226894581081263, 147, 61)

[2]libmpf._normalize. / x: (1, 1030681528476473415, 150, 60, 63, 'n') / result: (1, 1030681528476473415, 150, 60)

[3]libmpf._normalize1 / x: (0, 38398752592328577701778311819519835381, -95, 125, 63, 'n') / result: (0, 8326402196267207825, -33, 63)

[3]libmpf._normalize1 / x: (1, 62551680490205993355442833462183543739, -95, 126, 63, 'n') / result: (1, 211933337125314003, -27, 58)

[3]libmpf._normalize1 / x: (0, 15478498771225430759843386699, -55, 94, 63, 'n') / result: (0, 7207737663400094379, -24, 63)

[8]gammazeta.mpf_bernoulli / n: 34 / prec: 63 / result: (0, 7207737663400094379, -24, 63)

[3]libmpf._normalize1 / x: (0, 60014522710652418568120577607807315675, -57, 126, 63, 'n') / result: (0, 6506787590356999663, 6, 63)

[3]libmpf._normalize1 / x: (1, 1527559896128195227030945140210289137, -51, 121, 63, 'n') / result: (1, 5299788025548546427, 7, 63)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (1, 479978124815640598439, -128, 69, 63, 'n') / result: (1, 7499658200244384351, -122, 63)

[3]libmpf._normalize1 / x: (0, 390942885886276669315, -127, 69, 63, 'n') / result: (0, 3054241295986536479, -120, 62)

[3]libmpf._normalize1 / x: (0, 3284699210848382420618489141269007777, -122, 122, 63, 'n') / result: (0, 5698044832581181143, -63, 63)

[3]libmpf._normalize1 / x: (0, 41389331319959598498162295866863647, -120, 115, 63, 'n') / result: (0, 2297569430262913409, -66, 61)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 619533690703767303921, 147, 70, 63, 'n') / result: (1, 2420053479311591031, 155, 62)

[3]libmpf._normalize1 / x: (0, 46164759385534435325, 150, 66, 63, 'n') / result: (0, 11270693209358993, 162, 54)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 46353090833387804464571341472013834195, -310, 126, 63, 'n') / result: (0, 5025612178297697885, -247, 63)

[3]libmpf._normalize1 / x: (0, 38796526246451052533222048488267114195, -310, 125, 63, 'n') / result: (0, 8412655608258624793, -248, 63)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 98846858380215091687, 156, 67, 63, 'n') / result: (0, 3088964324381721615, 161, 62)

[2]libmpf._normalize1 / x: (0, 9034638843612309059, 159, 63, 63, 'n') / result: (0, 9034638843612309059, 159, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 34495323410893249833939977263554182275, -315, 125, 63, 'n') / result: (0, 116874701820876695, -247, 57)

[3]libmpf._normalize1 / x: (0, 57743666971462031675278612586468097095, -316, 126, 63, 'n') / result: (0, 6260580917773860311, -253, 63)

[2]libmpf._normalize. / x: (0, 3088964324381721615, 161, 62, 63, 'n') / result: (0, 3088964324381721615, 161, 62)

[2]libmpf._normalize. / x: (0, 9034638843612309059, 159, 63, 63, 'n') / result: (0, 9034638843612309059, 159, 63)

[3]libmpf._normalize1 / x: (0, 35859489249646806726200715264377323451, -94, 125, 63, 'n') / result: (0, 7775787229737531823, -32, 63)

[3]libmpf._normalize1 / x: (0, 36233442639412412749662332617427002345, -92, 125, 63, 'n') / result: (0, 3928437722627984777, -29, 62)

[3]libmpf._normalize1 / x: (1, 1929743914758391793175373481, -47, 91, 63, 'n') / result: (1, 1797214071041337953, -17, 61)

[8]gammazeta.mpf_bernoulli / n: 36 / prec: 63 / result: (1, 1797214071041337953, -17, 61)

[3]libmpf._normalize1 / x: (1, 13974754222707836956146771725835178319, -49, 124, 63, 'n') / result: (1, 6060583555284325475, 12, 63)

[3]libmpf._normalize1 / x: (1, 7060243552316602913539619838196341481, -46, 123, 63, 'n') / result: (1, 382736569884921803, 18, 59)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (0, 726655667654679785663, -133, 70, 63, 'n') / result: (0, 5676997403552185825, -126, 63)

[3]libmpf._normalize1 / x: (0, 734233448481955053357, -131, 70, 63, 'n') / result: (0, 2868099408132636927, -123, 62)

[3]libmpf._normalize1 / x: (0, 52555187373574118735663518388654374369, -126, 126, 63, 'n') / result: (0, 712255604072647643, -60, 60)

[3]libmpf._normalize1 / x: (0, 331114650559676790846991786032824575, -123, 118, 63, 'n') / result: (0, 2297569430262913429, -66, 61)

[1]ctx_mp_python.convert / x: -35 / result: -35.0

[2]libmpf._normalize1 / x: (1, 35, 0, 6, 63, 'n') / result: (1, 35, 0, 6)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (0, 72579025518885924655, 161, 66, 63, 'n') / result: (0, 4536189094930370291, 165, 62)

[3]libmpf._normalize1 / x: (1, 1304680943328581733865, 159, 71, 63, 'n') / result: (1, 2548204967438636199, 168, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 802216823509145344975348308454748425, -315, 120, 63, 'n') / result: (0, 2783248713129714783, -257, 62)

[3]libmpf._normalize1 / x: (0, 42972031234576395664844741591910245065, -321, 126, 63, 'n') / result: (0, 2329518481032134069, -257, 62)

[1]ctx_mp_python.convert / x: -36 / result: -36.0

[2]libmpf._normalize1 / x: (1, 9, 2, 4, 63, 'n') / result: (1, 9, 2, 4)

[2]libmpf._normalize1 / x: (1, 5, 4, 3, 63, 'n') / result: (1, 5, 4, 3)

[3]libmpf._normalize1 / x: (1, 448538496644555124459, 167, 69, 63, 'n') / result: (1, 1752103502517793455, 175, 61)

[3]libmpf._normalize1 / x: (0, 23186743939243600127, 169, 65, 63, 'n') / result: (0, 90573218512670313, 177, 57)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 19103954122636391469284970124881882945, -325, 124, 63, 'n') / result: (0, 2071254856282578443, -262, 61)

[3]libmpf._normalize1 / x: (0, 15989593017516798385482342384326702635, -325, 124, 63, 'n') / result: (0, 3467190297350153033, -263, 62)

[2]libmpf._normalize. / x: (1, 1752103502517793455, 175, 61, 63, 'n') / result: (1, 1752103502517793455, 175, 61)

[2]libmpf._normalize. / x: (0, 90573218512670313, 177, 57, 63, 'n') / result: (0, 90573218512670313, 177, 57)

[3]libmpf._normalize1 / x: (1, 4257122057153506135718764574361509223, -87, 122, 63, 'n') / result: (1, 7384929572642865799, -28, 63)

[3]libmpf._normalize1 / x: (1, 4574074514334820713417842003176897743, -88, 122, 63, 'n') / result: (1, 7934754440883825937, -29, 63)

[3]libmpf._normalize1 / x: (0, 17181666013769096711720228171, -45, 94, 63, 'n') / result: (0, 8000836714063350443, -14, 63)

[8]gammazeta.mpf_bernoulli / n: 38 / prec: 63 / result: (0, 8000836714063350443, -14, 63)

[3]libmpf._normalize1 / x: (1, 59085615655573209254764870715156198957, -42, 126, 63, 'n') / result: (1, 6406075285641600577, 21, 63)

[3]libmpf._normalize1 / x: (1, 63484674647700527374461258702643840091, -43, 126, 63, 'n') / result: (1, 3441511108628616881, 21, 62)

[1]ctx_mp_python.convert / x: -523022617466601111760007224100074291200000000 / result: -5.23022617466601112e+44

[3]libmpf._normalize1 / x: (0, 559397983361834222455, -134, 69, 63, 'n') / result: (0, 4370296745014329863, -127, 62)

[3]libmpf._normalize1 / x: (0, 601046440462300250307, -135, 70, 63, 'n') / result: (0, 2347837658055860353, -127, 62)

[3]libmpf._normalize1 / x: (0, 105110374747148237482790082788928258567, -127, 127, 63, 'n') / result: (0, 712255604072647643, -60, 60)

[3]libmpf._normalize1 / x: (0, 5297834408954828656126975888732741761, -127, 122, 63, 'n') / result: (0, 1148784715131456715, -65, 60)

[2]libmpf._normalize. / x: (0, 712255604072647643, -60, 60, 63, 'n') / result: (0, 712255604072647643, -60, 60)

[2]libmpf._normalize. / x: (0, 1148784715131456715, -65, 60, 63, 'n') / result: (0, 1148784715131456715, -65, 60)

[2]libmpf._normalize1 / x: (1, 2955367624703247477, -60, 62, 63, 'n') / result: (1, 2955367624703247477, -60, 62)

[3]libmpf._normalize1 / x: (0, 155785202723572367947, -65, 68, 63, 'n') / result: (0, 2434143792555818249, -59, 62)

[2]libmpf._normalize1 / x: (1, 2955367624703247477, -60, 62, 63, 'n') / result: (1, 2955367624703247477, -60, 62)

[3]libmpf._normalize1 / x: (0, 155785202723572367947, -65, 68, 63, 'n') / result: (0, 2434143792555818249, -59, 62)

[3]libmpf._normalize1 / x: (1, 2955367624703247477, -60, 62, 53, 'n') / result: (1, 2886101195999265, -50, 52)

[3]libmpf._normalize1 / x: (0, 2434143792555818249, -59, 62, 53, 'n') / result: (0, 4754187094835583, -50, 53)

zeta_ / result: (-2.56337279935727 + 4.2225663808498j) / count: 10765
zeta / count: 0 / s: Complex { re: 0.0, im: 80.0 }
gamma_ / s: (1.0, -80.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-80j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-80j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-80.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -46, 53, 53, 'd') / result: (1, 5, 4, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -46, 53, 53, 'd') / result: (1, 5, 4, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 5, 4, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-80.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 5, 4, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 4, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, 4, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 4, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 4, 3), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=800000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=800000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-80j) / result: (1.0 - 80.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-80j) / result: (1.0 - 80.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 5, 4, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 5, 4, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 5, 4, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5, 4, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=560 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 5, 4, 3), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=9671406556917033397649408, y=-773712524553362671811952640, prec=83 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=83, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 5, 4, 3)), prec=83, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 5, 4, 3), prec=83, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 4, 3), t=(1, 5, 4, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 25, 8, 5), prec=103, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6401 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=6401, exp=0, bc=13, prec=103, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 6401, 0, 13, 103, 'd') / result: (0, 6401, 0, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 6401, 0, 13, 103, 'd') / result: (0, 6401, 0, 13)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 6401, 0, 13), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=6400, exp=0, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6400, 0, 13, 10, 'd') / result: (0, 25, 8, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6400, 0, 13, 10, 'd') / result: (0, 25, 8, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 6401, 0, 13), prec=83, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=6401, n=90 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=7924054191465719139629294157824, prec=103 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=103, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=88879643538036121396737909091734, exp=-103, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=88879643538036121396737909091734 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=88879643538036121396737909091734, exp=-103, bc=107, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 88879643538036121396737909091734, -103, 107, 83, 'd') / result: (0, 5297639580847985827728385, -79, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 88879643538036121396737909091734, -103, 107, 83, 'd') / result: (0, 5297639580847985827728385, -79, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 5297639580847985827728385, -79, 83), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 5, 4, 3)), prec=83, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 5, 4, 3), x=(0, 1, 0, 1), prec=83, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 4, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5, 4, 3), x=(0, 1, 0, 1), prec=83, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5, 4, 3), t=(0, 1, 0, 1), prec=87, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=4, bc=3, prec=87, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 4, 3, 87, 'd') / result: (0, 5, 4, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 4, 3, 87, 'd') / result: (0, 5, 4, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 5, 4, 3), prec=87, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 5, 4, 3), prec=124, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2177807148294006166165597487563316553319 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2177807148294006166165597487563316553319, exp=-137, bc=131, prec=124, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2177807148294006166165597487563316553319, -137, 131, 124, 'd') / result: (0, 4253529586511730793292182592897102643, -128, 122)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2177807148294006166165597487563316553319, -137, 131, 124, 'd') / result: (0, 4253529586511730793292182592897102643, -128, 122)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 4253529586511730793292182592897102643, -128, 122), prec=124 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=265845599156983174580761412056068915, prec=124 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=1, prec=124 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=123 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=124, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=33141311497700254431024523387115992500, exp=-124, prec=87, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=33141311497700254431024523387115992500 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=33141311497700254431024523387115992500, exp=-124, bc=125, prec=87, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 33141311497700254431024523387115992500, -124, 125, 87, 'd') / result: (0, 120567388867858442357917823, -86, 87)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 33141311497700254431024523387115992500, -124, 125, 87, 'd') / result: (0, 120567388867858442357917823, -86, 87)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 120567388867858442357917823, -86, 87), prec=83, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=120567388867858442357917823, exp=-86, bc=87, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 120567388867858442357917823, -86, 87, 83, 'd') / result: (0, 7535461804241152647369863, -82, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 120567388867858442357917823, -86, 87, 83, 'd') / result: (0, 7535461804241152647369863, -82, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 7535461804241152647369863, -82, 83), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5297639580847985827728385, -80, 83), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 7535461804241152647369863, -82, 83), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1185267182844603922722004310, exp=-83, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1185267182844603922722004310 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-2624302196133211627643672612, exp=-83, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2624302196133211627643672612 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 592633591422301961361002155, -82, 89), (1, 656075549033302906910918153, -81, 90)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 592633591422301961361002155, -82, 89), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=78, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=314737854040487057368, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2697861798910035829208, exp=-248, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2697861798910035829208 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2697861798910035829208, exp=-248, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2697861798910035829208, -248, 72, 57, 'n') / result: (0, 41166104109345029, -232, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2697861798910035829208, -248, 72, 57, 'n') / result: (0, 41166104109345029, -232, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 656075549033302906910918153, -81, 90), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=656075549033302906910918153, exp=-81, mag=9, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=95, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=180974308342570944984528906, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=60441566411957664711899577, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=60441566411957664711899577 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=60441566411957664711899577, exp=-87, bc=86, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 60441566411957664711899577, -87, 86, 57, 'n') / result: (0, 112581190489153685, -58, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 60441566411957664711899577, -87, 86, 57, 'n') / result: (0, 112581190489153685, -58, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-142450201388760502097238275, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=142450201388760502097238275 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=142450201388760502097238275, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 142450201388760502097238275, -87, 87, 57, 'n') / result: (1, 33166772077968461, -55, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 142450201388760502097238275, -87, 87, 57, 'n') / result: (1, 33166772077968461, -55, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 41166104109345029, -232, 56), t=(0, 112581190489153685, -58, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4634529008430505007584273871781865, exp=-290, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4634529008430505007584273871781865, -290, 112, 53, 'n') / result: (0, 8039626271019911, -231, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4634529008430505007584273871781865, -290, 112, 53, 'n') / result: (0, 8039626271019911, -231, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 41166104109345029, -232, 56), t=(1, 33166772077968461, -55, 55), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1365346792332567428947795629130369, exp=-287, bc=111, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 1365346792332567428947795629130369, -287, 111, 53, 'n') / result: (1, 2368499133508935, -228, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 1365346792332567428947795629130369, -287, 111, 53, 'n') / result: (1, 2368499133508935, -228, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 8039626271019911, -231, 53), (1, 2368499133508935, -228, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (2.32973681356994e-54 - 5.49078222119323e-54j) / count: 134
gamma__ / s: Complex { re: 1.0, im: -80.0 } / result: Complex { re: 2.32973681356994e-54, im: -5.490782221193231e-54 }
zeta__ / s: Complex { re: 0.0, im: 80.0 } / result: Complex { re: -2.5633727993572686, im: 4.2225663808497975 } / z: Complex { re: 0.0, im: -0.0 }
zeta_ / s: (0.0, 90.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=90j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=90j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=90j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=90.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=6333186975989760, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6333186975989760 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=6333186975989760, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6333186975989760, -46, 53, 53, 'd') / result: (0, 45, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6333186975989760, -46, 53, 53, 'd') / result: (0, 45, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 45, 1, 6)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='90.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 45, 1, 6)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 45, 1, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 45, 1, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 45, 1, 6), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=415051741658464911360, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=900000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=900000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 90j / result: (0.0 + 90.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 90j / result: (0.0 + 90.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 45, 1, 6)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 45, 1, 6)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 45, 1, 6), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 45, 1, 6), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=45, exp=1, bc=6, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 45, 1, 6, 10, 'd') / result: (0, 45, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 45, 1, 6, 10, 'd') / result: (0, 45, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 45, 1, 6), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 45, 1, 6), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: convert / f_locals: x=90j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 536 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=90.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=6333186975989760, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6333186975989760 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=6333186975989760, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6333186975989760, -46, 53, 53, 'd') / result: (0, 45, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6333186975989760, -46, 53, 53, 'd') / result: (0, 45, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 45, 1, 6)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='90.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 45, 1, 6)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 45, 1, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 45, 1, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 45, 1, 6), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=415051741658464911360, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=900000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=900000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 90j / result: (0.0 + 90.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 90j / result: (0.0 + 90.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 537 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __nonzero__ / f_locals: s=mpc(real='0.0', imag='90.0') / f_lineno: 426 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 540 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_is_nonzero / f_locals: z=((0, 0, 0, 0), (0, 45, 1, 6)) / f_lineno: 84 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 427 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _im / f_locals: x=mpc(real='0.0', imag='90.0') / f_lineno: 75 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 76 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 45, 1, 6) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 77 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 45, 1, 6) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('90.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 45, 1, 6), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=45, exp=1, bc=6, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 45, 1, 6, 53, 'n') / result: (0, 45, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 45, 1, 6, 53, 'n') / result: (0, 45, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _re / f_locals: x=mpc(real='0.0', imag='90.0') / f_lineno: 70 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 71 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 72 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('90.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 45, 1, 6), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=45, exp=1, bc=6, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 45, 1, 6, 53, 'n') / result: (0, 45, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 45, 1, 6, 53, 'n') / result: (0, 45, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('90.0'), t=26500 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('90.0'), t=26500 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=26500 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=26500, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=26500, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26500 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 45, 1, 6), t=(0, 6625, 2, 13) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 45, 1, 6), t=(0, 6625, 2, 13) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: s=mpc(real='0.0', imag='90.0'), t=1 / f_lineno: 442 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 567 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpf('1.0') / f_lineno: 128 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('0.0'), other=mpf('1.0') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpc(real='0.0', imag='90.0') / f_lineno: 408 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 569 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 45, 1, 6)), prec=53, rnd='n' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 411 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 45, 1, 6), prec=53, rnd='n' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 45, 1, 6), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=45, exp=1, bc=6, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 45, 1, 6, 53, 'n') / result: (0, 45, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 45, 1, 6, 53, 'n') / result: (0, 45, 1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('90.0'), other=mpf('+inf') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 570 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 45, 1, 6), t=(0, 0, -456, -2) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: isnan / f_locals: x=mpf('90.0') / f_lineno: 318 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 576 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='90.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='90.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('0.0'), t=106 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=106 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=106 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=106, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 53, 1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _hurwitz / f_locals: s=mpc(real='0.0', imag='90.0'), a=1, d=0, kwargs={} / f_lineno: 582 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 580 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 584 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _convert_param / f_locals: x=1 / f_lineno: 1060 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 590 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='90.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='90.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=0 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=0 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=0 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 603 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _hurwitz_em / f_locals: s=mpc(real='0.0', imag='90.0'), a=1, d=0, prec=63, verbose=None / f_lineno: 660 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 604 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 662 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: isint / f_locals: x=mpc(real='0.0', imag='90.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 670 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __sub__ / f_locals: s=mpc(real='0.0', imag='90.0'), t=1 / f_lineno: 479 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 672 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 482 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_sub_mpf / f_locals: z=((0, 0, 0, 0), (0, 45, 1, 6)), p=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 101 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 487 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1, 0, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __add__ / f_locals: self=mpf('1.0'), other=0 / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=63, rnd='n', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _zetasum / f_locals: s=mpc(real='0.0', imag='90.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 725 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='90.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='90.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='90.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=63, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=31.5 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=31.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8866461766385664, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8866461766385664 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8866461766385664, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 63, -1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _zetasum_fast / f_locals: s=mpc(real='0.0', imag='90.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 1291 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 741 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: isint / f_locals: x=mpf('1.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: __int__ / f_locals: s=mpf('1.0') / f_lineno: 143 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1294 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_zetasum / f_locals: s=((0, 0, 0, 0), (0, 45, 1, 6)), a=1, n=20, derivatives=[0], reflect=False, prec=63 / f_lineno: 1338 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1351 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 45, 1, 6), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1352 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: zetasum_sieved / f_locals: critical_line=False, sre=0, sim=850025966916536138465280, a=1, n=20, wp=73 / f_lineno: 1278 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1356 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: primesieve / f_locals: n=21 / f_lineno: 1251 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1281 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1286 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1287 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-589193102370938372802990, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4236971634739530445130, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-933848972941498658548560, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=803393617444039067229, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1368064017708927591622860, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11660904354273533429019, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1654074155983443653420370, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7530051232454475674366, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2038273247825026118716950, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9060507494562647489064, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2530604880525170417862800788562951636843111676972639042574046169409834669576504370737052446214535074807185108533292543508480, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2530604880525170417862800788562951636843111676972639042574046169409834669576504370737052446214535074807185108533292543508480 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5387113342516521161606563130682429081660922994228949385764652767532511259525619113574177830058911457837850147606151902927367796462811557145449392558468234535146223598537260262992012664104603207700288988795589450737944331773766190831346423396485025585189405058025015 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5387113342516521161606563130682429081660922994228949385764652767532511259525619113574177830058911457837850147606151902927367796462811557145449392558468234535146223598537260262992012664104603207700288988795589450737944331773766190831346423396485025585189405058025015 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2180273557668190851355110, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=581964302675443081731, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2408304912262217849728350, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9922639310919606007739, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2502849590292692158712460, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4392472381296982510847, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=14395531101135108275486, exp=-73, prec=63, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1357 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=14395531101135108275486 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=14395531101135108275486, exp=-73, bc=74, prec=63, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 14395531101135108275486, -73, 74, 63, 'n') / result: (0, 439316745029757943, -58, 59)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 14395531101135108275486, -73, 74, 63, 'n') / result: (0, 439316745029757943, -58, 59)

[2]libmpf._normalize. / x: (0, 77375889611137105492213, -73, 77, 63, 'n') / result: (0, 2361324756199252487, -58, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (0, 439316745029757943, -58, 59, 63, 'n') / result: (0, 439316745029757943, -58, 59)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[2]libmpf._normalize. / x: (0, 29894728251118529325738970, -83, 85, 63, 'n') / result: (0, 1781864658064754565, -59, 61)

[3]libmpf._normalize1 / x: (0, 763879266319838071703, -71, 70, 63, 'n') / result: (0, 5967806768123734935, -64, 63)

[3]libmpf._normalize1 / x: (0, 858612087794480947945, -74, 70, 63, 'n') / result: (0, 3353953467947191203, -66, 62)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (1, 164216646887247780719985, -69, 78, 73, 'd') / result: (1, 5131770215226493147499, -64, 73)

[2]libmpf._normalize. / x: (1, 1605873999221423165643132143, -93, 91, 63, 'n') / result: (1, 373896676865737691, -61, 59)

[2]libmpf._normalize. / x: (1, 9772455337019529173721290349, -93, 93, 63, 'n') / result: (1, 9101308264787801703, -63, 63)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[2]libmpf._normalize1 / x: (1, 3649258819716617349333, -70, 72, 73, 'd') / result: (1, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (0, 164216646887247780719985, -69, 78, 73, 'd') / result: (0, 5131770215226493147499, -64, 73)

[2]libmpf._normalize. / x: (0, 3516875111606193962782702, -86, 82, 67, 'n') / result: (0, 107326510974310118493, -71, 67)

[2]libmpf._normalize. / x: (1, 25693983987542770650290114325, -97, 95, 67, 'n') / result: (1, 95717549277628848889, -69, 67)

[2]libmpf._normalize. / x: (0, 156359285392312466779540645612, -97, 97, 67, 'n') / result: (0, 145620932236604827251, -67, 67)

[3]libmpf._normalize1 / x: (1, 10273030602979502205119877705116781404277, -140, 133, 63, 'n') / result: (1, 8701595388875349899, -70, 63)

[3]libmpf._normalize1 / x: (0, 15628986581781238100510296760937605452743, -138, 134, 63, 'n') / result: (0, 3309566641741018801, -66, 62)

[3]libmpf._normalize1 / x: (1, 4757074368718191723541, -70, 73, 63, 'n') / result: (1, 4645580438201359105, -60, 63)

[3]libmpf._normalize1 / x: (1, 418048325633318895863, -69, 69, 63, 'n') / result: (1, 1633001272005151937, -61, 61)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[3]libmpf._normalize1 / x: (0, 88992363585566970953120240147120456069, -122, 127, 73, 'd') / result: (0, 1235017138356372542367, -66, 71)

[3]libmpf._normalize1 / x: (1, 568429575227652090955, -71, 69, 63, 'n') / result: (1, 8881712112932063921, -65, 63)

[3]libmpf._normalize1 / x: (0, 799251014369688070597, -74, 70, 63, 'n') / result: (0, 1561037137440797013, -65, 61)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (1, 373896676865737691, -62, 59, 63, 'n') / result: (1, 373896676865737691, -62, 59)

[2]libmpf._normalize1 / x: (1, 9101308264787801703, -64, 63, 63, 'n') / result: (1, 9101308264787801703, -64, 63)

[3]libmpf._normalize1 / x: (1, 11872885527857965449, -65, 64, 63, 'n') / result: (1, 1484110690982245681, -62, 61)

[3]libmpf._normalize1 / x: (1, 16641579392134806393, -65, 64, 63, 'n') / result: (1, 2080197424016850799, -62, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 1254032056027771265400185050020732273, -127, 120, 63, 'n') / result: (1, 2175398847218837475, -68, 61)

[3]libmpf._normalize1 / x: (1, 30525364417541480665283554735790018709, -129, 125, 63, 'n') / result: (1, 3309566641741018801, -66, 62)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 90, 0, 7, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 148930498878345846045, -65, 68, 63, 'n') / result: (1, 4654078089948307689, -60, 63)

[3]libmpf._normalize1 / x: (0, 97892948124847686375, -67, 67, 63, 'n') / result: (0, 3059154628901490199, -62, 62)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (1, 28617529141445138121166671428082289245, -125, 125, 63, 'n') / result: (1, 1551359363316102563, -61, 61)

[3]libmpf._normalize1 / x: (0, 18810480840416568978914206191202373795, -127, 124, 63, 'n') / result: (0, 4078872838535320265, -65, 62)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (0, 1551359363316102563, -62, 61, 63, 'n') / result: (0, 1551359363316102563, -62, 61)

[2]libmpf._normalize1 / x: (1, 4078872838535320265, -66, 62, 63, 'n') / result: (1, 4078872838535320265, -66, 62)

[2]libmpf._normalize. / x: (0, 67248672333856882, -62, 56, 63, 'n') / result: (0, 33624336166928441, -61, 55)

[3]libmpf._normalize1 / x: (1, 37362031622804933049, -66, 66, 63, 'n') / result: (1, 4670253952850616631, -63, 63)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 2025, 2, 11, 63, 'n') / result: (1, 2025, 2, 11)

[2]libmpf._normalize1 / x: (0, 45, 1, 6, 63, 'n') / result: (0, 45, 1, 6)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 7296186507797941908087799697206732425, -134, 123, 63, 'n') / result: (1, 1582108252522790891, -72, 61)

[3]libmpf._normalize1 / x: (1, 11100132515469629332525478679564807603, -132, 124, 63, 'n') / result: (1, 4813915115259663711, -71, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 6075, 2, 13, 63, 'n') / result: (0, 6075, 2, 13)

[2]libmpf._normalize1 / x: (0, 182205, 2, 18, 63, 'n') / result: (0, 182205, 2, 18)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 5306317460216685024368759185963731873, -138, 122, 63, 'n') / result: (1, 9204993469223510639, -79, 63)

[3]libmpf._normalize1 / x: (1, 16145647295228551757925220564797534333, -137, 124, 63, 'n') / result: (1, 3501029174734300881, -75, 62)

[2]libmpf._normalize. / x: (0, 24300, 0, 15, 63, 'n') / result: (0, 6075, 2, 13)

[2]libmpf._normalize. / x: (0, 728820, 0, 20, 63, 'n') / result: (0, 182205, 2, 18)

[3]libmpf._normalize1 / x: (0, 10150559997193879845229755, -77, 84, 63, 'n') / result: (0, 1210041045808062535, -54, 61)

[3]libmpf._normalize1 / x: (1, 2017495870844043801612195, -77, 81, 63, 'n') / result: (1, 7696135981918502051, -59, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (1, 1488087832713679042759600320448682935, -119, 121, 63, 'n') / result: (1, 2581420897723866741, -60, 62)

[3]libmpf._normalize1 / x: (0, 9464576720994531239570165176777857491, -124, 123, 63, 'n') / result: (0, 8209211714046402187, -64, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize. / x: (0, 220281249939103295232, -71, 68, 63, 'n') / result: (0, 860473632574622247, -63, 60)

[3]libmpf._normalize1 / x: (1, 700519399598626319957, -75, 70, 63, 'n') / result: (1, 5472807809364268125, -68, 63)

[2]libmpf._normalize1 / x: (0, 994970977242336011, -63, 60, 63, 'n') / result: (0, 994970977242336011, -63, 60)

[3]libmpf._normalize1 / x: (1, 154920934300584000317, -68, 68, 63, 'n') / result: (1, 2420639598446625005, -62, 62)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 16380225, 2, 24, 63, 'n') / result: (0, 16380225, 2, 24)

[2]libmpf._normalize1 / x: (1, 1093365, 2, 21, 63, 'n') / result: (1, 1093365, 2, 21)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 30873119768533440143306395931037708717, -145, 125, 63, 'n') / result: (1, 6694540704889825919, -83, 63)

[3]libmpf._normalize1 / x: (1, 11742288941984401279405784083838349843, -141, 124, 63, 'n') / result: (1, 2546203036170400641, -79, 62)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 81961875, 3, 27, 63, 'n') / result: (1, 81961875, 3, 27)

[2]libmpf._normalize1 / x: (1, 734923395, 3, 30, 63, 'n') / result: (1, 734923395, 3, 30)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 22453178013478865557853573367678190557, -149, 125, 63, 'n') / result: (1, 4868756876283509759, -87, 63)

[3]libmpf._normalize1 / x: (1, 8539846503261382749573466643140761123, -145, 123, 63, 'n') / result: (1, 7407136105222983683, -85, 63)

[2]libmpf._normalize. / x: (1, 655695000, 0, 30, 63, 'n') / result: (1, 81961875, 3, 27)

[2]libmpf._normalize. / x: (1, 5879387160, 0, 33, 63, 'n') / result: (1, 734923395, 3, 30)

[3]libmpf._normalize1 / x: (1, 21375658012210870109931417015, -84, 95, 63, 'n') / result: (1, 4976908213508052311, -52, 63)

[3]libmpf._normalize1 / x: (0, 6006574387204964117612254305, -84, 93, 63, 'n') / result: (0, 5594058322911117335, -54, 63)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (1, 17487190874843058241913768989696299333, -119, 124, 63, 'n') / result: (1, 7583860134869413045, -58, 63)

[3]libmpf._normalize1 / x: (0, 19655649945932618462255261714988016005, -121, 124, 63, 'n') / result: (0, 4262139674598946541, -59, 62)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (0, 690299802498335907385, -74, 70, 63, 'n') / result: (0, 1348241801754562319, -65, 61)

[3]libmpf._normalize1 / x: (1, 775898849206990445863, -76, 70, 63, 'n') / result: (1, 3030854879714806429, -68, 62)

[2]libmpf._normalize1 / x: (0, 5328125710723906363, -65, 63, 63, 'n') / result: (0, 5328125710723906363, -65, 63)

[3]libmpf._normalize1 / x: (1, 157951789180298806749, -68, 68, 63, 'n') / result: (1, 4935993411884337711, -63, 63)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 65733296175, 3, 36, 63, 'n') / result: (1, 65733296175, 3, 36)

[2]libmpf._normalize1 / x: (0, 11051185725, 3, 34, 63, 'n') / result: (0, 11051185725, 3, 34)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 16329584009802811313887884230689450077, -153, 124, 63, 'n') / result: (1, 442614261480319069, -88, 59)

[3]libmpf._normalize1 / x: (1, 24843189827669477089973171458950140649, -151, 125, 63, 'n') / result: (1, 5387008076525806315, -89, 63)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 694503246150, 4, 40, 63, 'n') / result: (0, 347251623075, 5, 39)

[2]libmpf._normalize. / x: (0, 2924844770700, 4, 42, 63, 'n') / result: (0, 731211192675, 6, 40)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1484507637254801028535262202789950007, -154, 121, 63, 'n') / result: (1, 5150420497225530985, -96, 63)

[3]libmpf._normalize1 / x: (1, 18067774420123256065739938649049846945, -155, 124, 63, 'n') / result: (1, 7835648111310263731, -94, 63)

[2]libmpf._normalize. / x: (0, 11112051938400, 0, 44, 63, 'n') / result: (0, 347251623075, 5, 39)

[2]libmpf._normalize. / x: (0, 46797516331200, 0, 46, 63, 'n') / result: (0, 731211192675, 6, 40)

[3]libmpf._normalize1 / x: (0, 44047616929641998628836489484525, -91, 106, 63, 'n') / result: (0, 5007634277904116815, -48, 63)

[3]libmpf._normalize1 / x: (1, 9207928163548141730994127920525, -90, 103, 63, 'n') / result: (1, 8374561879052763953, -50, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (1, 6158303195948838447241140826415460415, -113, 123, 63, 'n') / result: (1, 2670738281548862301, -52, 62)

[3]libmpf._normalize1 / x: (0, 10298893314155366680698008260137662273, -115, 123, 63, 'n') / result: (0, 1116608250540368527, -52, 60)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (0, 555649219109797586535, -75, 69, 63, 'n') / result: (0, 4341009524295293645, -68, 62)

[3]libmpf._normalize1 / x: (1, 929244930887791641721, -77, 70, 63, 'n') / result: (1, 7259726022560872201, -70, 63)

[3]libmpf._normalize1 / x: (0, 46966015210086544549, -68, 66, 63, 'n') / result: (0, 5870751901260818069, -65, 63)

[3]libmpf._normalize1 / x: (1, 639066882743756099209, -70, 70, 63, 'n') / result: (1, 4992710021435594525, -63, 63)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 129187253319975, 5, 47, 63, 'n') / result: (0, 129187253319975, 5, 47)

[2]libmpf._normalize. / x: (1, 20744801387100, 6, 45, 63, 'n') / result: (1, 5186200346775, 8, 43)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 17274270688055866514779583850995924955, -162, 124, 63, 'n') / result: (1, 3745760361618567989, -100, 62)

[3]libmpf._normalize1 / x: (1, 26280399156542917914108451986613158393, -160, 125, 63, 'n') / result: (1, 2849326585931004993, -97, 62)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 595945284529725, 8, 50, 63, 'n') / result: (1, 595945284529725, 8, 50)

[2]libmpf._normalize1 / x: (1, 5647467988302075, 6, 53, 63, 'n') / result: (1, 5647467988302075, 6, 53)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12563105954949721101352974303638200767, -166, 124, 63, 'n') / result: (1, 2724189353904413083, -104, 62)

[3]libmpf._normalize1 / x: (1, 9556508784197424695734532225318676579, -163, 123, 63, 'n') / result: (1, 259029689630091363, -98, 58)

[2]libmpf._normalize. / x: (1, 152561992839609600, 0, 58, 63, 'n') / result: (1, 595945284529725, 8, 50)

[2]libmpf._normalize. / x: (1, 361437951251332800, 0, 59, 63, 'n') / result: (1, 5647467988302075, 6, 53)

[3]libmpf._normalize1 / x: (1, 21782322283666793671745994087259425, -96, 115, 63, 'n') / result: (1, 37786305826769523, -37, 56)

[3]libmpf._normalize1 / x: (0, 54902857824840780776971815837932025, -98, 116, 63, 'n') / result: (0, 6095441687485967461, -45, 63)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (1, 211222519114344665914616625156843615, -103, 118, 63, 'n') / result: (1, 2931301300500908451, -47, 62)

[3]libmpf._normalize1 / x: (0, 34073046310689066374093868086672409305, -111, 125, 63, 'n') / result: (0, 7388414166649657529, -49, 63)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (0, 433677910754714720271, -76, 69, 63, 'n') / result: (0, 211756792360700547, -65, 58)

[3]libmpf._normalize1 / x: (1, 546547708868347886641, -77, 69, 63, 'n') / result: (1, 8539807951067935729, -71, 63)

[2]libmpf._normalize. / x: (0, 6082508693621518616, -65, 63, 63, 'n') / result: (0, 760313586702689827, -62, 60)

[3]libmpf._normalize1 / x: (1, 1286673573438580134129, -71, 71, 63, 'n') / result: (1, 5026068646244453649, -63, 63)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 243409044352058325, 7, 58, 63, 'n') / result: (1, 243409044352058325, 7, 58)

[2]libmpf._normalize1 / x: (0, 265367514325419675, 6, 58, 63, 'n') / result: (0, 265367514325419675, 6, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 9136804330872524437652522536095708849, -170, 123, 63, 'n') / result: (1, 7924914484085565333, -110, 63)

[3]libmpf._normalize1 / x: (1, 868773525836129517794048384119879689, -164, 120, 63, 'n') / result: (1, 6028327322300308085, -107, 63)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 14375628588164468625, 7, 64, 63, 'n') / result: (0, 898476786760279289, 11, 60)

[3]libmpf._normalize1 / x: (0, 20579976420058150875, 7, 65, 63, 'n') / result: (0, 5144994105014537719, 9, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 26579794417083707457123490493699365599, -176, 125, 63, 'n') / result: (1, 5763574170244047515, -114, 63)

[3]libmpf._normalize1 / x: (1, 20218729328549923325341278237301776255, -173, 124, 63, 'n') / result: (1, 1096059513145510561, -109, 60)

[2]libmpf._normalize. / x: (0, 1840080459285051983872, 0, 71, 63, 'n') / result: (0, 898476786760279289, 11, 60)

[2]libmpf._normalize. / x: (0, 2634236981767443312128, 0, 72, 63, 'n') / result: (0, 5144994105014537719, 9, 63)

[3]libmpf._normalize1 / x: (0, 39935320270294633670996636957992386037, -103, 125, 63, 'n') / result: (0, 4329796099595784397, -40, 62)

[3]libmpf._normalize1 / x: (1, 155705910901753526693870924413156822797, -105, 127, 63, 'n') / result: (1, 1055104292928222265, -38, 60)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (1, 5054085404170987521221711467070523607, -102, 122, 63, 'n') / result: (1, 4383720300103570723, -42, 62)

[3]libmpf._normalize1 / x: (0, 1231602385910161251694835669261178715, -100, 120, 63, 'n') / result: (0, 4272979143814807825, -42, 62)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (0, 628905968539767438543, -78, 70, 63, 'n') / result: (0, 2456663939608466557, -70, 62)

[3]libmpf._normalize1 / x: (1, 613018601329922247905, -78, 70, 63, 'n') / result: (1, 2394603911445008781, -70, 62)

[3]libmpf._normalize1 / x: (0, 197096942135497062269, -70, 68, 63, 'n') / result: (0, 1539819860433570799, -63, 61)

[3]libmpf._normalize1 / x: (1, 645731390630735075853, -70, 70, 63, 'n') / result: (1, 1261194122325654445, -61, 61)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 211758245416928052997, 10, 68, 63, 'n') / result: (0, 827180646159875207, 18, 60)

[3]libmpf._normalize1 / x: (1, 380046578388860458949, 9, 69, 63, 'n') / result: (1, 5938227787325944671, 15, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19330759576060878150940170674322010545, -180, 124, 63, 'n') / result: (1, 8383380611264069113, -119, 63)

[3]libmpf._normalize1 / x: (1, 3676132605190895150366955449322794883, -175, 122, 63, 'n') / result: (1, 3188536765514212541, -115, 62)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 306924921445341520131, 16, 69, 63, 'n') / result: (1, 1198925474395865313, 24, 61)

[3]libmpf._normalize1 / x: (1, 131077832946799703247, 17, 67, 63, 'n') / result: (1, 8192364559174981453, 21, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 28117468474270368220464053744817612939, -185, 125, 63, 'n') / result: (1, 6097004080919322991, -123, 63)

[3]libmpf._normalize1 / x: (1, 10694203942373513164398965537307476823, -181, 124, 63, 'n') / result: (1, 289866978683110231, -116, 59)

[2]libmpf._normalize. / x: (1, 20114631651841901863108608, 0, 85, 63, 'n') / result: (1, 1198925474395865313, 24, 61)

[2]libmpf._normalize. / x: (1, 17180633720002930704121856, 0, 84, 63, 'n') / result: (1, 8192364559174981453, 21, 63)

[3]libmpf._normalize1 / x: (1, 30685281898508547393463122682892419105, -99, 125, 63, 'n') / result: (1, 6653809859538618213, -37, 63)

[3]libmpf._normalize1 / x: (0, 405818478797317062865223000171858404195, -102, 129, 63, 'n') / result: (0, 5499865954335172227, -36, 63)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (1, 35799495548259971961202091945474884215, -99, 125, 63, 'n') / result: (1, 7762778169461721249, -37, 63)

[3]libmpf._normalize1 / x: (0, 29590930745637702500445728218617689985, -98, 125, 63, 'n') / result: (0, 1604127570014425233, -34, 61)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (0, 783246814653678800643, -80, 70, 63, 'n') / result: (0, 3059557869740932815, -72, 62)

[3]libmpf._normalize1 / x: (1, 647411420027253792555, -79, 70, 63, 'n') / result: (1, 2528950859481460127, -71, 62)

[3]libmpf._normalize1 / x: (0, 791447326411729181903, -72, 70, 63, 'n') / result: (0, 3091591118795817117, -64, 62)

[3]libmpf._normalize1 / x: (1, 1293991732120951611807, -71, 71, 63, 'n') / result: (1, 2527327601798733617, -62, 62)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 306312280494289169109, 22, 69, 63, 'n') / result: (1, 4786129382723268267, 28, 63)

[3]libmpf._normalize1 / x: (0, 969727080834297784249, 21, 70, 63, 'n') / result: (0, 7575992819017951439, 28, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 20449067981287540523059142686790848173, -189, 124, 63, 'n') / result: (1, 8868369572246287987, -128, 63)

[3]libmpf._normalize1 / x: (1, 972200358397592105854451412482497893, -182, 120, 63, 'n') / result: (1, 6745995140261474467, -125, 63)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 374422582534870692624, 29, 69, 63, 'n') / result: (0, 1462588213026838643, 37, 61)

[2]libmpf._normalize. / x: (0, 162343872489421411942, 29, 68, 63, 'n') / result: (0, 5073246015294419123, 34, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 29744098881872786215663657859690978361, -194, 125, 63, 'n') / result: (1, 6449723325270027627, -132, 63)

[3]libmpf._normalize1 / x: (1, 22625753795434870827463046823951513801, -191, 125, 63, 'n') / result: (1, 4906178283826526885, -129, 63)

[2]libmpf._normalize. / x: (0, 201016593358891300542528618496, 0, 98, 63, 'n') / result: (0, 1462588213026838643, 37, 61)

[2]libmpf._normalize. / x: (0, 87157702881007383778408005632, 0, 97, 63, 'n') / result: (0, 5073246015294419123, 34, 63)

[2]libmpf._normalize. / x: (0, 15456960115922729907012208703536431694, -95, 124, 63, 'n') / result: (0, 6703387895082087289, -34, 63)

[3]libmpf._normalize1 / x: (1, 491967019011384641618321379052897802641, -98, 129, 63, 'n') / result: (1, 6667396385042008629, -32, 63)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (1, 54811592881659327521951874392797005105, -94, 126, 63, 'n') / result: (1, 1485671201992151331, -29, 61)

[3]libmpf._normalize1 / x: (0, 54517301095716245365973040855845691405, -92, 126, 63, 'n') / result: (0, 5910777628602192453, -29, 63)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (0, 639577064770352831149, -82, 70, 63, 'n') / result: (0, 4996695818518381493, -75, 63)

[3]libmpf._normalize1 / x: (1, 636143078149203510537, -80, 70, 63, 'n') / result: (1, 2484933899020326213, -72, 62)

[3]libmpf._normalize1 / x: (0, 6336575307112351837109, -75, 73, 63, 'n') / result: (0, 6188061823351906091, -65, 63)

[3]libmpf._normalize1 / x: (1, 2590468398140923550021, -72, 72, 63, 'n') / result: (1, 5059508590118991309, -63, 63)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 140540777906638541955, 35, 67, 63, 'n') / result: (0, 1097974827395613609, 42, 60)

[3]libmpf._normalize1 / x: (1, 1129162203608740109805, 34, 70, 63, 'n') / result: (1, 2205394928923320527, 43, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 21632071914089299066242110576861365281, -198, 125, 63, 'n') / result: (1, 586338484115457057, -133, 60)

[3]libmpf._normalize1 / x: (1, 16455093669407178783304583738514992655, -195, 124, 63, 'n') / result: (1, 7136259321929493651, -134, 63)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 103634671111131878151, 44, 67, 63, 'n') / result: (1, 404822934027858899, 52, 59)

[3]libmpf._normalize1 / x: (1, 14122548370029483973, 43, 64, 63, 'n') / result: (1, 3530637092507370993, 45, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1966551992189936278749282779714669571, -199, 121, 63, 'n') / result: (1, 3411423907580841059, -140, 62)

[3]libmpf._normalize1 / x: (1, 23934681700955896412384299389471552153, -200, 125, 63, 'n') / result: (1, 1297501694896271573, -136, 61)

[2]libmpf._normalize. / x: (1, 1823160414838896222910616283643904, 0, 111, 63, 'n') / result: (1, 404822934027858899, 52, 59)

[2]libmpf._normalize. / x: (1, 124223249173411307961336176050176, 0, 107, 63, 'n') / result: (1, 3530637092507370993, 45, 62)

[3]libmpf._normalize1 / x: (0, 6467173472245317238738526675191190339, -91, 123, 63, 'n') / result: (0, 5609378822759196851, -31, 63)

[3]libmpf._normalize1 / x: (0, 1087773791120061625713822409348417605683, -95, 130, 63, 'n') / result: (0, 1842760480476818947, -26, 61)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (0, 11109629491971543363745125904669123099, -86, 124, 63, 'n') / result: (0, 2409016886140915651, -24, 62)

[3]libmpf._normalize1 / x: (0, 3649670815150038130405535842998996203, -81, 122, 63, 'n') / result: (0, 395698102664261321, -18, 59)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (1, 433809005948532472371, -84, 69, 63, 'n') / result: (1, 6778265717945819881, -78, 63)

[3]libmpf._normalize1 / x: (1, 570049638290372491379, -81, 69, 63, 'n') / result: (1, 4453512799143535089, -74, 62)

[3]libmpf._normalize1 / x: (0, 50685824191180868877591, -78, 76, 63, 'n') / result: (0, 773404299792188551, -62, 60)

[3]libmpf._normalize1 / x: (1, 10366327105362837735921, -74, 74, 63, 'n') / result: (1, 5061683156915448113, -63, 63)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 281568683059478787427, 46, 68, 63, 'n') / result: (0, 8799021345608712107, 51, 63)

[3]libmpf._normalize1 / x: (0, 4723581030573559823361, 45, 73, 63, 'n') / result: (0, 4612872100169492015, 55, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11441757045468720167573459215426003977, -206, 124, 63, 'n') / result: (1, 4962071138299405177, -145, 63)

[3]libmpf._normalize1 / x: (1, 4351760309264708438920232022444572319, -202, 122, 63, 'n') / result: (1, 7549100770305580061, -143, 63)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 3242076720011555841837, 52, 72, 63, 'n') / result: (0, 1583045273443142501, 63, 61)

[3]libmpf._normalize1 / x: (1, 1060209542976798894975, 52, 70, 63, 'n') / result: (1, 8282887054506241367, 59, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 16642555702499956608294291622787057931, -211, 124, 63, 'n') / result: (1, 7217558019344589349, -150, 63)

[3]libmpf._normalize1 / x: (1, 25319332708449212735230990542591403383, -209, 125, 63, 'n') / result: (1, 5490255105676785499, -147, 63)

[2]libmpf._normalize. / x: (0, 14601015508150602782394445109351415808, 0, 124, 63, 'n') / result: (0, 1583045273443142501, 63, 61)

[2]libmpf._normalize. / x: (1, 4774759302684955367902657857345028096, 0, 122, 63, 'n') / result: (1, 8282887054506241367, 59, 63)

[3]libmpf._normalize1 / x: (1, 68326605157397245645609705261047180831, -88, 126, 63, 'n') / result: (1, 925998171877617067, -22, 60)

[3]libmpf._normalize1 / x: (1, 1052707048681378657349726154883334903789, -91, 130, 63, 'n') / result: (1, 7133420432319715101, -24, 63)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (0, 2206620067830087457808083115938190591, -74, 121, 63, 'n') / result: (0, 7655751268452774323, -16, 63)

[3]libmpf._normalize1 / x: (0, 16998682239629961303369575977286626473, -76, 124, 63, 'n') / result: (0, 460750205339939103, -11, 59)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (1, 928758717722244412329, -84, 70, 63, 'n') / result: (1, 7255927482205034471, -77, 63)

[3]libmpf._normalize1 / x: (1, 894335784737721986251, -83, 70, 63, 'n') / result: (1, 3493499159131726509, -75, 62)

[3]libmpf._normalize1 / x: (0, 25335656168108229404697, -77, 75, 63, 'n') / result: (0, 6185462931667048195, -65, 63)

[3]libmpf._normalize1 / x: (1, 20736147709884807197357, -75, 75, 63, 'n') / result: (1, 5062536061983595507, -63, 63)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 613352799016138521667, 60, 70, 63, 'n') / result: (1, 4791818742313582201, 67, 63)

[3]libmpf._normalize1 / x: (1, 2122210339722506615467, 59, 71, 63, 'n') / result: (1, 8289884139541041467, 67, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 24207353749090845977835121840020296847, -216, 125, 63, 'n') / result: (1, 5249133104977883163, -154, 63)

[3]libmpf._normalize1 / x: (1, 18414060151599427444109261618970765297, -213, 124, 63, 'n') / result: (1, 499114100516071409, -148, 59)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 325126598856211044005, 68, 69, 63, 'n') / result: (1, 5080103107128297563, 74, 63)

[3]libmpf._normalize1 / x: (0, 298530684799521613715, 68, 69, 63, 'n') / result: (0, 2332270974996262607, 75, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 17605348181156978893275902562555415089, -220, 124, 63, 'n') / result: (1, 7635102698149648237, -159, 63)

[3]libmpf._normalize1 / x: (1, 1674005468327220676737205601724615027, -214, 121, 63, 'n') / result: (1, 2903936584820779107, -155, 62)

[2]libmpf._normalize. / x: (1, 95960434570498460149719141124255244091392, 0, 137, 63, 'n') / result: (1, 5080103107128297563, 74, 63)

[2]libmpf._normalize. / x: (0, 88110706250336471208114733133326792523776, 0, 137, 63, 'n') / result: (0, 2332270974996262607, 75, 62)

[3]libmpf._normalize1 / x: (0, 255515653260346493377263016482264808799, -85, 128, 63, 'n') / result: (0, 6925765659223013305, -20, 63)

[3]libmpf._normalize1 / x: (0, 100211249725602540322326798134788756069, -84, 127, 63, 'n') / result: (0, 5432462732999284215, -20, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (0, 6035554510322749458320701595356934885, -67, 123, 63, 'n') / result: (0, 327188065612330493, -3, 59)

[3]libmpf._normalize1 / x: (0, 4734194970436306471651959602021119755, -67, 122, 63, 'n') / result: (0, 4106259577533593531, -7, 62)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (1, 351909114125390133029, -83, 69, 63, 'n') / result: (1, 5498579908209220829, -77, 63)

[3]libmpf._normalize1 / x: (1, 552064058171857668519, -84, 69, 63, 'n') / result: (1, 8626000908935276071, -78, 63)

[3]libmpf._normalize1 / x: (0, 25330157588200020185891, -77, 75, 63, 'n') / result: (0, 6184120504931645553, -65, 63)

[3]libmpf._normalize1 / x: (1, 165897807679987392849447, -78, 78, 63, 'n') / result: (1, 1265699826660060065, -61, 61)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 526490940749021518083, 74, 69, 63, 'n') / result: (0, 2056605237300865305, 82, 61)

[2]libmpf._normalize. / x: (0, 179626949345851875588, 75, 68, 63, 'n') / result: (0, 701667770882233889, 83, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 25607779172591969299005498866630859111, -225, 125, 63, 'n') / result: (1, 5552801962290653263, -163, 63)

[3]libmpf._normalize1 / x: (1, 9739668179358374846775919270756595721, -221, 123, 63, 'n') / result: (1, 4223907759739315065, -160, 62)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 40527441769091531655, 83, 66, 63, 'n') / result: (0, 5065930221136441457, 86, 63)

[3]libmpf._normalize1 / x: (1, 107983926637948084283, 83, 67, 63, 'n') / result: (1, 1687248853717938817, 89, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 18623839398248704943816557320836845389, -229, 124, 63, 'n') / result: (1, 8076802854240950201, -168, 63)

[3]libmpf._normalize1 / x: (1, 14166790079066727050770597157813373195, -226, 124, 63, 'n') / result: (1, 383991614521755915, -161, 59)

[2]libmpf._normalize. / x: (0, 391957366060665095045468478518816908821659648, 0, 149, 63, 'n') / result: (0, 5065930221136441457, 86, 63)

[2]libmpf._normalize. / x: (1, 1044356456127899007906925738802363555857301504, 0, 150, 63, 'n') / result: (1, 1687248853717938817, 89, 61)

[3]libmpf._normalize1 / x: (1, 704355276983132794104058514650409899177, -82, 130, 63, 'n') / result: (1, 4772897009417136205, -15, 63)

[3]libmpf._normalize1 / x: (1, 17496819237175990335738866530593638263, -79, 124, 63, 'n') / result: (1, 1897008942853237519, -16, 61)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (0, 29079083520444130321184627313052405735, -61, 125, 63, 'n') / result: (0, 6305521105350591297, 1, 63)

[3]libmpf._normalize1 / x: (0, 11557609849828968433299338721982217773, -62, 124, 63, 'n') / result: (0, 5012314283169772893, -1, 63)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (1, 786312067114146001449, -85, 70, 63, 'n') / result: (1, 1535765756082316409, -76, 61)

[3]libmpf._normalize1 / x: (1, 625046390167596979953, -87, 70, 63, 'n') / result: (1, 2441587461592175703, -79, 62)

[3]libmpf._normalize1 / x: (0, 12663543028343927776135, -76, 74, 63, 'n') / result: (0, 1545842654827139621, -63, 61)

[3]libmpf._normalize1 / x: (1, 331798056947436377855063, -79, 79, 63, 'n') / result: (1, 1265709140577073585, -61, 61)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 1331335569763054101751, 86, 71, 63, 'n') / result: (1, 5200529569386930085, 94, 63)

[3]libmpf._normalize1 / x: (1, 72739965409089494401, 87, 66, 63, 'n') / result: (1, 568280979758511675, 94, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 27089220942907207191920616139748281803, -234, 125, 63, 'n') / result: (1, 5874038439447963783, -172, 63)

[3]libmpf._normalize1 / x: (1, 1287890007187884277342781559801215745, -227, 120, 63, 'n') / result: (1, 8936532119779046749, -170, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 36833710743510135645, 95, 65, 63, 'n') / result: (0, 9208427685877533911, 97, 63)

[3]libmpf._normalize1 / x: (0, 240843202379513993925, 95, 68, 63, 'n') / result: (0, 3763175037179906155, 101, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 19701251594841605232012245132520200949, -238, 124, 63, 'n') / result: (1, 8544055911924310957, -177, 63)

[3]libmpf._normalize1 / x: (1, 29972712894554397726945284167378549047, -236, 125, 63, 'n') / result: (1, 6499296087112033999, -174, 63)

[2]libmpf._normalize. / x: (0, 1459133610395112666034124733989148806497479688192, 0, 160, 63, 'n') / result: (0, 9208427685877533911, 97, 63)

[2]libmpf._normalize. / x: (0, 9540782189289995063584693628700141035534742978560, 0, 163, 63, 'n') / result: (0, 3763175037179906155, 101, 62)

[3]libmpf._normalize1 / x: (0, 3051945244656364588039900862235562209333, -80, 132, 63, 'n') / result: (0, 1292549087720013605, -9, 61)

[3]libmpf._normalize1 / x: (1, 124153853875323910035177885893903920759, -77, 127, 63, 'n') / result: (1, 6730393904703702351, -13, 63)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (0, 8103624615789107335725520275385581495, -51, 123, 63, 'n') / result: (0, 878596741344556135, 12, 60)

[3]libmpf._normalize1 / x: (1, 42196142675184987424053399059770147269, -55, 125, 63, 'n') / result: (1, 9149829911788773647, 7, 63)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (1, 690414869814433875443, -86, 70, 63, 'n') / result: (1, 1348466542606316163, -77, 61)

[3]libmpf._normalize1 / x: (0, 898759682642402643443, -88, 70, 63, 'n') / result: (0, 1755390005160942663, -79, 61)

[3]libmpf._normalize1 / x: (0, 25325737590145249234301, -77, 75, 63, 'n') / result: (0, 6183041403844054989, -65, 63)

[3]libmpf._normalize1 / x: (1, 331796301557431216923577, -79, 79, 63, 'n') / result: (1, 158212805536952599, -58, 58)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 5188761361392126515425, 97, 73, 63, 'n') / result: (0, 2533574883492249275, 108, 62)

[3]libmpf._normalize1 / x: (1, 1167014253300470256995, 98, 70, 63, 'n') / result: (1, 9117298853909923883, 105, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 28656365956133243973531088059306911271, -243, 125, 63, 'n') / result: (1, 3106929422517931257, -180, 62)

[3]libmpf._normalize1 / x: (1, 21798336650585016527772764812289710797, -240, 125, 63, 'n') / result: (1, 2363380395313466909, -177, 62)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 673770236309140499335, 106, 70, 63, 'n') / result: (1, 5263829971165160151, 113, 63)

[3]libmpf._normalize1 / x: (1, 793562072956380728521, 106, 70, 63, 'n') / result: (1, 3099851847485862221, 114, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 10420496711321179626433672615389132171, -246, 123, 63, 'n') / result: (1, 9038340138233981839, -186, 63)

[3]libmpf._normalize1 / x: (1, 7926667872940006011013901786636401527, -243, 123, 63, 'n') / result: (1, 3437644211365042777, -182, 62)

[2]libmpf._normalize. / x: (1, 54662735646284666703140238070282586124272305535188992, 0, 176, 63, 'n') / result: (1, 5263829971165160151, 113, 63)

[2]libmpf._normalize. / x: (1, 64381404038496896087623772397638498271458140161572864, 0, 176, 63, 'n') / result: (1, 3099851847485862221, 114, 62)

[3]libmpf._normalize1 / x: (1, 293421722597947156005072329837722789255, -73, 128, 63, 'n') / result: (1, 994151465922291677, -5, 60)

[3]libmpf._normalize1 / x: (0, 172778912415596094561928382852336439035, -72, 128, 63, 'n') / result: (0, 585397725627099939, -4, 60)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (0, 7459795087385360254927833215572726929, -43, 123, 63, 'n') / result: (0, 6470340832031920785, 17, 63)

[3]libmpf._normalize1 / x: (1, 4392637568308879438671082396334049903, -42, 122, 63, 'n') / result: (1, 7620011511203088753, 17, 63)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (1, 430433322066263513031, -87, 69, 63, 'n') / result: (1, 6725520657285367391, -81, 63)

[3]libmpf._normalize1 / x: (0, 506914079813675779071, -87, 69, 63, 'n') / result: (0, 495033281068042753, -77, 59)

[3]libmpf._normalize1 / x: (0, 405205075921666702391713, -81, 79, 63, 'n') / result: (0, 6182938780543009985, -65, 63)

[3]libmpf._normalize1 / x: (1, 82948580356076736181759, -77, 77, 63, 'n') / result: (1, 2531389781374412115, -62, 62)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 415849923325995875703, 113, 69, 63, 'n') / result: (1, 3248827525984342779, 120, 62)

[2]libmpf._normalize. / x: (0, 320568348584550486762, 114, 69, 63, 'n') / result: (0, 1252220111658400339, 122, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 30314172251116158914786117366562562317, -252, 125, 63, 'n') / result: (1, 821667285293998349, -187, 60)

[3]libmpf._normalize1 / x: (1, 11529698724276372380571298999093090731, -248, 124, 63, 'n') / result: (1, 5000209761985516767, -187, 63)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 135441602731146429963, 122, 67, 63, 'n') / result: (0, 8465100170696651873, 126, 63)

[3]libmpf._normalize1 / x: (0, 76072912416425006071, 121, 67, 63, 'n') / result: (0, 4754557026026562879, 125, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 2755833841010559901344192487869323847, -253, 122, 63, 'n') / result: (1, 4780609659892354031, -194, 63)

[3]libmpf._normalize1 / x: (1, 16770470871674723464173686484111400701, -253, 124, 63, 'n') / result: (1, 3636516190534921285, -191, 62)

[2]libmpf._normalize. / x: (0, 720131080576874227971924050408461584341190647933170614272, 0, 189, 63, 'n') / result: (0, 8465100170696651873, 126, 63)

[2]libmpf._normalize. / x: (0, 202236489809612104663973315550766113251307631201619017728, 0, 188, 63, 'n') / result: (0, 4754557026026562879, 125, 63)

[3]libmpf._normalize1 / x: (0, 28691754767879815170853487193396667997, -68, 125, 63, 'n') / result: (0, 97211446411739455, 0, 57)

[3]libmpf._normalize1 / x: (1, 515265262450944455032449963320795684129, -69, 129, 63, 'n') / result: (1, 3491573230972672445, -2, 62)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (0, 502344072651003415660133634399511205, -33, 119, 63, 'n') / result: (0, 1742856111690988723, 25, 61)

[3]libmpf._normalize1 / x: (1, 18042845586075157115494956430667315695, -35, 124, 63, 'n') / result: (1, 3912418476448635967, 27, 62)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (1, 545859604003134371451, -91, 69, 63, 'n') / result: (1, 4264528156274487277, -84, 62)

[3]libmpf._normalize1 / x: (0, 612681444533227674507, -88, 70, 63, 'n') / result: (0, 4786573785415841207, -81, 63)

[3]libmpf._normalize1 / x: (0, 3241636342845177344528403, -84, 82, 63, 'n') / result: (0, 1545732661650265381, -63, 61)

[3]libmpf._normalize1 / x: (1, 1327172499123442363107913, -81, 81, 63, 'n') / result: (1, 1265690325854723323, -61, 61)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (1, 31532838779007574762, 126, 65, 63, 'n') / result: (1, 3941604847375946845, 129, 62)

[3]libmpf._normalize1 / x: (1, 1661600184480167660631, 125, 71, 63, 'n') / result: (1, 1622656430156413731, 135, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 16033942347697803063890735142124789293, -260, 124, 63, 'n') / result: (1, 3476807025376257477, -198, 62)

[3]libmpf._normalize1 / x: (1, 12196706088490707973639594400449455855, -257, 124, 63, 'n') / result: (1, 5289478095323521869, -196, 63)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 4614126446139832342605, 130, 72, 63, 'n') / result: (1, 2252991428779215011, 141, 61)

[3]libmpf._normalize1 / x: (0, 1735122391082074789785, 130, 71, 63, 'n') / result: (0, 847227730020544331, 141, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 11661048980143856773433811606277374831, -264, 124, 63, 'n') / result: (1, 5057173855092738149, -203, 63)

[3]libmpf._normalize1 / x: (1, 17740663401441029779534505176294918407, -262, 124, 63, 'n') / result: (1, 480861645029411079, -197, 59)

[2]libmpf._normalize. / x: (1, 2252991428779215011, 141, 61, 63, 'n') / result: (1, 2252991428779215011, 141, 61)

[2]libmpf._normalize. / x: (0, 847227730020544331, 141, 60, 63, 'n') / result: (0, 847227730020544331, 141, 60)

[3]libmpf._normalize1 / x: (0, 37467325827591892575787988475083916175, -62, 125, 63, 'n') / result: (0, 1015553901487434507, 3, 60)

[3]libmpf._normalize1 / x: (0, 65051560613946475442298050501547056297, -62, 126, 63, 'n') / result: (0, 881613041765165541, 4, 60)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (1, 8241738078626898940894450467321004401, -26, 123, 63, 'n') / result: (1, 893571032990379099, 37, 60)

[3]libmpf._normalize1 / x: (1, 7154739661073474086321087815640596063, -25, 123, 63, 'n') / result: (1, 1551436856820812457, 37, 61)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (0, 577785693348013118763, -90, 69, 63, 'n') / result: (0, 9027901458562704981, -84, 63)

[3]libmpf._normalize1 / x: (0, 501581847950036793549, -89, 69, 63, 'n') / result: (0, 7837216374219324899, -83, 63)

[3]libmpf._normalize1 / x: (0, 3241645370746635906999893, -84, 82, 63, 'n') / result: (0, 386434241622285355, -61, 59)

[3]libmpf._normalize1 / x: (1, 5308682159277395233227293, -83, 83, 63, 'n') / result: (1, 5062753829266925081, -63, 63)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 146093229994004655131, 141, 67, 63, 'n') / result: (0, 4565413437312645473, 146, 62)

[3]libmpf._normalize1 / x: (0, 176505168959492476729, 141, 68, 63, 'n') / result: (0, 2757893264992069949, 147, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 16961525789300155308947150906915303247, -269, 124, 63, 'n') / result: (1, 3677944621885627745, -207, 62)

[3]libmpf._normalize1 / x: (1, 1612787581949184525412227743299538037, -263, 121, 63, 'n') / result: (1, 2797740480171119005, -204, 62)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 87581889426141983921, 148, 67, 63, 'n') / result: (0, 5473868089133873995, 152, 63)

[3]libmpf._normalize1 / x: (1, 293696189158815284653, 147, 68, 63, 'n') / result: (1, 9178005911212977645, 152, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 12335655119491022043785369787196727235, -273, 124, 63, 'n') / result: (1, 5349737631833640357, -212, 63)

[3]libmpf._normalize1 / x: (1, 9383491385886164511184420191202113015, -270, 123, 63, 'n') / result: (1, 4069440698430718553, -209, 62)

[2]libmpf._normalize. / x: (0, 5473868089133873995, 152, 63, 63, 'n') / result: (0, 5473868089133873995, 152, 63)

[2]libmpf._normalize. / x: (1, 9178005911212977645, 152, 63, 63, 'n') / result: (1, 9178005911212977645, 152, 63)

[3]libmpf._normalize1 / x: (1, 328078564392355210854502647711590797695, -60, 128, 63, 'n') / result: (1, 4446293653251462219, 6, 62)

[3]libmpf._normalize1 / x: (1, 129104729029692932099181769941275014615, -60, 127, 63, 'n') / result: (1, 3499390692303636197, 5, 62)

[3]libmpf._normalize1 / x: (0, 15478498771225430759843386699, -55, 94, 63, 'n') / result: (0, 7207737663400094379, -24, 63)

[8]gammazeta.mpf_bernoulli / n: 34 / prec: 63 / result: (0, 7207737663400094379, -24, 63)

[3]libmpf._normalize1 / x: (1, 32047718227077363743757139304352767001, -18, 125, 63, 'n') / result: (1, 868655143125014407, 47, 60)

[3]libmpf._normalize1 / x: (1, 25222690091868649394882591014680636663, -19, 125, 63, 'n') / result: (1, 2734649539353259709, 44, 62)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (0, 512616047066298463649, -90, 69, 63, 'n') / result: (0, 8009625735410913495, -84, 63)

[3]libmpf._normalize1 / x: (0, 403446997369931891125, -91, 69, 63, 'n') / result: (0, 6303859333905185799, -85, 63)

[3]libmpf._normalize1 / x: (0, 3241653380372371318149335, -84, 82, 63, 'n') / result: (0, 386435196444078841, -61, 59)

[3]libmpf._normalize1 / x: (1, 21234722333250247029752825, -85, 85, 63, 'n') / result: (1, 5062752326309739835, -63, 63)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 1006658178950585829885, 152, 70, 63, 'n') / result: (1, 1966129255762862949, 161, 61)

[3]libmpf._normalize1 / x: (1, 189773932952020397265, 152, 68, 63, 'n') / result: (1, 5930435404750637415, 157, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 17942771082896032065822144624616179471, -278, 124, 63, 'n') / result: (1, 3890718277697192987, -216, 62)

[3]libmpf._normalize1 / x: (1, 13648714743107148380819325769370489259, -275, 124, 63, 'n') / result: (1, 1479796617611170383, -212, 61)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 267917564353720038453, 158, 68, 63, 'n') / result: (0, 4186211943026875601, 164, 62)

[3]libmpf._normalize1 / x: (0, 1516430466030022159335, 158, 71, 63, 'n') / result: (0, 1480889126982443515, 168, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 13049288060288023320902828224079693361, -282, 124, 63, 'n') / result: (1, 2829613292870685809, -220, 62)

[3]libmpf._normalize1 / x: (1, 4963168997493508502421023322311740749, -278, 122, 63, 'n') / result: (1, 8609725775192264047, -219, 63)

[2]libmpf._normalize. / x: (0, 4186211943026875601, 164, 62, 63, 'n') / result: (0, 4186211943026875601, 164, 62)

[2]libmpf._normalize. / x: (0, 1480889126982443515, 168, 61, 63, 'n') / result: (0, 1480889126982443515, 168, 61)

[3]libmpf._normalize1 / x: (0, 396156216216283967243169394037170720351, -56, 129, 63, 'n') / result: (0, 1342229469579163433, 12, 61)

[3]libmpf._normalize1 / x: (1, 69564885338113677775408107833050446327, -55, 126, 63, 'n') / result: (1, 7542239981228786411, 8, 63)

[3]libmpf._normalize1 / x: (1, 1929743914758391793175373481, -47, 91, 63, 'n') / result: (1, 1797214071041337953, -17, 61)

[8]gammazeta.mpf_bernoulli / n: 36 / prec: 63 / result: (1, 1797214071041337953, -17, 61)

[3]libmpf._normalize1 / x: (1, 2412273689294023988924944130772672649, -5, 121, 63, 'n') / result: (1, 1046156949824881411, 56, 60)

[3]libmpf._normalize1 / x: (0, 13555019821434931569961545635904956683, -9, 124, 63, 'n') / result: (0, 1469638193848382719, 54, 61)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (0, 1003462283672343570263, -92, 70, 63, 'n') / result: (0, 7839549091190184143, -85, 63)

[3]libmpf._normalize1 / x: (1, 704830426456591570147, -93, 70, 63, 'n') / result: (1, 2753243853346060821, -85, 62)

[3]libmpf._normalize1 / x: (0, 6483314600293833826670799, -85, 83, 63, 'n') / result: (0, 3091485309740940965, -64, 62)

[3]libmpf._normalize1 / x: (1, 21234725086494100374960661, -85, 85, 63, 'n') / result: (1, 2531376491367113635, -62, 62)

[1]ctx_mp_python.convert / x: -35 / result: -35.0

[2]libmpf._normalize1 / x: (1, 35, 0, 6, 63, 'n') / result: (1, 35, 0, 6)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 1985962924848778015565, 164, 71, 63, 'n') / result: (0, 7757667675190539123, 172, 63)

[3]libmpf._normalize1 / x: (1, 603028492991293586245, 165, 70, 63, 'n') / result: (1, 4711160101494481143, 172, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 9490391316573107870662226017861738227, -286, 123, 63, 'n') / result: (1, 2057900576633226043, -224, 61)

[3]libmpf._normalize1 / x: (1, 28876619621780413106519569087971578541, -285, 125, 63, 'n') / result: (1, 6261618745594373853, -223, 63)

[1]ctx_mp_python.convert / x: -36 / result: -36.0

[2]libmpf._normalize1 / x: (1, 9, 2, 4, 63, 'n') / result: (1, 9, 2, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 351640222720681355649, 173, 69, 63, 'n') / result: (1, 2747189240005323091, 180, 62)

[3]libmpf._normalize1 / x: (1, 264294163556673599961, 173, 68, 63, 'n') / result: (1, 8259192611146049999, 178, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 6902102775689532997150160146440099729, -290, 123, 63, 'n') / result: (1, 1496654964824164395, -228, 61)

[3]libmpf._normalize1 / x: (1, 21001177906749391352330384270854815159, -289, 124, 63, 'n') / result: (1, 9107809084500907423, -228, 63)

[2]libmpf._normalize. / x: (1, 2747189240005323091, 180, 62, 63, 'n') / result: (1, 2747189240005323091, 180, 62)

[2]libmpf._normalize. / x: (1, 8259192611146049999, 178, 63, 63, 'n') / result: (1, 8259192611146049999, 178, 63)

[3]libmpf._normalize1 / x: (1, 58776771832976805724486317393334062797, -50, 126, 63, 'n') / result: (1, 6372590371299825733, 13, 63)

[3]libmpf._normalize1 / x: (0, 112444662094765291298625813749246403577, -50, 127, 63, 'n') / result: (0, 3047818673188574517, 15, 62)

[3]libmpf._normalize1 / x: (0, 17181666013769096711720228171, -45, 94, 63, 'n') / result: (0, 8000836714063350443, -14, 63)

[8]gammazeta.mpf_bernoulli / n: 38 / prec: 63 / result: (0, 8000836714063350443, -14, 63)

[3]libmpf._normalize1 / x: (1, 50986055006382244049467739808008349719, -1, 126, 63, 'n') / result: (1, 690989895054813233, 65, 60)

[3]libmpf._normalize1 / x: (0, 24385099538254995104068585556190461031, 1, 125, 63, 'n') / result: (0, 2643837789565133673, 64, 62)

[1]ctx_mp_python.convert / x: -523022617466601111760007224100074291200000000 / result: -5.23022617466601112e+44

[3]libmpf._normalize1 / x: (0, 482714718865005325161, -93, 69, 63, 'n') / result: (0, 3771208741132854103, -86, 62)

[3]libmpf._normalize1 / x: (1, 461735918443993184771, -92, 69, 63, 'n') / result: (1, 901827965710924189, -83, 60)

[3]libmpf._normalize1 / x: (0, 12966632971796408786117463, -86, 84, 63, 'n') / result: (0, 6182972417734341043, -65, 63)

[3]libmpf._normalize1 / x: (1, 5308682173451490804791709, -83, 83, 63, 'n') / result: (1, 5062753842784395985, -63, 63)

[1]ctx_mp_python.convert / x: -37 / result: -37.0

[2]libmpf._normalize1 / x: (1, 37, 0, 6, 63, 'n') / result: (1, 37, 0, 6)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 168371663741178341221, 179, 68, 63, 'n') / result: (1, 5261614491911823163, 184, 63)

[3]libmpf._normalize1 / x: (0, 1294578253014320162723, 178, 71, 63, 'n') / result: (0, 632118287604648517, 189, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 5019711109592387634595930421769817185, -294, 122, 63, 'n') / result: (1, 8707810704431501935, -235, 63)

[3]libmpf._normalize1 / x: (1, 30547167864362751059459628697582999869, -294, 125, 63, 'n') / result: (1, 1655965288091074077, -230, 61)

[1]ctx_mp_python.convert / x: -38 / result: -38.0

[2]libmpf._normalize1 / x: (1, 19, 1, 5, 63, 'n') / result: (1, 19, 1, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 1010221009497018504577, 185, 70, 63, 'n') / result: (0, 7892351636695457067, 192, 63)

[3]libmpf._normalize1 / x: (1, 147555266727594256001, 185, 67, 63, 'n') / result: (1, 1152775521309330125, 192, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 29205591910355709875537210393909477805, -301, 125, 63, 'n') / result: (1, 3166476619793273431, -238, 62)

[3]libmpf._normalize1 / x: (1, 5554030520793227465661200987555744631, -296, 123, 63, 'n') / result: (1, 1204338391338962965, -234, 61)

[2]libmpf._normalize. / x: (0, 7892351636695457067, 192, 63, 63, 'n') / result: (0, 7892351636695457067, 192, 63)

[2]libmpf._normalize. / x: (1, 1152775521309330125, 192, 60, 63, 'n') / result: (1, 1152775521309330125, 192, 60)

[3]libmpf._normalize1 / x: (1, 47204256003321149123077848743993416877, -46, 126, 63, 'n') / result: (1, 5117895690936270469, 17, 63)

[3]libmpf._normalize1 / x: (1, 148430756448211815422509352727797969605, -46, 127, 63, 'n') / result: (1, 4023223715120451155, 19, 62)

[3]libmpf._normalize1 / x: (1, 5304203340691314808984868911, -38, 93, 63, 'n') / result: (1, 2469962155768328723, -7, 62)

[8]gammazeta.mpf_bernoulli / n: 40 / prec: 63 / result: (1, 2469962155768328723, -7, 62)

[3]libmpf._normalize1 / x: (0, 12641008673782390835938368058829381087, 10, 124, 63, 'n') / result: (0, 171317613331537167, 76, 58)

[3]libmpf._normalize1 / x: (0, 9937210320537173958757851052105025065, 12, 123, 63, 'n') / result: (0, 2154789003594355977, 74, 61)

[1]ctx_mp_python.convert / x: -815915283247897734345611269596115894272000000000 / result: -8.15915283247897734e+47

[3]libmpf._normalize1 / x: (1, 628472394105331615377, -95, 70, 63, 'n') / result: (1, 4909940578947903245, -88, 63)

[3]libmpf._normalize1 / x: (1, 988095574023133025445, -94, 70, 63, 'n') / result: (1, 7719496672055726761, -87, 63)

[3]libmpf._normalize1 / x: (0, 51866526977245056200134899, -88, 86, 63, 'n') / result: (0, 3091485916211906445, -64, 62)

[3]libmpf._normalize1 / x: (1, 84938922494720524925604521, -87, 87, 63, 'n') / result: (1, 632844287862781621, -60, 60)

[1]ctx_mp_python.convert / x: -39 / result: -39.0

[2]libmpf._normalize1 / x: (1, 39, 0, 6, 63, 'n') / result: (1, 39, 0, 6)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 411551510748962536863, 192, 69, 63, 'n') / result: (1, 3215246177726269819, 199, 62)

[3]libmpf._normalize1 / x: (1, 665353401971527261155, 192, 70, 63, 'n') / result: (1, 649759181612819591, 202, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 10620215240129349045954799549416827493, -304, 123, 63, 'n') / result: (1, 9211568348489522709, -244, 63)

[3]libmpf._normalize1 / x: (1, 4039294924213256338357786766590796895, -300, 122, 63, 'n') / result: (1, 7007059731426693615, -241, 63)

[1]ctx_mp_python.convert / x: -40 / result: -40.0

[2]libmpf._normalize1 / x: (1, 5, 3, 3, 63, 'n') / result: (1, 5, 3, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 42402095456522414095, 202, 66, 63, 'n') / result: (1, 2650130966032650881, 206, 62)

[3]libmpf._normalize1 / x: (0, 248647547055733276415, 200, 68, 63, 'n') / result: (0, 971279480686458111, 208, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 30895171607649015408548296350633528927, -310, 125, 63, 'n') / result: (1, 6699322435265107425, -248, 63)

[3]libmpf._normalize1 / x: (1, 23501352286331673242878920036504268845, -307, 125, 63, 'n') / result: (1, 5096043441037595357, -245, 63)

[2]libmpf._normalize. / x: (1, 2650130966032650881, 206, 62, 63, 'n') / result: (1, 2650130966032650881, 206, 62)

[2]libmpf._normalize. / x: (0, 971279480686458111, 208, 60, 63, 'n') / result: (0, 971279480686458111, 208, 60)

[3]libmpf._normalize1 / x: (0, 176143919500065382638914916135940791489, -42, 128, 63, 'n') / result: (0, 2387195252401033699, 24, 62)

[3]libmpf._normalize1 / x: (0, 20503450638807202441665203381877544859, -40, 124, 63, 'n') / result: (0, 4445977145208814515, 22, 62)

[3]libmpf._normalize1 / x: (0, 7230088225199077963422274409, -33, 93, 63, 'n') / result: (0, 841693047573682615, 0, 60)

[8]gammazeta.mpf_bernoulli / n: 42 / prec: 63 / result: (0, 841693047573682615, 0, 60)

[3]libmpf._normalize1 / x: (0, 2009285647146852534974000894145442885, 24, 121, 63, 'n') / result: (0, 6971109964097792679, 82, 63)

[3]libmpf._normalize1 / x: (0, 3742148052793748335281804637015156725, 22, 122, 63, 'n') / result: (0, 6491592077762211337, 81, 63)

[1]ctx_mp_python.convert / x: -1405006117752879898543142606244511569936384000000000 / result: -1.4050061177528799e+51

[3]libmpf._normalize1 / x: (1, 475229022131945449621, -94, 69, 63, 'n') / result: (1, 3712726735405823825, -87, 62)

[3]libmpf._normalize1 / x: (1, 442539706170548442989, -95, 69, 63, 'n') / result: (1, 3457341454457409711, -88, 62)

[3]libmpf._normalize1 / x: (0, 25933259775895792693954735, -87, 85, 63, 'n') / result: (0, 3091485473620390021, -64, 62)

[3]libmpf._normalize1 / x: (1, 169877848446782504318963887, -88, 88, 63, 'n') / result: (1, 2531377202969528799, -62, 62)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)

[2]libmpf._normalize. / x: (1, 3657598990395998601197, -73, 72, 63, 'n') / result: (1, 27905265734832753, -56, 55)

[2]libmpf._normalize. / x: (1, 6554129965209435978631, -73, 73, 63, 'n') / result: (1, 6400517544149839823, -63, 63)

[2]libmpf._normalize1 / x: (0, 327695682090426931, -58, 59, 63, 'n') / result: (0, 327695682090426931, -58, 59)

[3]libmpf._normalize1 / x: (0, 69161874654226239761, -63, 66, 63, 'n') / result: (0, 4322617165889139985, -59, 62)

[2]libmpf._normalize1 / x: (0, 43, 0, 6, 63, 'n') / result: (0, 43, 0, 6)

[2]libmpf._normalize. / x: (0, 36376095460795824230704307, -83, 85, 63, 'n') / result: (0, 8672736993025737817, -61, 63)

[3]libmpf._normalize1 / x: (0, 627773893652404672411, -71, 70, 63, 'n') / result: (0, 4904483544159411503, -64, 63)

[3]libmpf._normalize1 / x: (0, 878579810766445621153, -75, 70, 63, 'n') / result: (0, 6863904771612856415, -68, 63)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (1, 199819860319312999314165, -69, 78, 73, 'd') / result: (1, 6244370634978531228567, -64, 73)

[2]libmpf._normalize. / x: (0, 7012657393760604172592687396, -93, 93, 63, 'n') / result: (0, 6531046138853397381, -63, 63)

[2]libmpf._normalize. / x: (0, 6993021585348612202380085034, -93, 93, 63, 'n') / result: (0, 6512758867208484749, -63, 63)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[2]libmpf._normalize1 / x: (1, 4440441340429177762537, -70, 72, 73, 'd') / result: (1, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (0, 199819860319312999314165, -69, 78, 73, 'd') / result: (0, 6244370634978531228567, -64, 73)

[2]libmpf._normalize. / x: (0, 3598662904899361264242083, -87, 82, 67, 'n') / result: (0, 27455619086451425661, -70, 65)

[2]libmpf._normalize. / x: (0, 112202518300169666761482998383, -97, 97, 67, 'n') / result: (0, 52248369110827179049, -66, 66)

[2]libmpf._normalize. / x: (1, 111888345365577795238081360538, -97, 97, 67, 'n') / result: (1, 26051035468833938995, -65, 65)

[3]libmpf._normalize1 / x: (0, 1434511320195185800907290870772960176389, -136, 131, 63, 'n') / result: (0, 4860313405658342237, -68, 63)

[3]libmpf._normalize1 / x: (1, 715247306639940159541934464380051550695, -135, 130, 63, 'n') / result: (1, 4846704273271430511, -68, 63)

[3]libmpf._normalize1 / x: (0, 431343071188770403753, -68, 69, 63, 'n') / result: (0, 6739735487324537559, -62, 63)

[3]libmpf._normalize1 / x: (0, 442274910782522231841, -68, 69, 63, 'n') / result: (0, 6910545480976909873, -62, 63)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[2]libmpf._normalize. / x: (0, 93179673283752112391028038073166554610, -124, 127, 73, 'd') / result: (0, 5172510935333558123651, -70, 73)

[3]libmpf._normalize1 / x: (0, 787609765340611259301, -71, 70, 63, 'n') / result: (0, 6153201291723525463, -64, 63)

[3]libmpf._normalize1 / x: (1, 807570729575986773579, -71, 70, 63, 'n') / result: (1, 6309146324812396669, -64, 63)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 6531046138853397381, -64, 63, 63, 'n') / result: (0, 6531046138853397381, -64, 63)

[2]libmpf._normalize1 / x: (0, 6512758867208484749, -64, 63, 63, 'n') / result: (0, 6512758867208484749, -64, 63)

[2]libmpf._normalize. / x: (0, 12684247430576922844, -64, 64, 63, 'n') / result: (0, 3171061857644230711, -62, 62)

[2]libmpf._normalize. / x: (0, 203612542396088080, -64, 58, 63, 'n') / result: (0, 12725783899755505, -60, 54)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 44828478756099556275862090080490049115, -131, 126, 63, 'n') / result: (0, 4860313405658342237, -68, 63)

[3]libmpf._normalize1 / x: (0, 44702956664996259971458690499854314835, -131, 126, 63, 'n') / result: (0, 4846704273271430511, -68, 63)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 90, 0, 7, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 218101692297214372995, -67, 68, 63, 'n') / result: (0, 1703919471071987289, -60, 61)

[3]libmpf._normalize1 / x: (1, 218714103254625400665, -67, 68, 63, 'n') / result: (1, 6834815726707043771, -62, 63)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (0, 10477255468358498430740387486389807245, -125, 123, 63, 'n') / result: (0, 567973157023995763, -61, 59)

[3]libmpf._normalize1 / x: (1, 42026698833843334009052733607529580055, -127, 125, 63, 'n') / result: (1, 4556543817804695847, -64, 62)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 567973157023995763, -62, 59, 63, 'n') / result: (1, 567973157023995763, -62, 59)

[2]libmpf._normalize1 / x: (0, 4556543817804695847, -65, 62, 63, 'n') / result: (0, 4556543817804695847, -65, 62)

[2]libmpf._normalize. / x: (0, 2603088700620234948, -62, 62, 63, 'n') / result: (0, 650772175155058737, -60, 60)

[2]libmpf._normalize1 / x: (0, 4963768902596872007, -65, 63, 63, 'n') / result: (0, 4963768902596872007, -65, 63)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 2025, 2, 11, 63, 'n') / result: (1, 2025, 2, 11)

[2]libmpf._normalize1 / x: (0, 45, 1, 6, 63, 'n') / result: (0, 45, 1, 6)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 33360728376632227926063325065210900355, -136, 125, 63, 'n') / result: (0, 3616977418164347711, -73, 62)

[3]libmpf._normalize1 / x: (0, 33267316587904193467930177205893078065, -136, 125, 63, 'n') / result: (0, 7213699383473757039, -74, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 6075, 2, 13, 63, 'n') / result: (0, 6075, 2, 13)

[2]libmpf._normalize1 / x: (0, 182205, 2, 18, 63, 'n') / result: (0, 182205, 2, 18)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 24826588559354216129267987199976916065, -141, 125, 63, 'n') / result: (0, 2691704125145561087, -78, 62)

[3]libmpf._normalize1 / x: (0, 49514145619206241436330370054502555185, -142, 126, 63, 'n') / result: (0, 5368334424910702913, -79, 63)

[2]libmpf._normalize. / x: (0, 24300, 0, 15, 63, 'n') / result: (0, 6075, 2, 13)

[2]libmpf._normalize. / x: (0, 728820, 0, 20, 63, 'n') / result: (0, 182205, 2, 18)

[3]libmpf._normalize1 / x: (1, 945433168770336057056115, -77, 80, 63, 'n') / result: (1, 7213082647478760201, -60, 63)

[3]libmpf._normalize1 / x: (0, 1013496531875626435910145, -77, 80, 63, 'n') / result: (0, 7732364897732745635, -60, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 8870525972037068171522137910121151641, -125, 123, 63, 'n') / result: (0, 3846977411988672107, -64, 62)

[3]libmpf._normalize1 / x: (1, 9509130423534085912093896723913230035, -125, 123, 63, 'n') / result: (1, 8247855890914928677, -65, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[3]libmpf._normalize1 / x: (1, 656550811646066706261, -76, 70, 63, 'n') / result: (1, 5129303215984896143, -69, 63)

[3]libmpf._normalize1 / x: (0, 703817036024740580437, -76, 70, 63, 'n') / result: (0, 5498570593943285785, -69, 63)

[3]libmpf._normalize1 / x: (0, 328066050463405177201, -69, 69, 63, 'n') / result: (0, 2563016019245352947, -62, 62)

[3]libmpf._normalize1 / x: (0, 84918873035493237897, -69, 67, 63, 'n') / result: (0, 5307429564718327369, -65, 63)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 16380225, 2, 24, 63, 'n') / result: (0, 16380225, 2, 24)

[2]libmpf._normalize1 / x: (1, 1093365, 2, 21, 63, 'n') / result: (1, 1093365, 2, 21)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 18475600788356625954908665997942323105, -146, 124, 63, 'n') / result: (0, 4006257302542230455, -84, 62)

[3]libmpf._normalize1 / x: (0, 36847736274758133163676158005391236895, -147, 125, 63, 'n') / result: (0, 7990079144053139219, -85, 63)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 81961875, 3, 27, 63, 'n') / result: (1, 81961875, 3, 27)

[2]libmpf._normalize1 / x: (1, 734923395, 3, 30, 63, 'n') / result: (1, 734923395, 3, 30)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 27498568615228466537059602547755118825, -152, 125, 63, 'n') / result: (0, 5962801566574482537, -90, 63)

[3]libmpf._normalize1 / x: (0, 54843142362430709822611989320252239885, -153, 126, 63, 'n') / result: (0, 2973052704763958779, -89, 62)

[2]libmpf._normalize. / x: (1, 655695000, 0, 30, 63, 'n') / result: (1, 81961875, 3, 27)

[2]libmpf._normalize. / x: (1, 5879387160, 0, 33, 63, 'n') / result: (1, 734923395, 3, 30)

[3]libmpf._normalize1 / x: (0, 3881209577948740603118192535, -87, 92, 63, 'n') / result: (0, 7229316193514951697, -58, 63)

[3]libmpf._normalize1 / x: (1, 4869556319330788214359354365, -87, 92, 63, 'n') / result: (1, 9070255457108445865, -58, 63)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (0, 25401399171370367474169945815121819891, -125, 125, 63, 'n') / result: (0, 344253152072140557, -59, 59)

[3]libmpf._normalize1 / x: (1, 31869844019132751217768887758377553595, -125, 125, 63, 'n') / result: (1, 3455335412231788901, -62, 62)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (1, 501354990537773412079, -79, 69, 63, 'n') / result: (1, 1958417931788177391, -71, 61)

[3]libmpf._normalize1 / x: (0, 629024615488951437267, -79, 70, 63, 'n') / result: (0, 307140925531714569, -68, 59)

[3]libmpf._normalize1 / x: (0, 1310305783921832531473, -71, 71, 63, 'n') / result: (0, 2559190984222329163, -62, 62)

[3]libmpf._normalize1 / x: (0, 42766577443278333521, -68, 66, 63, 'n') / result: (0, 2672911090204895845, -64, 62)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 65733296175, 3, 36, 63, 'n') / result: (1, 65733296175, 3, 36)

[2]libmpf._normalize1 / x: (0, 11051185725, 3, 34, 63, 'n') / result: (0, 11051185725, 3, 34)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 40928102124991206004017705225105924855, -158, 125, 63, 'n') / result: (0, 4437433723962405609, -95, 62)

[3]libmpf._normalize1 / x: (0, 20406750646485845514273127807505717285, -157, 124, 63, 'n') / result: (0, 8850017353715970319, -96, 63)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 694503246150, 4, 40, 63, 'n') / result: (0, 347251623075, 5, 39)

[2]libmpf._normalize. / x: (0, 2924844770700, 4, 42, 63, 'n') / result: (0, 731211192675, 6, 40)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 30458122511621362608119960035307631735, -163, 125, 63, 'n') / result: (0, 3302276259692953011, -100, 62)

[3]libmpf._normalize1 / x: (0, 60745676343027633159564648446948746385, -164, 126, 63, 'n') / result: (0, 3293029713010593607, -100, 62)

[2]libmpf._normalize. / x: (0, 11112051938400, 0, 44, 63, 'n') / result: (0, 347251623075, 5, 39)

[2]libmpf._normalize. / x: (0, 46797516331200, 0, 46, 63, 'n') / result: (0, 731211192675, 6, 40)

[3]libmpf._normalize1 / x: (1, 3669079576908960098358942128625, -95, 102, 63, 'n') / result: (1, 3337008435581956381, -55, 62)

[3]libmpf._normalize1 / x: (0, 5972832637461974475632053470375, -95, 103, 63, 'n') / result: (0, 10609882106148615, -46, 54)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 4103796038866015726779472028533207021, -120, 122, 63, 'n') / result: (0, 3559475664620753473, -60, 62)

[3]libmpf._normalize1 / x: (1, 13047851990956931972785749746884215, -111, 114, 63, 'n') / result: (1, 707325473743241, -47, 50)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (1, 740551737005033967005, -83, 70, 63, 'n') / result: (1, 5785560445351827867, -76, 63)

[3]libmpf._normalize1 / x: (0, 602765828840263253183, -82, 70, 63, 'n') / result: (0, 4709108037814556665, -75, 63)

[3]libmpf._normalize1 / x: (0, 41923999525053289178725, -76, 76, 63, 'n') / result: (0, 5117675723273106589, -63, 63)

[3]libmpf._normalize1 / x: (0, 5478831020777441247225, -75, 73, 63, 'n') / result: (0, 334401307420498123, -61, 59)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 129187253319975, 5, 47, 63, 'n') / result: (0, 129187253319975, 5, 47)

[2]libmpf._normalize. / x: (1, 20744801387100, 6, 45, 63, 'n') / result: (1, 5186200346775, 8, 43)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 22666509776090316357136747664084915565, -168, 125, 63, 'n') / result: (0, 1228753957095052283, -104, 61)

[3]libmpf._normalize1 / x: (0, 22603042360196328617033550252007938905, -168, 125, 63, 'n') / result: (0, 306328345396334289, -102, 59)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 595945284529725, 8, 50, 63, 'n') / result: (1, 595945284529725, 8, 50)

[2]libmpf._normalize1 / x: (1, 5647467988302075, 6, 53, 63, 'n') / result: (1, 5647467988302075, 6, 53)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 8434050149242908410840479749396945445, -172, 123, 63, 'n') / result: (0, 7315372395728683359, -112, 63)

[3]libmpf._normalize1 / x: (0, 2102608591646170103750472005498113935, -170, 121, 63, 'n') / result: (0, 1823722242359571581, -110, 61)

[2]libmpf._normalize. / x: (1, 152561992839609600, 0, 58, 63, 'n') / result: (1, 595945284529725, 8, 50)

[2]libmpf._normalize. / x: (1, 361437951251332800, 0, 59, 63, 'n') / result: (1, 5647467988302075, 6, 53)

[2]libmpf._normalize. / x: (0, 5939851299466732751800110864984300, -104, 113, 63, 'n') / result: (0, 2637823870207049005, -53, 62)

[3]libmpf._normalize1 / x: (1, 58702750157405006012441322673593525, -106, 116, 63, 'n') / result: (1, 6517314483356906997, -53, 63)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (0, 14745230862191355971803634901876505025, -119, 124, 63, 'n') / result: (0, 6394724533835270315, -58, 63)

[3]libmpf._normalize1 / x: (1, 36431282521928924944674768026412578985, -119, 125, 63, 'n') / result: (1, 7899775131341705451, -57, 63)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (1, 473040894024046025103, -86, 69, 63, 'n') / result: (1, 3695631984562859571, -79, 62)

[3]libmpf._normalize1 / x: (0, 584374928262558034215, -85, 69, 63, 'n') / result: (0, 9130858254102469285, -79, 63)

[3]libmpf._normalize1 / x: (0, 335388300568441750557133, -79, 79, 63, 'n') / result: (0, 1279404833101050379, -61, 61)

[3]libmpf._normalize1 / x: (0, 87670427190693162424997, -79, 77, 63, 'n') / result: (0, 2675489111044102857, -64, 62)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 243409044352058325, 7, 58, 63, 'n') / result: (1, 243409044352058325, 7, 58)

[2]libmpf._normalize1 / x: (0, 265367514325419675, 6, 58, 63, 'n') / result: (0, 265367514325419675, 6, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 50212019493167082630224647985066897985, -180, 126, 63, 'n') / result: (0, 5443998061937624825, -117, 63)

[3]libmpf._normalize1 / x: (0, 12517855801428361547750161131067542115, -178, 124, 63, 'n') / result: (0, 5428754581907561915, -117, 63)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 14375628588164468625, 7, 64, 63, 'n') / result: (0, 898476786760279289, 11, 60)

[3]libmpf._normalize1 / x: (0, 20579976420058150875, 7, 65, 63, 'n') / result: (0, 5144994105014537719, 9, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 37367084273984805676231580778864502375, -185, 125, 63, 'n') / result: (0, 4051347394930325451, -122, 62)

[3]libmpf._normalize1 / x: (0, 37262454478670471580329088721617434725, -185, 125, 63, 'n') / result: (0, 4040003409791673983, -122, 62)

[2]libmpf._normalize. / x: (0, 1840080459285051983872, 0, 71, 63, 'n') / result: (0, 898476786760279289, 11, 60)

[2]libmpf._normalize. / x: (0, 2634236981767443312128, 0, 72, 63, 'n') / result: (0, 5144994105014537719, 9, 63)

[3]libmpf._normalize1 / x: (1, 6225627369830286266715021322204927421, -113, 123, 63, 'n') / result: (1, 5399870975564170667, -53, 63)

[3]libmpf._normalize1 / x: (0, 35363555592803309040163938138645338617, -113, 125, 63, 'n') / result: (0, 7668248760105851655, -51, 63)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (0, 6303162655754912541997411909565640977, -115, 123, 63, 'n') / result: (0, 1366780528979795579, -53, 61)

[3]libmpf._normalize1 / x: (1, 8950995206823108625623922138501640805, -113, 123, 63, 'n') / result: (1, 7763750759315961163, -53, 63)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (1, 392167553362848208045, -90, 69, 63, 'n') / result: (1, 6127618021294503251, -84, 63)

[3]libmpf._normalize1 / x: (0, 556909298099333622701, -88, 69, 63, 'n') / result: (0, 8701707782802087855, -82, 63)

[3]libmpf._normalize1 / x: (0, 10732419490572114723179181, -84, 84, 63, 'n') / result: (0, 639702051316029711, -60, 60)

[3]libmpf._normalize1 / x: (0, 701372119233328101433263, -82, 80, 63, 'n') / result: (0, 668880576356247045, -62, 60)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 211758245416928052997, 10, 68, 63, 'n') / result: (0, 827180646159875207, 18, 60)

[3]libmpf._normalize1 / x: (1, 380046578388860458949, 9, 69, 63, 'n') / result: (1, 5938227787325944671, 15, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 27808062715523576316078215151683118165, -190, 125, 63, 'n') / result: (0, 3014956200878381731, -127, 62)

[3]libmpf._normalize1 / x: (0, 27730198681801281174302974107070150945, -190, 125, 63, 'n') / result: (0, 6013028330852724067, -128, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 306924921445341520131, 16, 69, 63, 'n') / result: (1, 1198925474395865313, 24, 61)

[3]libmpf._normalize1 / x: (1, 131077832946799703247, 17, 67, 63, 'n') / result: (1, 8192364559174981453, 21, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 20694372253412894002822483479662154365, -195, 124, 63, 'n') / result: (0, 8974753342149601431, -134, 63)

[3]libmpf._normalize1 / x: (0, 41272853851983302207967658021685839805, -196, 125, 63, 'n') / result: (0, 4474811781099701631, -133, 62)

[2]libmpf._normalize. / x: (1, 20114631651841901863108608, 0, 85, 63, 'n') / result: (1, 1198925474395865313, 24, 61)

[2]libmpf._normalize. / x: (1, 17180633720002930704121856, 0, 84, 63, 'n') / result: (1, 8192364559174981453, 21, 63)

[3]libmpf._normalize1 / x: (1, 6380952188830483707205165970973401769, -112, 123, 63, 'n') / result: (1, 5534593780524916125, -52, 63)

[3]libmpf._normalize1 / x: (1, 159363904607358279588167930760566067291, -113, 127, 63, 'n') / result: (1, 8639134579553526811, -49, 63)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (1, 29777776881208923969752621461354449375, -114, 125, 63, 'n') / result: (1, 6457026077279068813, -52, 63)

[3]libmpf._normalize1 / x: (1, 46481138843812831549620198483672452105, -111, 126, 63, 'n') / result: (1, 5039495171406223973, -48, 63)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (0, 651499372616396401181, -95, 70, 63, 'n') / result: (0, 1272459712141399221, -86, 61)

[3]libmpf._normalize1 / x: (0, 508473700304155486955, -91, 69, 63, 'n') / result: (0, 1986225391813107371, -83, 61)

[3]libmpf._normalize1 / x: (0, 42929679234748171036857525, -86, 86, 63, 'n') / result: (0, 2558808281108627977, -62, 62)

[3]libmpf._normalize1 / x: (0, 1402746224692048016023211, -83, 81, 63, 'n') / result: (0, 167220380865579607, -60, 58)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 306312280494289169109, 22, 69, 63, 'n') / result: (1, 4786129382723268267, 28, 63)

[3]libmpf._normalize1 / x: (0, 969727080834297784249, 21, 70, 63, 'n') / result: (0, 7575992819017951439, 28, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 61601852289229079816768400427681529865, -202, 126, 63, 'n') / result: (0, 6678886208111331297, -139, 63)

[3]libmpf._normalize1 / x: (0, 30714681936359666757661909400144312865, -201, 125, 63, 'n') / result: (0, 1665046244130121537, -137, 61)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 374422582534870692624, 29, 69, 63, 'n') / result: (0, 1462588213026838643, 37, 61)

[2]libmpf._normalize. / x: (0, 162343872489421411942, 29, 68, 63, 'n') / result: (0, 5073246015294419123, 34, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 45843238912914664046335972406556720255, -207, 126, 63, 'n') / result: (0, 4970333922315409337, -144, 63)

[3]libmpf._normalize1 / x: (0, 11428718860040806234610954105680109855, -205, 124, 63, 'n') / result: (0, 1239104181678229981, -142, 61)

[2]libmpf._normalize. / x: (0, 201016593358891300542528618496, 0, 98, 63, 'n') / result: (0, 1462588213026838643, 37, 61)

[2]libmpf._normalize. / x: (0, 87157702881007383778408005632, 0, 97, 63, 'n') / result: (0, 5073246015294419123, 34, 63)

[3]libmpf._normalize1 / x: (0, 8252823266938212534759202716990892719, -108, 123, 63, 'n') / result: (0, 7158183132122662487, -48, 63)

[3]libmpf._normalize1 / x: (0, 83209300232784390664396154468008136507, -110, 126, 63, 'n') / result: (0, 4510785204169171309, -46, 62)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (1, 58530317169638264186504955130178461215, -108, 126, 63, 'n') / result: (1, 1586467425789685675, -43, 61)

[3]libmpf._normalize1 / x: (1, 36883338105634943752037479636820464005, -106, 125, 63, 'n') / result: (1, 7997799060529359129, -44, 63)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (0, 682969541430005533855, -96, 70, 63, 'n') / result: (0, 5335699542421918233, -89, 63)

[3]libmpf._normalize1 / x: (0, 860757218841123525521, -95, 70, 63, 'n') / result: (0, 6724665772196277543, -88, 63)

[3]libmpf._normalize1 / x: (0, 343437439213684910692094489, -89, 89, 63, 'n') / result: (0, 2558808320862687459, -62, 62)

[3]libmpf._normalize1 / x: (0, 44887885914811308705623335, -88, 86, 63, 'n') / result: (0, 2675526494670588297, -64, 62)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 140540777906638541955, 35, 67, 63, 'n') / result: (0, 1097974827395613609, 42, 60)

[3]libmpf._normalize1 / x: (1, 1129162203608740109805, 34, 70, 63, 'n') / result: (1, 2205394928923320527, 43, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 34115898725889982544035357092531346855, -212, 125, 63, 'n') / result: (0, 3698853151490537181, -149, 62)

[3]libmpf._normalize1 / x: (0, 8505093105146646500015968060701178115, -210, 123, 63, 'n') / result: (0, 3688496168716591571, -149, 62)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 103634671111131878151, 44, 67, 63, 'n') / result: (1, 404822934027858899, 52, 59)

[3]libmpf._normalize1 / x: (1, 14122548370029483973, 43, 64, 63, 'n') / result: (1, 3530637092507370993, 45, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 25388575796011149800052733074171866115, -217, 125, 63, 'n') / result: (0, 2752634903434818367, -154, 62)

[3]libmpf._normalize1 / x: (0, 25317486452529552369746170702222277965, -217, 125, 63, 'n') / result: (0, 5489854762740973501, -155, 63)

[2]libmpf._normalize. / x: (1, 1823160414838896222910616283643904, 0, 111, 63, 'n') / result: (1, 404822934027858899, 52, 59)

[2]libmpf._normalize. / x: (1, 124223249173411307961336176050176, 0, 107, 63, 'n') / result: (1, 3530637092507370993, 45, 62)

[3]libmpf._normalize1 / x: (1, 265885728048678124379024332589228014355, -110, 128, 63, 'n') / result: (1, 3603423549790835551, -44, 62)

[3]libmpf._normalize1 / x: (1, 151953378088332844414395519056905693967, -109, 127, 63, 'n') / result: (1, 4118704565997042915, -44, 62)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (1, 7136743979278863223836178073131799399, -99, 123, 63, 'n') / result: (1, 3095069330722794939, -38, 62)

[3]libmpf._normalize1 / x: (1, 8157281431852209731149944703666373835, -99, 123, 63, 'n') / result: (1, 3537656899995932831, -38, 62)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (0, 557351406470841081293, -98, 69, 63, 'n') / result: (0, 8708615726106891895, -92, 63)

[3]libmpf._normalize1 / x: (0, 637051334925525328025, -98, 70, 63, 'n') / result: (0, 4976963554105666625, -91, 63)

[3]libmpf._normalize1 / x: (0, 2747499522418095011875477111, -92, 92, 63, 'n') / result: (0, 5117616657946435757, -63, 63)

[3]libmpf._normalize1 / x: (0, 359103092295454023752395841, -91, 89, 63, 'n') / result: (0, 2675526531751856385, -64, 62)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 281568683059478787427, 46, 68, 63, 'n') / result: (0, 8799021345608712107, 51, 63)

[3]libmpf._normalize1 / x: (0, 4723581030573559823361, 45, 73, 63, 'n') / result: (0, 4612872100169492015, 55, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 18893823848194344035492662927575774305, -222, 124, 63, 'n') / result: (0, 4096944972554148267, -160, 62)

[3]libmpf._normalize1 / x: (0, 37681840301439333759462581864432858915, -223, 125, 63, 'n') / result: (0, 8170946623614472187, -161, 63)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 3242076720011555841837, 52, 72, 63, 'n') / result: (0, 1583045273443142501, 63, 61)

[3]libmpf._normalize1 / x: (1, 1060209542976798894975, 52, 70, 63, 'n') / result: (1, 8282887054506241367, 59, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 28121040146149721354034490557292082805, -228, 125, 63, 'n') / result: (0, 3048889281900761501, -165, 62)

[3]libmpf._normalize1 / x: (0, 56084599518421333963900823943642029605, -229, 126, 63, 'n') / result: (0, 1520176116021297151, -164, 61)

[2]libmpf._normalize. / x: (0, 14601015508150602782394445109351415808, 0, 124, 63, 'n') / result: (0, 1583045273443142501, 63, 61)

[2]libmpf._normalize. / x: (1, 4774759302684955367902657857345028096, 0, 122, 63, 'n') / result: (1, 8282887054506241367, 59, 63)

[3]libmpf._normalize1 / x: (0, 51203685207678039162656613291696677425, -105, 126, 63, 'n') / result: (0, 2775757337071420867, -41, 62)

[3]libmpf._normalize1 / x: (0, 51754638124918749556182354461658856965, -106, 126, 63, 'n') / result: (0, 1402812277280950547, -41, 61)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (1, 6614529088096198875608057362819447991, -93, 123, 63, 'n') / result: (1, 2868594722912984547, -32, 62)

[3]libmpf._normalize1 / x: (1, 3342850792210503883594096012843602631, -93, 122, 63, 'n') / result: (1, 2899460872967614299, -33, 62)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (0, 696008076306246381983, -101, 70, 63, 'n') / result: (0, 5437563096142549859, -94, 63)

[3]libmpf._normalize1 / x: (0, 703497140394284328105, -102, 70, 63, 'n') / result: (0, 5496071409330346313, -95, 63)

[3]libmpf._normalize1 / x: (0, 10989998095109943144182551395, -94, 94, 63, 'n') / result: (0, 1279404165119624597, -61, 61)

[3]libmpf._normalize1 / x: (0, 5745649482223335789762238793, -95, 93, 63, 'n') / result: (0, 5351053068622328145, -65, 63)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 613352799016138521667, 60, 70, 63, 'n') / result: (1, 4791818742313582201, 67, 63)

[3]libmpf._normalize1 / x: (1, 2122210339722506615467, 59, 71, 63, 'n') / result: (1, 8289884139541041467, 67, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 20927285690157932170284646350272878915, -233, 124, 63, 'n') / result: (0, 9075763443797615631, -172, 63)

[3]libmpf._normalize1 / x: (0, 10434344096450480736991043656611573665, -232, 123, 63, 'n') / result: (0, 1131293853783290903, -169, 60)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 325126598856211044005, 68, 69, 63, 'n') / result: (1, 5080103107128297563, 74, 63)

[3]libmpf._normalize1 / x: (0, 298530684799521613715, 68, 69, 63, 'n') / result: (0, 2332270974996262607, 75, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 62295176007911984135598936202162622865, -240, 126, 63, 'n') / result: (0, 6754056516314504655, -177, 63)

[3]libmpf._normalize1 / x: (0, 7765093281079427524723760062714692745, -237, 123, 63, 'n') / result: (0, 1683786200979781809, -175, 61)

[2]libmpf._normalize. / x: (1, 95960434570498460149719141124255244091392, 0, 137, 63, 'n') / result: (1, 5080103107128297563, 74, 63)

[2]libmpf._normalize. / x: (0, 88110706250336471208114733133326792523776, 0, 137, 63, 'n') / result: (0, 2332270974996262607, 75, 62)

[3]libmpf._normalize1 / x: (1, 65727668971404389912060126536392784269, -103, 126, 63, 'n') / result: (1, 445388009320029501, -36, 59)

[3]libmpf._normalize1 / x: (1, 1355325046189592741750219153228927349, -102, 121, 63, 'n') / result: (1, 1175557087602218475, -42, 61)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (1, 388139556081479386601522761375048857, -83, 119, 63, 'n') / result: (1, 5386518399118070213, -27, 63)

[3]libmpf._normalize1 / x: (1, 1024455523234586820717348259131070575, -89, 120, 63, 'n') / result: (1, 7108588184996564451, -32, 63)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (0, 362093914264991681491, -103, 69, 63, 'n') / result: (0, 5657717410390495023, -97, 63)

[3]libmpf._normalize1 / x: (0, 477855328819579207815, -108, 69, 63, 'n') / result: (0, 3733244756402962561, -101, 62)

[3]libmpf._normalize1 / x: (0, 87919984766537262560985370415, -97, 97, 63, 'n') / result: (0, 5117616660807820885, -63, 63)

[3]libmpf._normalize1 / x: (0, 367721566866026735286888497281, -101, 99, 63, 'n') / result: (0, 2675526534338327003, -64, 62)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 526490940749021518083, 74, 69, 63, 'n') / result: (0, 2056605237300865305, 82, 61)

[2]libmpf._normalize. / x: (0, 179626949345851875588, 75, 68, 63, 'n') / result: (0, 701667770882233889, 83, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 46359200750074034701252105340364111825, -245, 126, 63, 'n') / result: (0, 5026274616792189511, -182, 63)

[3]libmpf._normalize1 / x: (0, 11557348139281008408093049305945954735, -243, 124, 63, 'n') / result: (0, 5012200784311908641, -182, 63)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 40527441769091531655, 83, 66, 63, 'n') / result: (0, 5065930221136441457, 86, 63)

[3]libmpf._normalize1 / x: (1, 107983926637948084283, 83, 67, 63, 'n') / result: (1, 1687248853717938817, 89, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 34499870325636490942541817044712063065, -250, 125, 63, 'n') / result: (0, 1870241717876163539, -186, 61)

[3]libmpf._normalize1 / x: (0, 34403268879720211077009610782530782015, -250, 125, 63, 'n') / result: (0, 7460019771999119837, -188, 63)

[2]libmpf._normalize. / x: (0, 391957366060665095045468478518816908821659648, 0, 149, 63, 'n') / result: (0, 5065930221136441457, 86, 63)

[2]libmpf._normalize. / x: (1, 1044356456127899007906925738802363555857301504, 0, 150, 63, 'n') / result: (1, 1687248853717938817, 89, 61)

[3]libmpf._normalize1 / x: (0, 34648333657456339776474528381465461981, -100, 125, 63, 'n') / result: (0, 29348280175325615, -30, 55)

[3]libmpf._normalize1 / x: (1, 63186082615939094182336142171744305107, -102, 126, 63, 'n') / result: (1, 6850648804304973101, -39, 63)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (1, 178805678965175831332267245731656205, -76, 118, 63, 'n') / result: (1, 2481427271510903023, -20, 62)

[3]libmpf._normalize1 / x: (0, 41737877091536598365848256673687813767, -85, 125, 63, 'n') / result: (0, 1131307425439423679, -20, 60)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (0, 618878654009886668989, -107, 70, 63, 'n') / result: (0, 4834989484452239601, -100, 63)

[3]libmpf._normalize1 / x: (1, 1128611786878661983733, -109, 70, 63, 'n') / result: (1, 2204319896247386687, -100, 61)

[3]libmpf._normalize1 / x: (0, 703359878137133090031677102321, -100, 100, 63, 'n') / result: (0, 19990690081417969, -55, 55)

[3]libmpf._normalize1 / x: (0, 183860783430809047739571715521, -100, 98, 63, 'n') / result: (0, 5351053068612499853, -65, 63)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 1331335569763054101751, 86, 71, 63, 'n') / result: (1, 5200529569386930085, 94, 63)

[3]libmpf._normalize1 / x: (1, 72739965409089494401, 87, 66, 63, 'n') / result: (1, 568280979758511675, 94, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 12837161051399624536919371569465252685, -254, 124, 63, 'n') / result: (0, 5567231160189510069, -193, 63)

[3]libmpf._normalize1 / x: (0, 51204865309351011830281540293459204355, -256, 126, 63, 'n') / result: (0, 5551642621022600809, -193, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 36833710743510135645, 95, 65, 63, 'n') / result: (0, 9208427685877533911, 97, 63)

[3]libmpf._normalize1 / x: (0, 240843202379513993925, 95, 68, 63, 'n') / result: (0, 3763175037179906155, 101, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 38212944525096556757071673060493742635, -261, 125, 63, 'n') / result: (0, 4143055747117774935, -198, 62)

[3]libmpf._normalize1 / x: (0, 38105946276726334385804674504779839735, -261, 125, 63, 'n') / result: (0, 4131454973784261067, -198, 62)

[2]libmpf._normalize. / x: (0, 1459133610395112666034124733989148806497479688192, 0, 160, 63, 'n') / result: (0, 9208427685877533911, 97, 63)

[2]libmpf._normalize. / x: (0, 9540782189289995063584693628700141035534742978560, 0, 163, 63, 'n') / result: (0, 3763175037179906155, 101, 62)

[3]libmpf._normalize1 / x: (1, 210607182347349768015120223501954357375, -101, 128, 63, 'n') / result: (1, 5708519116051184945, -36, 63)

[3]libmpf._normalize1 / x: (0, 287500907806725135688550286030749141837, -101, 128, 63, 'n') / result: (0, 3896363860445076423, -35, 62)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (1, 35789508087568766733822102332457920955, -78, 125, 63, 'n') / result: (1, 970076560518239699, -13, 60)

[3]libmpf._normalize1 / x: (0, 24428217381878934088838713704646521837, -77, 125, 63, 'n') / result: (0, 5297025271076260327, -15, 63)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (0, 762301122600657038001, -111, 70, 63, 'n') / result: (0, 5955477520317633109, -104, 63)

[3]libmpf._normalize1 / x: (1, 520310519154838455445, -110, 69, 63, 'n') / result: (1, 4064925930897175433, -103, 62)

[3]libmpf._normalize1 / x: (0, 11253758050200084919008141988437, -104, 104, 63, 'n') / result: (0, 2558808330422854151, -62, 62)

[3]libmpf._normalize1 / x: (0, 1470886267442407455857250503799, -103, 101, 63, 'n') / result: (0, 5351053068597711739, -65, 63)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 5188761361392126515425, 97, 73, 63, 'n') / result: (0, 2533574883492249275, 108, 62)

[3]libmpf._normalize1 / x: (1, 1167014253300470256995, 98, 70, 63, 'n') / result: (1, 9117298853909923883, 105, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 28437540111699763167574461014440958025, -266, 125, 63, 'n') / result: (0, 6166408553849711531, -204, 63)

[3]libmpf._normalize1 / x: (0, 28357913508261458146458191877945694805, -266, 125, 63, 'n') / result: (0, 6149142286562621123, -204, 63)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 673770236309140499335, 106, 70, 63, 'n') / result: (1, 5263829971165160151, 113, 63)

[3]libmpf._normalize1 / x: (1, 793562072956380728521, 106, 70, 63, 'n') / result: (1, 3099851847485862221, 114, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 42325641096483368434342283058672821365, -272, 125, 63, 'n') / result: (0, 9177910405729803209, -210, 63)

[3]libmpf._normalize1 / x: (0, 42207127082063565613492748487445054045, -272, 125, 63, 'n') / result: (0, 9152211775349017485, -210, 63)

[2]libmpf._normalize. / x: (1, 54662735646284666703140238070282586124272305535188992, 0, 176, 63, 'n') / result: (1, 5263829971165160151, 113, 63)

[2]libmpf._normalize. / x: (1, 64381404038496896087623772397638498271458140161572864, 0, 176, 63, 'n') / result: (1, 3099851847485862221, 114, 62)

[3]libmpf._normalize1 / x: (0, 8430041294445896393550960458661143811, -97, 123, 63, 'n') / result: (0, 7311895268464603867, -37, 63)

[3]libmpf._normalize1 / x: (1, 105076011700055357490210805412559574613, -97, 127, 63, 'n') / result: (1, 5696182008065615035, -33, 63)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (1, 54866126815561187825529524365130231559, -75, 126, 63, 'n') / result: (1, 5948597388929663109, -12, 63)

[3]libmpf._normalize1 / x: (0, 42742330537328993275997804885137006695, -71, 126, 63, 'n') / result: (0, 2317066381283280629, -7, 62)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (0, 395724831538374210591, -116, 69, 63, 'n') / result: (0, 386450030799193565, -106, 59)

[3]libmpf._normalize1 / x: (1, 308281311861160939787, -112, 69, 63, 'n') / result: (1, 1204223874457659921, -104, 61)

[3]libmpf._normalize1 / x: (0, 45015032200800726129356375164381, -106, 106, 63, 'n') / result: (0, 1279404165211438059, -61, 61)

[3]libmpf._normalize1 / x: (0, 2941772534883610688053899171311, -104, 102, 63, 'n') / result: (0, 5351053068595521269, -65, 63)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 415849923325995875703, 113, 69, 63, 'n') / result: (1, 3248827525984342779, 120, 62)

[2]libmpf._normalize. / x: (0, 320568348584550486762, 114, 69, 63, 'n') / result: (0, 1252220111658400339, 122, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 62996303027324083251592972792323235735, -278, 126, 63, 'n') / result: (0, 3415036430038996543, -214, 62)

[3]libmpf._normalize1 / x: (0, 62819910075629493003415105164629416275, -278, 126, 63, 'n') / result: (0, 6810948297934152547, -215, 63)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 135441602731146429963, 122, 67, 63, 'n') / result: (0, 8465100170696651873, 126, 63)

[3]libmpf._normalize1 / x: (0, 76072912416425006071, 121, 67, 63, 'n') / result: (0, 4754557026026562879, 125, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 23440484847376403071158304384540373345, -282, 125, 63, 'n') / result: (0, 635355614890976101, -217, 60)

[3]libmpf._normalize1 / x: (0, 46749700521398692467817378373017539005, -283, 126, 63, 'n') / result: (0, 2534306343417359087, -219, 62)

[2]libmpf._normalize. / x: (0, 720131080576874227971924050408461584341190647933170614272, 0, 189, 63, 'n') / result: (0, 8465100170696651873, 126, 63)

[2]libmpf._normalize. / x: (0, 202236489809612104663973315550766113251307631201619017728, 0, 188, 63, 'n') / result: (0, 4754557026026562879, 125, 63)

[3]libmpf._normalize1 / x: (0, 30977287361334732055197295874551565911, -94, 125, 63, 'n') / result: (0, 209910264092917973, -27, 58)

[3]libmpf._normalize1 / x: (0, 27494826065870529087868139663397629509, -93, 125, 63, 'n') / result: (0, 5961990030545580535, -31, 63)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (0, 1084719761385528371266166154951836023, -60, 120, 63, 'n') / result: (0, 7526755339725746197, -3, 63)

[3]libmpf._normalize1 / x: (0, 30808824100443261972106679348672630285, -64, 125, 63, 'n') / result: (0, 1670149701071217575, 0, 61)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (1, 589341779509395603833, -117, 69, 63, 'n') / result: (1, 4604232652417153155, -110, 62)

[3]libmpf._normalize1 / x: (1, 523088078434743548085, -116, 69, 63, 'n') / result: (1, 8173251225542867939, -110, 63)

[3]libmpf._normalize1 / x: (0, 720240515212807013797370201360253, -110, 110, 63, 'n') / result: (0, 5117616660845719521, -63, 63)

[3]libmpf._normalize1 / x: (0, 188273442232542910800659870499869, -110, 108, 63, 'n') / result: (0, 5351053068595288971, -65, 63)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (1, 31532838779007574762, 126, 65, 63, 'n') / result: (1, 3941604847375946845, 129, 62)

[3]libmpf._normalize1 / x: (1, 1661600184480167660631, 125, 71, 63, 'n') / result: (1, 1622656430156413731, 135, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 4361020436721191268893082100109537915, -285, 122, 63, 'n') / result: (0, 3782582265397439113, -225, 62)

[3]libmpf._normalize1 / x: (0, 17395237403311141381618025615826493105, -287, 124, 63, 'n') / result: (0, 7543981673428417747, -226, 63)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 4614126446139832342605, 130, 72, 63, 'n') / result: (1, 2252991428779215011, 141, 61)

[3]libmpf._normalize1 / x: (0, 1735122391082074789785, 130, 71, 63, 'n') / result: (0, 847227730020544331, 141, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 25963284460479650345516761207973959895, -293, 125, 63, 'n') / result: (0, 5629889883382234959, -231, 63)

[3]libmpf._normalize1 / x: (0, 51781171805205258063817411796548797005, -294, 126, 63, 'n') / result: (0, 5614125896504869021, -231, 63)

[2]libmpf._normalize. / x: (1, 2252991428779215011, 141, 61, 63, 'n') / result: (1, 2252991428779215011, 141, 61)

[2]libmpf._normalize. / x: (0, 847227730020544331, 141, 60, 63, 'n') / result: (0, 847227730020544331, 141, 60)

[2]libmpf._normalize. / x: (1, 17440536791576363292820028485060839500, -90, 124, 63, 'n') / result: (1, 1890906787874046233, -27, 61)

[2]libmpf._normalize. / x: (1, 7878778698749338268878209259234606802, -90, 123, 63, 'n') / result: (1, 3416875592686619291, -29, 62)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (0, 15345673384672067965653234456478559419, -56, 124, 63, 'n') / result: (0, 6655124968765776027, 5, 63)

[3]libmpf._normalize1 / x: (0, 27729688833778362903448923667969857313, -58, 125, 63, 'n') / result: (0, 3006458887592953491, 5, 62)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (1, 537902955169626808673, -119, 69, 63, 'n') / result: (1, 4202366837262709443, -112, 62)

[3]libmpf._normalize1 / x: (1, 485996319474719856581, -120, 69, 63, 'n') / result: (1, 7593692491792497759, -114, 63)

[3]libmpf._normalize1 / x: (0, 2880962060851223852845527033122109, -112, 112, 63, 'n') / result: (0, 639702082605714007, -60, 60)

[3]libmpf._normalize1 / x: (0, 3012375075720678978989394957452193, -114, 112, 63, 'n') / result: (0, 2675526534297637741, -64, 62)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 146093229994004655131, 141, 67, 63, 'n') / result: (0, 4565413437312645473, 146, 62)

[3]libmpf._normalize1 / x: (0, 176505168959492476729, 141, 68, 63, 'n') / result: (0, 2757893264992069949, 147, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 38643028034202270282497493980660411985, -299, 125, 63, 'n') / result: (0, 2094842747305017659, -235, 61)

[3]libmpf._normalize1 / x: (0, 38534825529455075768262634249254619715, -299, 125, 63, 'n') / result: (0, 8355908311077014357, -237, 63)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 87581889426141983921, 148, 67, 63, 'n') / result: (0, 5473868089133873995, 152, 63)

[3]libmpf._normalize1 / x: (1, 293696189158815284653, 147, 68, 63, 'n') / result: (1, 9178005911212977645, 152, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 14378801129005495917951455123006432485, -303, 124, 63, 'n') / result: (0, 6235810968721913031, -242, 63)

[3]libmpf._normalize1 / x: (0, 57354158927561043005043161054734550155, -305, 126, 63, 'n') / result: (0, 1554587592758514299, -240, 61)

[2]libmpf._normalize. / x: (0, 5473868089133873995, 152, 63, 63, 'n') / result: (0, 5473868089133873995, 152, 63)

[2]libmpf._normalize. / x: (1, 9178005911212977645, 152, 63, 63, 'n') / result: (1, 9178005911212977645, 152, 63)

[3]libmpf._normalize1 / x: (0, 91206063134901859526879585572901912265, -90, 127, 63, 'n') / result: (0, 2472145294867766829, -25, 62)

[3]libmpf._normalize1 / x: (1, 23193880269079331224664207976350173975, -90, 125, 63, 'n') / result: (1, 5029371075220897413, -28, 63)

[3]libmpf._normalize1 / x: (0, 15478498771225430759843386699, -55, 94, 63, 'n') / result: (0, 7207737663400094379, -24, 63)

[8]gammazeta.mpf_bernoulli / n: 34 / prec: 63 / result: (0, 7207737663400094379, -24, 63)

[3]libmpf._normalize1 / x: (0, 17818574751215735014633271683565554191, -49, 124, 63, 'n') / result: (0, 7727574982345382637, 12, 63)

[3]libmpf._normalize1 / x: (1, 36250387322084691425440433057276941527, -52, 125, 63, 'n') / result: (1, 3930274868804520979, 11, 62)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (1, 570030433280963008763, -122, 69, 63, 'n') / result: (1, 2226681380003761753, -114, 61)

[3]libmpf._normalize1 / x: (0, 579839417021858127077, -124, 69, 63, 'n') / result: (0, 2264997722741633309, -116, 61)

[3]libmpf._normalize1 / x: (0, 11523848243404893184482468019188135, -114, 114, 63, 'n') / result: (0, 5117616660845711067, -63, 63)

[3]libmpf._normalize1 / x: (0, 12049500302882718181197582941122845, -116, 114, 63, 'n') / result: (0, 668881633574409561, -62, 60)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 1006658178950585829885, 152, 70, 63, 'n') / result: (1, 1966129255762862949, 161, 61)

[3]libmpf._normalize1 / x: (1, 189773932952020397265, 152, 68, 63, 'n') / result: (1, 5930435404750637415, 157, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 42802012663086127380636559653120443865, -310, 126, 63, 'n') / result: (0, 2320301755803502523, -246, 62)

[3]libmpf._normalize1 / x: (0, 10670541195825310326679283563011378085, -308, 124, 63, 'n') / result: (0, 4627609578443949541, -247, 63)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 267917564353720038453, 158, 68, 63, 'n') / result: (0, 4186211943026875601, 164, 62)

[3]libmpf._normalize1 / x: (0, 1516430466030022159335, 158, 71, 63, 'n') / result: (0, 1480889126982443515, 168, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 15926330293241349721910177233689235045, -314, 124, 63, 'n') / result: (0, 6906944761461588905, -253, 63)

[3]libmpf._normalize1 / x: (0, 31763471466642784226817980305138155515, -315, 125, 63, 'n') / result: (0, 6887604953963087689, -253, 63)

[2]libmpf._normalize. / x: (0, 4186211943026875601, 164, 62, 63, 'n') / result: (0, 4186211943026875601, 164, 62)

[2]libmpf._normalize. / x: (0, 1480889126982443515, 168, 61, 63, 'n') / result: (0, 1480889126982443515, 168, 61)

[3]libmpf._normalize1 / x: (1, 134282533946132181857434287559713382455, -89, 127, 63, 'n') / result: (1, 3639735375781375205, -24, 62)

[3]libmpf._normalize1 / x: (0, 192487684483800374834762916581468793289, -89, 128, 63, 'n') / result: (0, 2608694571175508619, -23, 62)

[3]libmpf._normalize1 / x: (1, 1929743914758391793175373481, -47, 91, 63, 'n') / result: (1, 1797214071041337953, -17, 61)

[8]gammazeta.mpf_bernoulli / n: 36 / prec: 63 / result: (1, 1797214071041337953, -17, 61)

[3]libmpf._normalize1 / x: (0, 6541383632221219348052997381499655365, -41, 123, 63, 'n') / result: (0, 177304558627884149, 24, 58)

[3]libmpf._normalize1 / x: (1, 4688382590365773194223186279043316907, -40, 122, 63, 'n') / result: (1, 2033261835967115243, 21, 61)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (1, 680274359735547241125, -126, 70, 63, 'n') / result: (1, 5314643435433962821, -119, 63)

[3]libmpf._normalize1 / x: (0, 975141237442868496879, -126, 70, 63, 'n') / result: (0, 1904572729380602533, -117, 61)

[3]libmpf._normalize1 / x: (0, 368763143788956576577639197789704891, -119, 119, 63, 'n') / result: (0, 5117616660845710993, -63, 63)

[3]libmpf._normalize1 / x: (0, 24099000605765438267593674914300581, -117, 115, 63, 'n') / result: (0, 5351053068595276911, -65, 63)

[1]ctx_mp_python.convert / x: -35 / result: -35.0

[2]libmpf._normalize1 / x: (1, 35, 0, 6, 63, 'n') / result: (1, 35, 0, 6)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 1985962924848778015565, 164, 71, 63, 'n') / result: (0, 7757667675190539123, 172, 63)

[3]libmpf._normalize1 / x: (1, 603028492991293586245, 165, 70, 63, 'n') / result: (1, 4711160101494481143, 172, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 47408611105462622423382545291522075575, -321, 126, 63, 'n') / result: (0, 160626622359571835, -253, 58)

[3]libmpf._normalize1 / x: (0, 47275864508491585826440522182411174935, -321, 126, 63, 'n') / result: (0, 1281414875155923291, -256, 61)

[1]ctx_mp_python.convert / x: -36 / result: -36.0

[2]libmpf._normalize1 / x: (1, 9, 2, 4, 63, 'n') / result: (1, 9, 2, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 351640222720681355649, 173, 69, 63, 'n') / result: (1, 2747189240005323091, 180, 62)

[3]libmpf._normalize1 / x: (1, 264294163556673599961, 173, 68, 63, 'n') / result: (1, 8259192611146049999, 178, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 1102525839661921451706570820733071525, -321, 120, 63, 'n') / result: (0, 7650309827730305071, -264, 63)

[3]libmpf._normalize1 / x: (0, 8795509675998434572520653075137261765, -324, 123, 63, 'n') / result: (0, 7628888559067822383, -264, 63)

[2]libmpf._normalize. / x: (1, 2747189240005323091, 180, 62, 63, 'n') / result: (1, 2747189240005323091, 180, 62)

[2]libmpf._normalize. / x: (1, 8259192611146049999, 178, 63, 63, 'n') / result: (1, 8259192611146049999, 178, 63)

[3]libmpf._normalize1 / x: (1, 21058935347481089193482376196433450227, -86, 124, 63, 'n') / result: (1, 570803586349269453, -21, 59)

[3]libmpf._normalize1 / x: (1, 147017384652851487681218874863755428341, -86, 127, 63, 'n') / result: (1, 7969828391687932053, -22, 63)

[3]libmpf._normalize1 / x: (0, 17181666013769096711720228171, -45, 94, 63, 'n') / result: (0, 8000836714063350443, -14, 63)

[8]gammazeta.mpf_bernoulli / n: 38 / prec: 63 / result: (0, 8000836714063350443, -14, 63)

[3]libmpf._normalize1 / x: (1, 4566906290182264926702312414573917679, -35, 122, 63, 'n') / result: (1, 7922319554165323461, 24, 63)

[3]libmpf._normalize1 / x: (1, 63765295601001271359627201855311449479, -36, 126, 63, 'n') / result: (1, 6913447201978595753, 27, 63)

[1]ctx_mp_python.convert / x: -523022617466601111760007224100074291200000000 / result: -5.23022617466601112e+44

[3]libmpf._normalize1 / x: (0, 691801045810570360535, -131, 70, 63, 'n') / result: (0, 2702347835197540471, -123, 62)

[3]libmpf._normalize1 / x: (0, 603703242691130114835, -128, 70, 63, 'n') / result: (0, 2358215791762227011, -120, 62)

[3]libmpf._normalize1 / x: (0, 5900210300623305227662678625869547639, -123, 123, 63, 'n') / result: (0, 5117616660845710995, -63, 63)

[3]libmpf._normalize1 / x: (0, 192792004846123508502564495053569859, -120, 118, 63, 'n') / result: (0, 334440816787204811, -61, 59)

[1]ctx_mp_python.convert / x: -37 / result: -37.0

[2]libmpf._normalize1 / x: (1, 37, 0, 6, 63, 'n') / result: (1, 37, 0, 6)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 168371663741178341221, 179, 68, 63, 'n') / result: (1, 5261614491911823163, 184, 63)

[3]libmpf._normalize1 / x: (0, 1294578253014320162723, 178, 71, 63, 'n') / result: (0, 632118287604648517, 189, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 52510998130874770532784456093669380465, -332, 126, 63, 'n') / result: (0, 2846626912643834445, -268, 62)

[3]libmpf._normalize1 / x: (0, 52363964582688354659999110660502136945, -332, 126, 63, 'n') / result: (0, 5677312416050472471, -269, 63)

[1]ctx_mp_python.convert / x: -38 / result: -38.0

[2]libmpf._normalize1 / x: (1, 19, 1, 5, 63, 'n') / result: (1, 19, 1, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 1010221009497018504577, 185, 70, 63, 'n') / result: (0, 7892351636695457067, 192, 63)

[3]libmpf._normalize1 / x: (1, 147555266727594256001, 185, 67, 63, 'n') / result: (1, 1152775521309330125, 192, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 19538976048697589035295055644816214675, -336, 124, 63, 'n') / result: (0, 2118420028014016331, -273, 61)

[3]libmpf._normalize1 / x: (0, 38968531782465752304636740158633251465, -337, 125, 63, 'n') / result: (0, 4224976681711979513, -274, 62)

[2]libmpf._normalize. / x: (0, 7892351636695457067, 192, 63, 63, 'n') / result: (0, 7892351636695457067, 192, 63)

[2]libmpf._normalize. / x: (1, 1152775521309330125, 192, 60, 63, 'n') / result: (1, 1152775521309330125, 192, 60)

[3]libmpf._normalize1 / x: (0, 38309081247390006520626459406648451479, -82, 125, 63, 'n') / result: (0, 4153478911434394321, -19, 62)

[3]libmpf._normalize1 / x: (0, 28460876124617715874752613830034525621, -82, 125, 63, 'n') / result: (0, 6171468745030270355, -20, 63)

[3]libmpf._normalize1 / x: (1, 5304203340691314808984868911, -38, 93, 63, 'n') / result: (1, 2469962155768328723, -7, 62)

[8]gammazeta.mpf_bernoulli / n: 40 / prec: 63 / result: (1, 2469962155768328723, -7, 62)

[3]libmpf._normalize1 / x: (1, 10258935726024787886246740041932382083, -26, 123, 63, 'n') / result: (1, 2224552080309046147, 36, 61)

[3]libmpf._normalize1 / x: (1, 15243294245731828806171935243201906665, -27, 124, 63, 'n') / result: (1, 6610725094823294987, 34, 63)

[1]ctx_mp_python.convert / x: -815915283247897734345611269596115894272000000000 / result: -8.15915283247897734e+47

[3]libmpf._normalize1 / x: (0, 1020085985714039523167, -132, 70, 63, 'n') / result: (0, 7969421763390933775, -125, 63)

[3]libmpf._normalize1 / x: (0, 757850095343746195231, -132, 70, 63, 'n') / result: (0, 2960351934936508575, -124, 62)

[3]libmpf._normalize1 / x: (0, 23600841202493220917034116962933738255, -125, 125, 63, 'n') / result: (0, 5117616660845710997, -63, 63)

[3]libmpf._normalize1 / x: (0, 3084672077537976138739880087320520863, -124, 122, 63, 'n') / result: (0, 5351053068595276981, -65, 63)

[1]ctx_mp_python.convert / x: -39 / result: -39.0

[2]libmpf._normalize1 / x: (1, 39, 0, 6, 63, 'n') / result: (1, 39, 0, 6)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 411551510748962536863, 192, 69, 63, 'n') / result: (1, 3215246177726269819, 199, 62)

[3]libmpf._normalize1 / x: (1, 665353401971527261155, 192, 70, 63, 'n') / result: (1, 649759181612819591, 202, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 14540633338565647653055684819368113365, -341, 124, 63, 'n') / result: (0, 1576498625498802851, -278, 61)

[3]libmpf._normalize1 / x: (0, 28999837605555908689747556349890625895, -342, 125, 63, 'n') / result: (0, 3144168693367054521, -279, 62)

[1]ctx_mp_python.convert / x: -40 / result: -40.0

[2]libmpf._normalize1 / x: (1, 5, 3, 3, 63, 'n') / result: (1, 5, 3, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 42402095456522414095, 202, 66, 63, 'n') / result: (1, 2650130966032650881, 206, 62)

[3]libmpf._normalize1 / x: (0, 248647547055733276415, 200, 68, 63, 'n') / result: (0, 971279480686458111, 208, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 10820936438002342439642926023055639165, -346, 124, 63, 'n') / result: (0, 2346416558881939127, -284, 62)

[3]libmpf._normalize1 / x: (0, 21581274497157885534481187003849602215, -347, 125, 63, 'n') / result: (0, 4679692938964918357, -285, 63)

[2]libmpf._normalize. / x: (1, 2650130966032650881, 206, 62, 63, 'n') / result: (1, 2650130966032650881, 206, 62)

[2]libmpf._normalize. / x: (0, 971279480686458111, 208, 60, 63, 'n') / result: (0, 971279480686458111, 208, 60)

[3]libmpf._normalize1 / x: (1, 15308890636964663416372811390715808141, -78, 124, 63, 'n') / result: (1, 6639172994776034339, -17, 63)

[3]libmpf._normalize1 / x: (0, 5830410885204372939533214646650150259, -79, 123, 63, 'n') / result: (0, 5057075318577371313, -19, 63)

[3]libmpf._normalize1 / x: (0, 7230088225199077963422274409, -33, 93, 63, 'n') / result: (0, 841693047573682615, 0, 60)

[8]gammazeta.mpf_bernoulli / n: 42 / prec: 63 / result: (0, 841693047573682615, 0, 60)

[3]libmpf._normalize1 / x: (1, 5588145751341933550450037651927316485, -17, 123, 63, 'n') / result: (1, 605867976377056581, 46, 60)

[3]libmpf._normalize1 / x: (0, 4256505136703039558702785165667823495, -19, 122, 63, 'n') / result: (0, 7383859386254631241, 40, 63)

[1]ctx_mp_python.convert / x: -1405006117752879898543142606244511569936384000000000 / result: -1.4050061177528799e+51

[3]libmpf._normalize1 / x: (0, 330422038886305673239, -133, 69, 63, 'n') / result: (0, 80669443087476971, -121, 57)

[3]libmpf._normalize1 / x: (1, 503366650900867889533, -136, 69, 63, 'n') / result: (1, 3932551960163030387, -129, 62)

[3]libmpf._normalize1 / x: (0, 1475052575155826307473673645362325739, -121, 121, 63, 'n') / result: (0, 5117616660845710997, -63, 63)

[3]libmpf._normalize1 / x: (0, 98709506481215236433246069284673120909, -129, 127, 63, 'n') / result: (0, 5351053068595276981, -65, 63)

[2]libmpf._normalize1 / x: (0, 43, 0, 6, 63, 'n') / result: (0, 43, 0, 6)

[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)

[2]libmpf._normalize. / x: (0, 1417966897368516542858453596502808, -108, 111, 88, 'd') / result: (0, 42258706610456602062536883, -83, 86)

[2]libmpf._normalize. / x: (0, 1433995762889275234017070647549308, -108, 111, 88, 'd') / result: (0, 85472808056430532575671115, -84, 87)

[2]libmpf._normalize. / x: (0, 2173799320384115228364, -73, 71, 63, 'n') / result: (0, 8491403595250450111, -65, 63)

[2]libmpf._normalize. / x: (1, 7410424996695744665048, -73, 73, 63, 'n') / result: (1, 7236743160835688149, -63, 63)

[3]libmpf._normalize1 / x: (0, 50436450902825097279, -65, 66, 63, 'n') / result: (0, 788069545356642145, -59, 60)

[3]libmpf._normalize1 / x: (0, 61925131493390551611, -63, 66, 63, 'n') / result: (0, 7740641436673818951, -60, 63)

[2]libmpf._normalize1 / x: (0, 85, 0, 7, 63, 'n') / result: (0, 85, 0, 7)

[2]libmpf._normalize. / x: (0, 42966686492116143688264533, -83, 86, 63, 'n') / result: (0, 5122028171076314889, -60, 63)

[3]libmpf._normalize1 / x: (0, 1062961328772023194637, -72, 70, 63, 'n') / result: (0, 1038048172628928901, -62, 60)

[3]libmpf._normalize1 / x: (0, 888916043834286157873, -76, 70, 63, 'n') / result: (0, 217020518514230019, -64, 58)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 43997886967926931136782886277, -93, 96, 73, 'd') / result: (0, 5244956847182146446321, -70, 73)

[3]libmpf._normalize1 / x: (1, 236023058123196590084445, -69, 78, 73, 'd') / result: (1, 3687860283174946720069, -63, 72)

[2]libmpf._normalize. / x: (1, 6488808337836659151659629045, -93, 93, 63, 'n') / result: (1, 6043173687380421117, -63, 63)

[2]libmpf._normalize. / x: (0, 7481649615575320405650306636, -93, 93, 63, 'n') / result: (0, 6967829182348512491, -63, 63)

[2]libmpf._normalize. / x: (0, 43997886967926931136782886277, -93, 96, 73, 'd') / result: (0, 5244956847182146446321, -70, 73)

[2]libmpf._normalize1 / x: (1, 5244956847182146446321, -70, 73, 73, 'd') / result: (1, 5244956847182146446321, -70, 73)

[3]libmpf._normalize1 / x: (0, 236023058123196590084445, -69, 78, 73, 'd') / result: (0, 3687860283174946720069, -63, 72)

[2]libmpf._normalize. / x: (0, 3641000115545236102645573, -88, 82, 67, 'n') / result: (0, 55557252739642884867, -72, 66)

[2]libmpf._normalize. / x: (1, 103820933405386546426554064700, -97, 97, 67, 'n') / result: (1, 48345389499043368933, -66, 66)

[2]libmpf._normalize. / x: (1, 119706393849205126490404906223, -97, 97, 67, 'n') / result: (1, 55742633458788099927, -66, 66)

[3]libmpf._normalize1 / x: (1, 2685937023194829565830857450350723636911, -138, 131, 63, 'n') / result: (1, 1137538576448079269, -67, 60)

[3]libmpf._normalize1 / x: (1, 3096907575443164303787309187655752104709, -138, 132, 63, 'n') / result: (1, 5246365502003585875, -69, 63)

[3]libmpf._normalize1 / x: (0, 238361524743057522913, -68, 68, 63, 'n') / result: (0, 7448797648220547591, -63, 63)

[3]libmpf._normalize1 / x: (1, 404267522019304950965, -69, 69, 63, 'n') / result: (1, 6316680031551639859, -63, 63)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[2]libmpf._normalize. / x: (0, 95385033025139186582876590967933443162, -126, 127, 73, 'd') / result: (0, 1323733248364255912539, -70, 71)

[3]libmpf._normalize1 / x: (0, 850345397490971782847, -70, 70, 63, 'n') / result: (0, 6643323417898217053, -63, 63)

[3]libmpf._normalize1 / x: (0, 721104270235644555263, -70, 70, 63, 'n') / result: (0, 176050847225499159, -58, 58)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (1, 6043173687380421117, -64, 63, 63, 'n') / result: (1, 6043173687380421117, -64, 63)

[2]libmpf._normalize1 / x: (0, 6967829182348512491, -64, 63, 63, 'n') / result: (0, 6967829182348512491, -64, 63)

[2]libmpf._normalize1 / x: (0, 7243473148416012989, -64, 63, 63, 'n') / result: (0, 7243473148416012989, -64, 63)

[3]libmpf._normalize1 / x: (0, 18235083404780458667, -64, 64, 63, 'n') / result: (0, 4558770851195114667, -62, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 1311492687106850373951412617222911223, -127, 120, 63, 'n') / result: (1, 1137538576448079269, -67, 60)

[3]libmpf._normalize1 / x: (0, 1512161902071857570154120380868667329, -127, 121, 63, 'n') / result: (0, 5246365502003585875, -69, 63)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 90, 0, 7, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 236086447590161364375, -68, 68, 63, 'n') / result: (0, 7377701487192542637, -63, 63)

[3]libmpf._normalize1 / x: (0, 51189235940163567105, -66, 66, 63, 'n') / result: (0, 99978976445631967, -57, 57)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (0, 45364857062155727101368303648346569585, -128, 126, 63, 'n') / result: (0, 2459233829064180879, -64, 62)

[3]libmpf._normalize1 / x: (0, 614762197081336112733208904293492235, -122, 119, 63, 'n') / result: (0, 8531539323360594517, -66, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 2459233829064180879, -65, 62, 63, 'n') / result: (1, 2459233829064180879, -65, 62)

[2]libmpf._normalize1 / x: (1, 8531539323360594517, -67, 63, 63, 'n') / result: (1, 8531539323360594517, -67, 63)

[3]libmpf._normalize1 / x: (0, 12027712467767845099, -65, 64, 63, 'n') / result: (0, 3006928116941961275, -63, 62)

[3]libmpf._normalize1 / x: (0, 137349127914883074827, -67, 67, 63, 'n') / result: (0, 8584320494680192177, -63, 63)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 2025, 2, 11, 63, 'n') / result: (1, 2025, 2, 11)

[2]libmpf._normalize1 / x: (0, 45, 1, 6, 63, 'n') / result: (0, 45, 1, 6)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 246869211690701246843570097011376111, -131, 118, 63, 'n') / result: (1, 856499634031494979, -73, 60)

[3]libmpf._normalize1 / x: (0, 1138568961559986876226231752569381625, -133, 120, 63, 'n') / result: (0, 987551153318322047, -73, 60)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 6075, 2, 13, 63, 'n') / result: (0, 6075, 2, 13)

[2]libmpf._normalize1 / x: (0, 182205, 2, 18, 63, 'n') / result: (0, 182205, 2, 18)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 185877994684763291738487831649574601, -137, 118, 63, 'n') / result: (1, 2579575368377208407, -81, 62)

[3]libmpf._normalize1 / x: (0, 214318863352468117865113005276928893, -137, 118, 63, 'n') / result: (0, 5948543417635069271, -82, 63)

[2]libmpf._normalize. / x: (0, 24300, 0, 15, 63, 'n') / result: (0, 6075, 2, 13)

[2]libmpf._normalize. / x: (0, 728820, 0, 20, 63, 'n') / result: (0, 182205, 2, 18)

[3]libmpf._normalize1 / x: (1, 1115196194135980878667605, -80, 80, 63, 'n') / result: (1, 8508271744811865835, -63, 63)

[3]libmpf._normalize1 / x: (1, 903885658728205469773545, -80, 80, 63, 'n') / result: (1, 6896100301576274641, -63, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 10463327425741247503283171548625838235, -128, 123, 63, 'n') / result: (0, 4537744930566328445, -67, 62)

[3]libmpf._normalize1 / x: (0, 8480706491320586393164825700680339681, -128, 123, 63, 'n') / result: (0, 7355840321681359617, -68, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[3]libmpf._normalize1 / x: (1, 774441801483320054613, -79, 70, 63, 'n') / result: (1, 6050326574088437927, -72, 63)

[2]libmpf._normalize. / x: (1, 313849187058404676992, -78, 69, 63, 'n') / result: (1, 2451946773893786539, -71, 62)

[3]libmpf._normalize1 / x: (0, 1533496869300195734873, -72, 71, 63, 'n') / result: (0, 5990222145703889589, -64, 63)

[3]libmpf._normalize1 / x: (0, 2195134099864235410773, -71, 71, 63, 'n') / result: (0, 8574742577594669573, -63, 63)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 16380225, 2, 24, 63, 'n') / result: (0, 16380225, 2, 24)

[2]libmpf._normalize1 / x: (1, 1093365, 2, 21, 63, 'n') / result: (1, 1093365, 2, 21)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 559820783991757678573638704298569733, -145, 119, 63, 'n') / result: (1, 7769074050641945319, -89, 63)

[3]libmpf._normalize1 / x: (0, 1290955976899572662831108984292646149, -146, 120, 63, 'n') / result: (0, 4478903279160522745, -88, 62)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 81961875, 3, 27, 63, 'n') / result: (1, 81961875, 3, 27)

[2]libmpf._normalize1 / x: (1, 734923395, 3, 30, 63, 'n') / result: (1, 734923395, 3, 30)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1686048478845764302331069745586331061, -153, 121, 63, 'n') / result: (1, 2924827877888732355, -94, 62)

[3]libmpf._normalize1 / x: (0, 972013912018501769612559825211282155, -152, 120, 63, 'n') / result: (0, 6744701408618198957, -95, 63)

[2]libmpf._normalize. / x: (1, 655695000, 0, 30, 63, 'n') / result: (1, 81961875, 3, 27)

[2]libmpf._normalize. / x: (1, 5879387160, 0, 33, 63, 'n') / result: (1, 734923395, 3, 30)

[3]libmpf._normalize1 / x: (0, 5436287611331032126641830265, -92, 93, 63, 'n') / result: (0, 1265734343633761659, -60, 61)

[3]libmpf._normalize1 / x: (0, 3746240493851776483527126075, -92, 92, 63, 'n') / result: (0, 6977916683725596375, -63, 63)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (0, 4447367143298427050378761603503590577, -127, 122, 63, 'n') / result: (0, 60273063982560079, -61, 56)

[3]libmpf._normalize1 / x: (0, 24518065377591267151700555050002589125, -130, 125, 63, 'n') / result: (0, 2658253974752608143, -67, 62)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (1, 702232092650854637751, -84, 70, 63, 'n') / result: (1, 5486188223834801857, -77, 63)

[3]libmpf._normalize1 / x: (1, 483920368026074797943, -84, 69, 63, 'n') / result: (1, 3780627875203709359, -77, 62)

[3]libmpf._normalize1 / x: (0, 49066413629382428711231, -77, 76, 63, 'n') / result: (0, 5989552444992972255, -64, 63)

[3]libmpf._normalize1 / x: (0, 140484801763435862574673, -77, 77, 63, 'n') / result: (0, 8574511826381583409, -63, 63)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 65733296175, 3, 36, 63, 'n') / result: (1, 65733296175, 3, 36)

[2]libmpf._normalize1 / x: (0, 11051185725, 3, 34, 63, 'n') / result: (0, 11051185725, 3, 34)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 634747662624287737263912408797564745, -158, 119, 63, 'n') / result: (1, 1101111671675758063, -99, 60)

[3]libmpf._normalize1 / x: (0, 1463738596921979135378262939403890183, -159, 121, 63, 'n') / result: (0, 5078363413547820391, -101, 63)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 694503246150, 4, 40, 63, 'n') / result: (0, 347251623075, 5, 39)

[2]libmpf._normalize. / x: (0, 2924844770700, 4, 42, 63, 'n') / result: (0, 731211192675, 6, 40)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 238963825929143618721883464575893197, -163, 118, 63, 'n') / result: (1, 829072317497041365, -105, 60)

[3]libmpf._normalize1 / x: (0, 1102109061211843113663383075072517429, -165, 120, 63, 'n') / result: (0, 1911854461570944147, -106, 61)

[2]libmpf._normalize. / x: (0, 11112051938400, 0, 44, 63, 'n') / result: (0, 347251623075, 5, 39)

[2]libmpf._normalize. / x: (0, 46797516331200, 0, 46, 63, 'n') / result: (0, 731211192675, 6, 40)

[2]libmpf._normalize. / x: (1, 1685866088963709359360344020600, -100, 101, 63, 'n') / result: (1, 6133145103244566997, -62, 63)

[3]libmpf._normalize1 / x: (1, 1761013267499660979835918613475, -101, 101, 63, 'n') / result: (1, 6406528946171096249, -63, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 7542437205765164822293178868913136677, -127, 123, 63, 'n') / result: (0, 6542021443460871463, -67, 63)

[3]libmpf._normalize1 / x: (0, 7878639991388691249030215439119892809, -128, 123, 63, 'n') / result: (0, 6833630875915835999, -68, 63)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (1, 680536376696272495555, -89, 70, 63, 'n') / result: (1, 664586305367453609, -79, 60)

[3]libmpf._normalize1 / x: (1, 710871163625428933381, -90, 70, 63, 'n') / result: (1, 2776840482911831771, -82, 62)

[3]libmpf._normalize1 / x: (0, 196264989931224347398231, -79, 78, 63, 'n') / result: (0, 5989532163428477399, -64, 63)

[3]libmpf._normalize1 / x: (0, 4495510879589464690506021, -82, 82, 63, 'n') / result: (0, 8574506529978684789, -63, 63)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (0, 129187253319975, 5, 47, 63, 'n') / result: (0, 129187253319975, 5, 47)

[2]libmpf._normalize. / x: (1, 20744801387100, 6, 45, 63, 'n') / result: (1, 5186200346775, 8, 43)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 179925704229002254078604683567735935, -169, 118, 63, 'n') / result: (1, 4993941488923355045, -114, 63)

[3]libmpf._normalize1 / x: (0, 414911646573870348629869524559748793, -170, 119, 63, 'n') / result: (0, 2879027895071539421, -113, 62)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 595945284529725, 8, 50, 63, 'n') / result: (1, 595945284529725, 8, 50)

[2]libmpf._normalize1 / x: (1, 5647467988302075, 6, 53, 63, 'n') / result: (1, 5647467988302075, 6, 53)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1083787771355872400897758464334095855, -178, 120, 63, 'n') / result: (1, 7520288359790464067, -121, 63)

[3]libmpf._normalize1 / x: (0, 624808126605357701387007800820078999, -177, 119, 63, 'n') / result: (0, 8670954601627224609, -121, 63)

[2]libmpf._normalize. / x: (1, 152561992839609600, 0, 58, 63, 'n') / result: (1, 595945284529725, 8, 50)

[2]libmpf._normalize. / x: (1, 361437951251332800, 0, 59, 63, 'n') / result: (1, 5647467988302075, 6, 53)

[3]libmpf._normalize1 / x: (0, 66895660085993950461060314989329975, -115, 116, 63, 'n') / result: (0, 1856727551874214079, -60, 61)

[3]libmpf._normalize1 / x: (0, 21800929745873104679973389581028925, -115, 115, 63, 'n') / result: (0, 4840778832420756723, -63, 63)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (0, 10378963019402697769442072718612578395, -126, 123, 63, 'n') / result: (0, 1125289425378311563, -63, 60)

[3]libmpf._normalize1 / x: (0, 27059578254271586899344934339381179615, -129, 125, 63, 'n') / result: (0, 1466902676491138401, -65, 61)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (1, 665933818415795936781, -94, 70, 63, 'n') / result: (1, 1300651989093351439, -85, 61)

[3]libmpf._normalize1 / x: (1, 434048378385713422213, -95, 69, 63, 'n') / result: (1, 3391002956138386111, -88, 62)

[3]libmpf._normalize1 / x: (0, 12560958054946369140916209, -85, 84, 63, 'n') / result: (0, 1497382885807319777, -62, 61)

[3]libmpf._normalize1 / x: (0, 287712692902722784063548737, -88, 88, 63, 'n') / result: (0, 8574506428918921473, -63, 63)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize1 / x: (1, 243409044352058325, 7, 58, 63, 'n') / result: (1, 243409044352058325, 7, 58)

[2]libmpf._normalize1 / x: (0, 265367514325419675, 6, 58, 63, 'n') / result: (0, 265367514325419675, 6, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1632056879218254909421255879192227273, -185, 121, 63, 'n') / result: (1, 1415583691254675589, -125, 61)

[3]libmpf._normalize1 / x: (0, 1881775063658489077090432603603337571, -185, 121, 63, 'n') / result: (0, 6528718758872263235, -127, 63)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 14375628588164468625, 7, 64, 63, 'n') / result: (0, 898476786760279289, 11, 60)

[3]libmpf._normalize1 / x: (0, 20579976420058150875, 7, 65, 63, 'n') / result: (0, 5144994105014537719, 9, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 307210706676377394696717063970306191, -189, 118, 63, 'n') / result: (1, 8526809999086987077, -134, 63)

[3]libmpf._normalize1 / x: (0, 1416865930284038834512596071907051465, -191, 121, 63, 'n') / result: (0, 4915741183150880553, -133, 63)

[2]libmpf._normalize. / x: (0, 1840080459285051983872, 0, 71, 63, 'n') / result: (0, 898476786760279289, 11, 60)

[2]libmpf._normalize. / x: (0, 2634236981767443312128, 0, 72, 63, 'n') / result: (0, 5144994105014537719, 9, 63)

[3]libmpf._normalize1 / x: (1, 40613741107678661688562394513189575113, -124, 125, 63, 'n') / result: (1, 4403350634170904227, -61, 62)

[3]libmpf._normalize1 / x: (1, 8536952437620950469402794723211922827, -125, 123, 63, 'n') / result: (1, 3702312951709622909, -64, 62)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (0, 5139944158499259198968663321904585337, -123, 122, 63, 'n') / result: (0, 8916381796958519621, -64, 63)

[3]libmpf._normalize1 / x: (0, 4321636728495294339905858220298178279, -126, 122, 63, 'n') / result: (0, 3748422343782196967, -66, 62)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (1, 639589817096002252031, -99, 70, 63, 'n') / result: (1, 2498397723031258797, -91, 62)

[3]libmpf._normalize1 / x: (1, 537763594213971892213, -102, 69, 63, 'n') / result: (1, 262579879987290963, -91, 58)

[3]libmpf._normalize1 / x: (0, 803901313018169901922367827, -91, 90, 63, 'n') / result: (0, 5989531524614765509, -64, 63)

[3]libmpf._normalize1 / x: (0, 2301701542959202392645655725, -91, 91, 63, 'n') / result: (0, 4287253213970367597, -62, 62)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 211758245416928052997, 10, 68, 63, 'n') / result: (0, 827180646159875207, 18, 60)

[3]libmpf._normalize1 / x: (1, 380046578388860458949, 9, 69, 63, 'n') / result: (1, 5938227787325944671, 15, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1850492727274179130349737233258464463, -198, 121, 63, 'n') / result: (1, 3210093176126865723, -139, 62)

[3]libmpf._normalize1 / x: (0, 1066816700449158651778946240635920507, -197, 120, 63, 'n') / result: (0, 7402527899333090715, -140, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 306924921445341520131, 16, 69, 63, 'n') / result: (1, 1198925474395865313, 24, 61)

[3]libmpf._normalize1 / x: (1, 131077832946799703247, 17, 67, 63, 'n') / result: (1, 8192364559174981453, 21, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 696656085562043907873393021148738737, -203, 120, 63, 'n') / result: (1, 4834022665226338971, -146, 63)

[3]libmpf._normalize1 / x: (0, 1606500443029321263832375695703173585, -204, 121, 63, 'n') / result: (0, 5573668065380209479, -146, 63)

[2]libmpf._normalize. / x: (1, 20114631651841901863108608, 0, 85, 63, 'n') / result: (1, 1198925474395865313, 24, 61)

[2]libmpf._normalize. / x: (1, 17180633720002930704121856, 0, 84, 63, 'n') / result: (1, 8192364559174981453, 21, 63)

[3]libmpf._normalize1 / x: (0, 92026584060601040840453511985871896371, -125, 127, 63, 'n') / result: (0, 311798194890386071, -57, 59)

[3]libmpf._normalize1 / x: (1, 13857225074439574535576506927263110553, -125, 124, 63, 'n') / result: (1, 1502403353032799261, -62, 61)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (0, 1677567938604706473881413770704861405, -119, 121, 63, 'n') / result: (0, 5820232971287206659, -61, 63)

[3]libmpf._normalize1 / x: (1, 8083381293423085145765442737991061855, -124, 123, 63, 'n') / result: (1, 876401955935799569, -61, 60)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (1, 587248383991774471821, -104, 69, 63, 'n') / result: (1, 4587877999935738061, -97, 62)

[3]libmpf._normalize1 / x: (0, 707415850725583359515, -107, 70, 63, 'n') / result: (0, 1381671583448404999, -98, 61)

[3]libmpf._normalize1 / x: (0, 51449684028574995719791849267, -97, 96, 63, 'n') / result: (0, 5989531524080666215, -64, 63)

[3]libmpf._normalize1 / x: (0, 294617797500159577858858128391, -98, 98, 63, 'n') / result: (0, 4287253213990473565, -62, 62)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 306312280494289169109, 22, 69, 63, 'n') / result: (1, 4786129382723268267, 28, 63)

[3]libmpf._normalize1 / x: (0, 969727080834297784249, 21, 70, 63, 'n') / result: (0, 7575992819017951439, 28, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1049082105316960237715777906357770449, -210, 120, 63, 'n') / result: (1, 1819867356320504083, -151, 61)

[3]libmpf._normalize1 / x: (0, 1209600333575018363241248484610150101, -210, 120, 63, 'n') / result: (0, 4196644190403922431, -152, 62)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[2]libmpf._normalize. / x: (0, 374422582534870692624, 29, 69, 63, 'n') / result: (0, 1462588213026838643, 37, 61)

[2]libmpf._normalize. / x: (0, 162343872489421411942, 29, 68, 63, 'n') / result: (0, 5073246015294419123, 34, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 394948557295796795331947578690667577, -215, 119, 63, 'n') / result: (1, 5481012273153518179, -159, 63)

[3]libmpf._normalize1 / x: (0, 910757898221190296975087907367656189, -216, 120, 63, 'n') / result: (0, 1579913106975594327, -157, 61)

[2]libmpf._normalize. / x: (0, 201016593358891300542528618496, 0, 98, 63, 'n') / result: (0, 1462588213026838643, 37, 61)

[2]libmpf._normalize. / x: (0, 87157702881007383778408005632, 0, 97, 63, 'n') / result: (0, 5073246015294419123, 34, 63)

[3]libmpf._normalize1 / x: (1, 24048215766814909172610136340359497415, -123, 125, 63, 'n') / result: (1, 2607312777878088543, -60, 62)

[3]libmpf._normalize1 / x: (0, 46137869537255789674592304027739967335, -125, 126, 63, 'n') / result: (0, 625284729826818779, -59, 60)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (0, 21319214810923903545751903647249852135, -120, 125, 63, 'n') / result: (0, 2311433901368883887, -57, 62)

[3]libmpf._normalize1 / x: (1, 5112765751110728898307897715999233155, -119, 122, 63, 'n') / result: (1, 4434617387810987301, -59, 62)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (1, 497532734048379947943, -109, 69, 63, 'n') / result: (1, 7773948969505936687, -103, 63)

[3]libmpf._normalize1 / x: (0, 954544844267198940339, -111, 70, 63, 'n') / result: (0, 7457381595837491721, -104, 63)

[3]libmpf._normalize1 / x: (0, 3292779777821025777023083457233, -103, 102, 63, 'n') / result: (0, 1497382881016631371, -62, 61)

[3]libmpf._normalize1 / x: (0, 18855539040017670365636828457481, -104, 104, 63, 'n') / result: (0, 8574506427984338355, -63, 63)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 140540777906638541955, 35, 67, 63, 'n') / result: (0, 1097974827395613609, 42, 60)

[3]libmpf._normalize1 / x: (1, 1129162203608740109805, 34, 70, 63, 'n') / result: (1, 2205394928923320527, 43, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1189492125502635054091963565104015401, -223, 120, 63, 'n') / result: (1, 8253759658395886199, -166, 63)

[3]libmpf._normalize1 / x: (0, 342873561683271641221810289309502213, -221, 119, 63, 'n') / result: (0, 4758326533950025267, -165, 63)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 103634671111131878151, 44, 67, 63, 'n') / result: (1, 404822934027858899, 52, 59)

[3]libmpf._normalize1 / x: (1, 14122548370029483973, 43, 64, 63, 'n') / result: (1, 3530637092507370993, 45, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1791235200756909257934381151633607781, -230, 121, 63, 'n') / result: (1, 1553648876874519755, -170, 61)

[3]libmpf._normalize1 / x: (0, 1032654491657853413518753944099890073, -229, 120, 63, 'n') / result: (0, 895684994625887109, -169, 60)

[2]libmpf._normalize. / x: (1, 1823160414838896222910616283643904, 0, 111, 63, 'n') / result: (1, 404822934027858899, 52, 59)

[2]libmpf._normalize. / x: (1, 124223249173411307961336176050176, 0, 107, 63, 'n') / result: (1, 3530637092507370993, 45, 62)

[3]libmpf._normalize1 / x: (0, 43415311259495992464530381531794412917, -124, 126, 63, 'n') / result: (0, 2353548739333996839, -60, 62)

[3]libmpf._normalize1 / x: (1, 87338649483804137452406607780795978981, -125, 127, 63, 'n') / result: (1, 147957427362953791, -56, 58)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (0, 4661310157768225988979904269528873711, -115, 122, 63, 'n') / result: (0, 126345064992026501, -50, 57)

[3]libmpf._normalize1 / x: (1, 293036403945199003521957280387769159, -111, 118, 63, 'n') / result: (1, 2033348516958237453, -54, 61)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (1, 728059680989552380631, -115, 70, 63, 'n') / result: (1, 2843983128865438987, -107, 62)

[3]libmpf._normalize1 / x: (0, 732319398808048105653, -115, 70, 63, 'n') / result: (0, 5721245303187875825, -108, 63)

[3]libmpf._normalize1 / x: (0, 52684476445133568447474544509685, -107, 106, 63, 'n') / result: (0, 5989531524066202161, -64, 63)

[3]libmpf._normalize1 / x: (0, 301688624640288447112195992627185, -108, 108, 63, 'n') / result: (0, 8574506427984500963, -63, 63)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 281568683059478787427, 46, 68, 63, 'n') / result: (0, 8799021345608712107, 51, 63)

[3]libmpf._normalize1 / x: (0, 4723581030573559823361, 45, 73, 63, 'n') / result: (0, 4612872100169492015, 55, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 337173684848359389705846044229525345, -234, 119, 63, 'n') / result: (1, 18278222080876703, -170, 55)

[3]libmpf._normalize1 / x: (0, 194382021959125348409187287952925071, -233, 118, 63, 'n') / result: (0, 5395184908805343527, -178, 63)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 3242076720011555841837, 52, 72, 63, 'n') / result: (0, 1583045273443142501, 63, 61)

[3]libmpf._normalize1 / x: (1, 1060209542976798894975, 52, 70, 63, 'n') / result: (1, 8282887054506241367, 59, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 3966749233510110467127600520347357, -234, 112, 63, 'n') / result: (1, 880795266391423241, -182, 60)

[3]libmpf._normalize1 / x: (0, 1170865826389084451560972055190737013, -242, 120, 63, 'n') / result: (0, 8124513745024517311, -185, 63)

[2]libmpf._normalize. / x: (0, 14601015508150602782394445109351415808, 0, 124, 63, 'n') / result: (0, 1583045273443142501, 63, 61)

[2]libmpf._normalize. / x: (1, 4774759302684955367902657857345028096, 0, 122, 63, 'n') / result: (1, 8282887054506241367, 59, 63)

[3]libmpf._normalize1 / x: (1, 111180934543679030475633637733646210711, -126, 127, 63, 'n') / result: (1, 6027130538561273521, -62, 63)

[3]libmpf._normalize1 / x: (0, 33018473875833709336547268893628080069, -123, 125, 63, 'n') / result: (0, 7159740221666956289, -61, 63)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (0, 14362433535752795922656663555984113133, -114, 124, 63, 'n') / result: (0, 194647270520523077, -48, 58)

[3]libmpf._normalize1 / x: (1, 17061401343315577122731249700961983997, -113, 124, 63, 'n') / result: (1, 231225105025873155, -47, 58)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (1, 755637295048375868003, -121, 70, 63, 'n') / result: (1, 5903416367565436469, -114, 63)

[3]libmpf._normalize1 / x: (0, 897635566333847805849, -120, 70, 63, 'n') / result: (0, 7012777861983185983, -113, 63)

[3]libmpf._normalize1 / x: (0, 6743612984977090858365288830273995, -114, 113, 63, 'n') / result: (0, 2994765762033098459, -63, 62)

[3]libmpf._normalize1 / x: (0, 9654035988489237320850483600632895, -113, 113, 63, 'n') / result: (0, 1071813303498063399, -60, 60)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 613352799016138521667, 60, 70, 63, 'n') / result: (1, 4791818742313582201, 67, 63)

[3]libmpf._normalize1 / x: (1, 2122210339722506615467, 59, 71, 63, 'n') / result: (1, 8289884139541041467, 67, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 191150645417146029090630472656471579, -246, 118, 63, 'n') / result: (1, 5305496192851867051, -191, 63)

[3]libmpf._normalize1 / x: (0, 1763186185621209527002905790301358909, -249, 121, 63, 'n') / result: (0, 6117280937430224799, -191, 63)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 325126598856211044005, 68, 69, 63, 'n') / result: (1, 5080103107128297563, 74, 63)

[3]libmpf._normalize1 / x: (0, 298530684799521613715, 68, 69, 63, 'n') / result: (0, 2332270974996262607, 75, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1151401534747985492729795675821203969, -255, 120, 63, 'n') / result: (1, 7989453090412223323, -198, 63)

[3]libmpf._normalize1 / x: (0, 1327575480938322467418508191564041181, -255, 120, 63, 'n') / result: (0, 4605952705829816319, -197, 62)

[2]libmpf._normalize. / x: (1, 95960434570498460149719141124255244091392, 0, 137, 63, 'n') / result: (1, 5080103107128297563, 74, 63)

[2]libmpf._normalize. / x: (0, 88110706250336471208114733133326792523776, 0, 137, 63, 'n') / result: (0, 2332270974996262607, 75, 62)

[3]libmpf._normalize1 / x: (1, 2382073763190603564782894962439672683, -124, 121, 63, 'n') / result: (1, 8264478557030314909, -66, 63)

[2]libmpf._normalize. / x: (1, 42032284201034658918239439373903513658, -123, 125, 63, 'n') / result: (1, 9114298769057984439, -61, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (1, 7202194426535935461833306393982875513, -113, 123, 63, 'n') / result: (1, 3123453937565301197, -52, 62)

[3]libmpf._normalize1 / x: (1, 7942782033169230473798663360432907723, -108, 123, 63, 'n') / result: (1, 6889265228752729295, -48, 63)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (0, 419931235160951379791, -129, 69, 63, 'n') / result: (0, 6561425549389865309, -123, 63)

[3]libmpf._normalize1 / x: (0, 463111945091881851719, -124, 69, 63, 'n') / result: (0, 7236124142060653933, -118, 63)

[3]libmpf._normalize1 / x: (0, 3452729848308270526209909297144275293, -123, 122, 63, 'n') / result: (0, 5989531524066196929, -64, 63)

[3]libmpf._normalize1 / x: (0, 308929151631655601517824664945511789, -118, 118, 63, 'n') / result: (0, 8574506427984507393, -63, 63)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 526490940749021518083, 74, 69, 63, 'n') / result: (0, 2056605237300865305, 82, 61)

[2]libmpf._normalize. / x: (0, 179626949345851875588, 75, 68, 63, 'n') / result: (0, 701667770882233889, 83, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1733875252326378153571427631218533137, -262, 121, 63, 'n') / result: (1, 187987131539111137, -199, 58)

[3]libmpf._normalize1 / x: (0, 999586244471207504826201098485880061, -261, 120, 63, 'n') / result: (0, 6936022898190782221, -204, 63)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 40527441769091531655, 83, 66, 63, 'n') / result: (0, 5065930221136441457, 86, 63)

[3]libmpf._normalize1 / x: (1, 107983926637948084283, 83, 67, 63, 'n') / result: (1, 1687248853717938817, 89, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 40797064760620662434421585222621603, -263, 115, 63, 'n') / result: (1, 4529384063436465983, -210, 62)

[3]libmpf._normalize1 / x: (0, 1505259285791936007147691485129692199, -268, 121, 63, 'n') / result: (0, 5222417240990706613, -210, 63)

[2]libmpf._normalize. / x: (0, 391957366060665095045468478518816908821659648, 0, 149, 63, 'n') / result: (0, 5065930221136441457, 86, 63)

[2]libmpf._normalize. / x: (1, 1044356456127899007906925738802363555857301504, 0, 150, 63, 'n') / result: (1, 1687248853717938817, 89, 61)

[3]libmpf._normalize1 / x: (0, 47546596417890393080922269533198917337, -124, 126, 63, 'n') / result: (0, 2577506156528413361, -60, 62)

[3]libmpf._normalize1 / x: (0, 87593985881170631663823918338703352029, -124, 127, 63, 'n') / result: (0, 4748479489451490065, -60, 63)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (1, 15703568849750167927794108615802471187, -106, 124, 63, 'n') / result: (1, 1702584346267482603, -43, 61)

[3]libmpf._normalize1 / x: (1, 28930318713442806440370002009115874355, -106, 125, 63, 'n') / result: (1, 6273262879962546871, -44, 63)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (0, 849263744824360591055, -131, 70, 63, 'n') / result: (0, 3317436503220158559, -123, 62)

[3]libmpf._normalize1 / x: (0, 782289396907748060295, -130, 70, 63, 'n') / result: (0, 6111635913341781721, -123, 63)

[3]libmpf._normalize1 / x: (0, 3452729848308270529306988526312226911, -123, 122, 63, 'n') / result: (0, 5989531524066196935, -64, 63)

[3]libmpf._normalize1 / x: (0, 9885732852212979254863275071633475289, -123, 123, 63, 'n') / result: (0, 4287253213992253699, -62, 62)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (1, 1331335569763054101751, 86, 71, 63, 'n') / result: (1, 5200529569386930085, 94, 63)

[3]libmpf._normalize1 / x: (1, 72739965409089494401, 87, 66, 63, 'n') / result: (1, 568280979758511675, 94, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 982969277997071960719270301730943677, -274, 120, 63, 'n') / result: (1, 6820719530821972303, -217, 63)

[3]libmpf._normalize1 / x: (0, 1133371697537457699399864174426415647, -274, 120, 63, 'n') / result: (0, 7864345962903652311, -217, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 45, 1, 6, 63, 'n') / result: (1, 45, 1, 6)

[3]libmpf._normalize1 / x: (0, 36833710743510135645, 95, 65, 63, 'n') / result: (0, 9208427685877533911, 97, 63)

[3]libmpf._normalize1 / x: (0, 240843202379513993925, 95, 68, 63, 'n') / result: (0, 3763175037179906155, 101, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1480236089219120128906966856989163757, -281, 121, 63, 'n') / result: (1, 641950073489126805, -220, 60)

[3]libmpf._normalize1 / x: (0, 1706724438644642182551635521054923909, -281, 121, 63, 'n') / result: (0, 2960694950740198517, -222, 62)

[2]libmpf._normalize. / x: (0, 1459133610395112666034124733989148806497479688192, 0, 160, 63, 'n') / result: (0, 9208427685877533911, 97, 63)

[2]libmpf._normalize. / x: (0, 9540782189289995063584693628700141035534742978560, 0, 163, 63, 'n') / result: (0, 3763175037179906155, 101, 62)

[3]libmpf._normalize1 / x: (1, 50477804154988820681550861878687272895, -123, 126, 63, 'n') / result: (1, 5472814492713670175, -60, 63)

[3]libmpf._normalize1 / x: (1, 127345966113051782701585891564339615613, -125, 127, 63, 'n') / result: (1, 3451719327925904289, -60, 62)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (1, 34311760119712141920918385845410438325, -102, 125, 63, 'n') / result: (1, 930022121589834899, -37, 60)

[3]libmpf._normalize1 / x: (1, 21640522575367322402845237165711242891, -102, 125, 63, 'n') / result: (1, 2346270158993485431, -39, 62)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (0, 730825726737107219131, -135, 70, 63, 'n') / result: (0, 5709575990133650149, -128, 63)

[3]libmpf._normalize1 / x: (0, 460933819277537023405, -135, 69, 63, 'n') / result: (0, 7202090926211515991, -129, 63)

[3]libmpf._normalize1 / x: (0, 110487355145864656948055705171337147109, -128, 127, 63, 'n') / result: (0, 5989531524066196935, -64, 63)

[3]libmpf._normalize1 / x: (0, 632686902541630672296241878531070936663, -129, 129, 63, 'n') / result: (0, 4287253213992253699, -62, 62)

[2]libmpf._normalize. / x: (0, 5989531524066196935, -64, 63, 63, 'n') / result: (0, 5989531524066196935, -64, 63)

[2]libmpf._normalize. / x: (0, 4287253213992253699, -62, 62, 63, 'n') / result: (0, 4287253213992253699, -62, 62)

[3]libmpf._normalize1 / x: (0, 31207756975478745575, -64, 65, 63, 'n') / result: (0, 3900969621934843197, -61, 62)

[3]libmpf._normalize1 / x: (0, 35249818960687529503, -62, 65, 63, 'n') / result: (0, 1101556842521485297, -57, 60)

[3]libmpf._normalize1 / x: (0, 31207756975478745575, -64, 65, 63, 'n') / result: (0, 3900969621934843197, -61, 62)

[3]libmpf._normalize1 / x: (0, 35249818960687529503, -62, 65, 63, 'n') / result: (0, 1101556842521485297, -57, 60)

[3]libmpf._normalize1 / x: (0, 3900969621934843197, -61, 62, 53, 'n') / result: (0, 7619081292841491, -52, 53)

[3]libmpf._normalize1 / x: (0, 1101556842521485297, -57, 60, 53, 'n') / result: (0, 134467388003111, -44, 47)

zeta_ / result: (1.69177589556069 + 7.64358605937963j) / count: 14897
zeta / count: 0 / s: Complex { re: 0.0, im: 90.0 }
gamma_ / s: (1.0, -90.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-90j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-90j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-90.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-6333186975989760, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6333186975989760 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=6333186975989760, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 6333186975989760, -46, 53, 53, 'd') / result: (1, 45, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 6333186975989760, -46, 53, 53, 'd') / result: (1, 45, 1, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 45, 1, 6)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-90.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 45, 1, 6)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 45, 1, 6), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 45, 1, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 45, 1, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 45, 1, 6), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=415051741658464911360, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=900000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=900000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-90j) / result: (1.0 - 90.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-90j) / result: (1.0 - 90.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 45, 1, 6)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 45, 1, 6)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 45, 1, 6)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 45, 1, 6), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=630 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 45, 1, 6), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=9671406556917033397649408, y=-870426590122533005788446720, prec=83 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=83, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 45, 1, 6)), prec=83, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 45, 1, 6), prec=83, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 45, 1, 6), t=(1, 45, 1, 6), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 2025, 2, 11), prec=103, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8101 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=8101, exp=0, bc=13, prec=103, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 8101, 0, 13, 103, 'd') / result: (0, 8101, 0, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 8101, 0, 13, 103, 'd') / result: (0, 8101, 0, 13)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 8101, 0, 13), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8100 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=8100, exp=0, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8100, 0, 13, 10, 'd') / result: (0, 253, 5, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8100, 0, 13, 10, 'd') / result: (0, 253, 5, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 8101, 0, 13), prec=83, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=8101, n=90 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=10028552258250865606957805338624, prec=103 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=352630533451765478425533545186252216313315328, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125822778811676020465311708781145672545415406151728972512437386153969352744170944009863168 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126566565263540412085044255089981975680816525197082473039643068171727616203594837579005952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126940105670676066189257028616912172569940077557392690279939266882985615546882612957020160 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127127289087273777152031694085277481130791315380453721417276934230732360616726482816860160 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127220984276536313179391054947498669991443477172856060918354790430769044462005013299855360 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127267857763652477665683024769497965661595626236002702847537189674026216320716970789961728 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127291300983114202019661205408438684245798849856729634791096097236434282772049181502603264 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127303024212168897101423161901449105557756602372329752402846053738955304865901184225902592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=103, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=91268234795426416274562927865803, exp=-103, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=91268234795426416274562927865803 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=91268234795426416274562927865803, exp=-103, bc=107, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 91268234795426416274562927865803, -103, 107, 83, 'd') / result: (0, 5440010714258337990913565, -79, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 91268234795426416274562927865803, -103, 107, 83, 'd') / result: (0, 5440010714258337990913565, -79, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 5440010714258337990913565, -79, 83), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 45, 1, 6)), prec=83, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 45, 1, 6), x=(0, 1, 0, 1), prec=83, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 45, 1, 6), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 45, 1, 6), x=(0, 1, 0, 1), prec=83, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 45, 1, 6), t=(0, 1, 0, 1), prec=87, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=45, exp=1, bc=6, prec=87, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 45, 1, 6, 87, 'd') / result: (0, 45, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 45, 1, 6, 87, 'd') / result: (0, 45, 1, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 45, 1, 6), prec=87, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 45, 1, 6), prec=124, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1935828576261338814369419988945170269617 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1935828576261338814369419988945170269617, exp=-137, bc=131, prec=124, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 1935828576261338814369419988945170269617, -137, 131, 124, 'd') / result: (0, 15123660752041709487261093663634142731, -130, 124)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1935828576261338814369419988945170269617, -137, 131, 124, 'd') / result: (0, 15123660752041709487261093663634142731, -130, 124)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 15123660752041709487261093663634142731, -130, 124), prec=124 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=236307199250651710738454588494283480, prec=124 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=1, prec=124 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=123 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=124, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=33170845776635384555164052064605993142, exp=-124, prec=87, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=33170845776635384555164052064605993142 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=33170845776635384555164052064605993142, exp=-124, bc=125, prec=87, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 33170845776635384555164052064605993142, -124, 125, 87, 'd') / result: (0, 60337416974353590476610501, -85, 86)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 33170845776635384555164052064605993142, -124, 125, 87, 'd') / result: (0, 60337416974353590476610501, -85, 86)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 60337416974353590476610501, -85, 86), prec=83, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=60337416974353590476610501, exp=-85, bc=86, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 60337416974353590476610501, -85, 86, 83, 'd') / result: (0, 942772140224274851197039, -79, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 60337416974353590476610501, -85, 86, 83, 'd') / result: (0, 942772140224274851197039, -79, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 942772140224274851197039, -79, 80), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5440010714258337990913565, -80, 83), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 942772140224274851197039, -79, 80), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1336615717978387096112099156, exp=-83, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1336615717978387096112099156 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-3053914347327787275330965804, exp=-83, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3053914347327787275330965804 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 334153929494596774028024789, -81, 89), (1, 763478586831946818832741451, -81, 90)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 334153929494596774028024789, -81, 89), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=79, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1007304545120822753845, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3617462943155856964762, exp=-271, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3617462943155856964762 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3617462943155856964762, exp=-271, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3617462943155856964762, -271, 72, 57, 'n') / result: (0, 110396207982051299, -256, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3617462943155856964762, -271, 72, 57, 'n') / result: (0, 110396207982051299, -256, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 763478586831946818832741451, -81, 90), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=763478586831946818832741451, exp=-81, mag=9, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=95, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=5768936386736902038703968, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5767600140258189044903633, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5767600140258189044903633 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5767600140258189044903633, exp=-87, bc=83, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5767600140258189044903633, -87, 83, 57, 'n') / result: (1, 42971969695822813, -60, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5767600140258189044903633, -87, 83, 57, 'n') / result: (1, 42971969695822813, -60, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-154634981859382669020302294, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=154634981859382669020302294 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=154634981859382669020302294, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 154634981859382669020302294, -87, 87, 57, 'n') / result: (1, 72007524715449041, -56, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 154634981859382669020302294, -87, 87, 57, 'n') / result: (1, 72007524715449041, -56, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 110396207982051299, -256, 57), t=(1, 42971969695822813, -60, 56), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=4743942503938460959641719380484087, exp=-316, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 4743942503938460959641719380484087, -316, 112, 53, 'n') / result: (1, 8229428430266245, -257, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 4743942503938460959641719380484087, -316, 112, 53, 'n') / result: (1, 8229428430266245, -257, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 110396207982051299, -256, 57), t=(1, 72007524715449041, -56, 56), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=7949357674759411612768823082354259, exp=-312, bc=113, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 7949357674759411612768823082354259, -312, 113, 53, 'n') / result: (1, 3447484344335389, -251, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 7949357674759411612768823082354259, -312, 113, 53, 'n') / result: (1, 3447484344335389, -251, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 8229428430266245, -257, 53), (1, 3447484344335389, -251, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-3.55353655179328e-62 - 9.5273778843935e-61j) / count: 143
gamma__ / s: Complex { re: 1.0, im: -90.0 } / result: Complex { re: -3.553536551793279e-62, im: -9.527377884393496e-61 }
zeta__ / s: Complex { re: 0.0, im: 90.0 } / result: Complex { re: 1.6917758955606856, im: 7.643586059379629 } / z: Complex { re: -0.0, im: 0.0 }
zeta_ / s: (0.0, 100.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=100j, a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=100j, kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=100j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=100.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7036874417766400, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7036874417766400, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7036874417766400, -46, 53, 53, 'd') / result: (0, 25, 2, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7036874417766400, -46, 53, 53, 'd') / result: (0, 25, 2, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 25, 2, 5)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='100.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 25, 2, 5)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 25, 2, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 2, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 2, 5), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 100j / result: (0.0 + 100.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 100j / result: (0.0 + 100.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 0, 0, 0), (0, 25, 2, 5)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 25, 2, 5)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 25, 2, 5), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 25, 2, 5), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=2, bc=5, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 2, 5, 10, 'd') / result: (0, 25, 2, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 2, 5, 10, 'd') / result: (0, 25, 2, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 25, 2, 5), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 25, 2, 5), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: convert / f_locals: x=100j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 536 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=100.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7036874417766400, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7036874417766400, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7036874417766400, -46, 53, 53, 'd') / result: (0, 25, 2, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7036874417766400, -46, 53, 53, 'd') / result: (0, 25, 2, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (0, 25, 2, 5)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='100.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (0, 25, 2, 5)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 25, 2, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 2, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 2, 5), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: 100j / result: (0.0 + 100.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: 100j / result: (0.0 + 100.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 537 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __nonzero__ / f_locals: s=mpc(real='0.0', imag='100.0') / f_lineno: 426 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 540 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_is_nonzero / f_locals: z=((0, 0, 0, 0), (0, 25, 2, 5)) / f_lineno: 84 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 427 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _im / f_locals: x=mpc(real='0.0', imag='100.0') / f_lineno: 75 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 76 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 25, 2, 5) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 381 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 77 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 25, 2, 5) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 381 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('100.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 543 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 25, 2, 5), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=2, bc=5, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 2, 5, 53, 'n') / result: (0, 25, 2, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 2, 5, 53, 'n') / result: (0, 25, 2, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _re / f_locals: x=mpc(real='0.0', imag='100.0') / f_lineno: 70 / f_code.co_filename: \mpmath\ctx_base.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 71 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 72 / f_back.f_code.co_filename: \mpmath\ctx_base.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 544 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 53, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('100.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 25, 2, 5), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=2, bc=5, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 2, 5, 53, 'n') / result: (0, 25, 2, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 2, 5, 53, 'n') / result: (0, 25, 2, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('100.0'), t=26500 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 554 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('100.0'), t=26500 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=26500 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=26500, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=26500, exp=0, prec=0, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 426 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26500 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 25, 2, 5), t=(0, 6625, 2, 13) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 25, 2, 5), t=(0, 6625, 2, 13) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: s=mpc(real='0.0', imag='100.0'), t=1 / f_lineno: 442 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 567 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpf('1.0') / f_lineno: 128 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('0.0'), other=mpf('1.0') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 449 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpc(real='0.0', imag='100.0') / f_lineno: 408 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 569 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (0, 25, 2, 5)), prec=53, rnd='n' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 411 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(0, 25, 2, 5), prec=53, rnd='n' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 25, 2, 5), prec=53, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=2, bc=5, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 2, 5, 53, 'n') / result: (0, 25, 2, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 2, 5, 53, 'n') / result: (0, 25, 2, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __eq__ / f_locals: self=mpf('100.0'), other=mpf('+inf') / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 570 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_eq / f_locals: s=(0, 25, 2, 5), t=(0, 0, -456, -2) / f_lineno: 627 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 7 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: isnan / f_locals: x=mpf('100.0') / f_lineno: 318 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 576 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='100.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='100.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __gt__ / f_locals: s=mpf('0.0'), t=106 / f_lineno: 180 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 578 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=106 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 180 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=106 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=106, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 53, 1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 53, 1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _hurwitz / f_locals: s=mpc(real='0.0', imag='100.0'), a=1, d=0, kwargs={} / f_lineno: 582 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 580 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 584 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 588 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _convert_param / f_locals: x=1 / f_lineno: 1060 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 590 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='100.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='100.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=0 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 591 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=0 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=0 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 102 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 0, 0, 0) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _set_prec / f_locals: n=63 / f_lineno: 612 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 603 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: prec_to_dps / f_locals: n=63 / f_lineno: 59 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 614 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _hurwitz_em / f_locals: s=mpc(real='0.0', imag='100.0'), a=1, d=0, prec=63, verbose=None / f_lineno: 660 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 604 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 662 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: isint / f_locals: x=mpc(real='0.0', imag='100.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 670 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __sub__ / f_locals: s=mpc(real='0.0', imag='100.0'), t=1 / f_lineno: 479 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 672 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpc_convert_lhs / f_locals: x=1 / f_lineno: 434 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 482 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: convert / f_locals: x=1, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 437 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 1, 0, 1) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 647 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpf('1.0') / f_lineno: 141 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=18, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 141 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=21 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=78 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=302231454903657293676544, xbits=78, base=10, bdigits=23 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000000, base=10, size=21, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]ctx_mp_python.convert / x: 1 / result: 1.0\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[1]ctx_mp_python.convert / x: 1 / result: 1.0
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 648 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_sub_mpf / f_locals: z=((0, 0, 0, 0), (0, 25, 2, 5)), p=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 101 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 487 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 1, 0, 1), prec=63, rnd='n', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1, 0, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: __add__ / f_locals: self=mpf('1.0'), other=0 / f_lineno: 2 / f_code.co_filename: <string> / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=0, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0), prec=63, rnd='n', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 10 / f_back.f_code.co_filename: <string>
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=0, bc=1, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 0, 1, 63, 'n') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: _zetasum / f_locals: s=mpc(real='0.0', imag='100.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 725 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 675 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: re / f_locals: x=mpc(real='0.0', imag='100.0') / f_lineno: 274 / f_code.co_filename: \mpmath\functions\functions.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=mpc(real='0.0', imag='100.0'), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 276 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 277 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: <lambda> / f_locals: self=mpc(real='0.0', imag='100.0') / f_lineno: 380 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 278 / f_back.f_code.co_filename: \mpmath\functions\functions.py
call(zeta_) / f_code.co_name: make_mpf / f_locals: v=(0, 0, 0, 0) / f_lineno: 597 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 380 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __abs__ / f_locals: s=mpf('0.0') / f_lineno: 151 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(0, 0, 0, 0), prec=63, rnd='n' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 154 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=0, exp=0, bc=0, prec=63, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 220 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: <lambda> / f_locals:  / f_lineno: 620 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: __lt__ / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 179 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 739 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: _cmp / f_locals: s=mpf('0.0'), t=31.5 / f_lineno: 169 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 179 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_convert_rhs / f_locals: x=31.5 / f_lineno: 100 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 173 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=31.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 103 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8866461766385664, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8866461766385664 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8866461766385664, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 176 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 0, 0, 0), t=(0, 63, -1, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 63, -1, 6) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 676 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _zetasum_fast / f_locals: s=mpc(real='0.0', imag='100.0'), a=mpf('1.0'), n=20, derivatives=[0], reflect=False / f_lineno: 1291 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 741 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: isint / f_locals: x=mpf('1.0'), gaussian=False / f_lineno: 813 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: __int__ / f_locals: s=mpf('1.0') / f_lineno: 143 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1294 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_zetasum / f_locals: s=((0, 0, 0, 0), (0, 25, 2, 5)), a=1, n=20, derivatives=[0], reflect=False, prec=63 / f_lineno: 1338 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\ctx_mp.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1351 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 2, 5), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1352 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: zetasum_sieved / f_locals: critical_line=False, sre=0, sim=944473296573929042739200, a=1, n=20, wp=73 / f_lineno: 1278 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1356 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: primesieve / f_locals: n=21 / f_lineno: 1251 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1281 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1286 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1287 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-654659002634375969781100, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12949830622011671373035, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1037609969934998509498400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=892659574937821185810, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1520071130787697324025400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8011309776923276838509, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1291 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1837860173314937392689300, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1292 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1773056102664107379872, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1296 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2264748053138917909685500, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5121979932800070238559, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1425401932703973541490067382945662554629997597641731379082523964810437487353296339435564235010636082952618550928956616343552, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1425401932703973541490067382945662554629997597641731379082523964810437487353296339435564235010636082952618550928956616343552 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2124184775502006667538382587459116773849331412086782697384728829199779938105923195218325340231526938620982696392470827343845414115960989944170553390135553258080282141576355379181039111526477096326217736211228977777247544979345112012950511614108546662271653788098551 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2124184775502006667538382587459116773849331412086782697384728829199779938105923195218325340231526938620982696392470827343845414115960989944170553390135553258080282141576355379181039111526477096326217736211228977777247544979345112012950511614108546662271653788098551 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2422526175186878723727900, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10537128236400679589392, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2675894346958019833031500, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9376737917672679166243, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2623565876136299127090413878755060064318981085514491089035949906245297983969110653743719678932620036738877622724311453270016, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2623565876136299127090413878755060064318981085514491089035949906245297983969110653743719678932620036738877622724311453270016 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5650407483382731245966163106993506325096556995592818152860589018050589398960725979215080803501318989586336898555412825072620254887827475194883665351713910772583223275921709101053859902851680097384623869687953970190039779833948232032514752139093298327205795140865087 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5650407483382731245966163106993506325096556995592818152860589018050589398960725979215080803501318989586336898555412825072620254887827475194883665351713910772583223275921709101053859902851680097384623869687953970190039779833948232032514752139093298327205795140865087 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1323 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-2780943989214102398569400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1324 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8177358612583746696764, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1328 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 56172150623480392954812, -73, 76, 63, 'n') / result: (0, 3428475990202660703, -59, 62)

[2]libmpf._normalize. / x: (0, 5149909662247157356299, -73, 73, 63, 'n') / result: (0, 2514604327269119803, -62, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (0, 3428475990202660703, -59, 62, 63, 'n') / result: (0, 3428475990202660703, -59, 62)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[2]libmpf._normalize. / x: (0, 29894728251118529325738970, -83, 85, 63, 'n') / result: (0, 1781864658064754565, -59, 61)

[3]libmpf._normalize1 / x: (0, 763879266319838071703, -71, 70, 63, 'n') / result: (0, 5967806768123734935, -64, 63)

[3]libmpf._normalize1 / x: (0, 858612087794480947945, -74, 70, 63, 'n') / result: (0, 3353953467947191203, -66, 62)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (1, 91231470492915433733325, -68, 77, 73, 'd') / result: (1, 1425491726451803652083, -62, 71)

[2]libmpf._normalize. / x: (0, 3327249699466235060202006493, -93, 92, 63, 'n') / result: (0, 6197485512990942337, -64, 63)

[2]libmpf._normalize. / x: (1, 9327868140835757730038923856, -93, 93, 63, 'n') / result: (1, 4343627086298427419, -62, 62)

[2]libmpf._normalize. / x: (0, 30612201729145374029556708773, -93, 95, 73, 'd') / result: (0, 3649258819716617349333, -70, 72)

[2]libmpf._normalize1 / x: (1, 3649258819716617349333, -70, 72, 73, 'd') / result: (1, 3649258819716617349333, -70, 72)

[3]libmpf._normalize1 / x: (0, 91231470492915433733325, -68, 77, 73, 'd') / result: (0, 1425491726451803652083, -62, 71)

[2]libmpf._normalize. / x: (0, 3516875111606193962782702, -86, 82, 67, 'n') / result: (0, 107326510974310118493, -71, 67)

[2]libmpf._normalize. / x: (0, 53235995191459760963232103903, -97, 96, 67, 'n') / result: (0, 6197485512990942337, -64, 63)

[2]libmpf._normalize. / x: (0, 149245890253372123680622781744, -97, 97, 67, 'n') / result: (0, 69498033380774838701, -66, 66)

[3]libmpf._normalize1 / x: (0, 665154496923150347162309789198200338141, -135, 129, 63, 'n') / result: (0, 9014524382532279763, -69, 63)

[3]libmpf._normalize1 / x: (0, 7458981442334701671844465992924272197593, -137, 133, 63, 'n') / result: (0, 6318003034615894427, -67, 63)

[3]libmpf._normalize1 / x: (1, 2536215738228890050563, -69, 72, 63, 'n') / result: (1, 309596647733018805, -56, 59)

[2]libmpf._normalize. / x: (0, 219045106528691099648, -67, 68, 63, 'n') / result: (0, 106955618422212451, -56, 57)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[2]libmpf._normalize. / x: (0, 107289588599600849395473028263055426, -112, 117, 73, 'd') / result: (0, 3049353512085441746975, -67, 72)

[3]libmpf._normalize1 / x: (1, 490962270694043709469, -71, 69, 63, 'n') / result: (1, 119863835618663015, -59, 57)

[3]libmpf._normalize1 / x: (1, 678446277355537996543, -73, 70, 63, 'n') / result: (1, 2650180770920070299, -65, 62)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 6197485512990942337, -65, 63, 63, 'n') / result: (0, 6197485512990942337, -65, 63)

[2]libmpf._normalize1 / x: (1, 4343627086298427419, -63, 62, 63, 'n') / result: (1, 4343627086298427419, -63, 62)

[2]libmpf._normalize1 / x: (1, 1473799966603490623, -65, 61, 63, 'n') / result: (1, 1473799966603490623, -65, 61)

[3]libmpf._normalize1 / x: (1, 20024689116113779975, -65, 65, 63, 'n') / result: (1, 2503086139514222497, -62, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 20786078028848448349403195179286661411, -130, 124, 63, 'n') / result: (0, 9014524382532279763, -69, 63)

[3]libmpf._normalize1 / x: (1, 14568323129559964203857303957010795057, -128, 124, 63, 'n') / result: (1, 1579500758653973607, -65, 61)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 100, 0, 7, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 39487518966349340175, -63, 66, 63, 'n') / result: (1, 2467969935396833761, -59, 62)

[3]libmpf._normalize1 / x: (1, 225363109563306994075, -67, 68, 63, 'n') / result: (1, 7042597173853343565, -62, 63)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (1, 15175336593291629379041772538001358005, -124, 124, 63, 'n') / result: (1, 3290626580529111681, -62, 62)

[3]libmpf._normalize1 / x: (1, 43304329226767600725799505314898535825, -127, 126, 63, 'n') / result: (1, 2347532391284447855, -63, 62)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (0, 3290626580529111681, -63, 62, 63, 'n') / result: (0, 3290626580529111681, -63, 62)

[2]libmpf._normalize1 / x: (0, 2347532391284447855, -64, 62, 63, 'n') / result: (0, 2347532391284447855, -64, 62)

[3]libmpf._normalize1 / x: (0, 11688706355512956101, -65, 64, 63, 'n') / result: (0, 2922176588878239025, -63, 62)

[2]libmpf._normalize1 / x: (1, 7664812166772442133, -64, 63, 63, 'n') / result: (1, 7664812166772442133, -64, 63)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 625, 4, 10, 63, 'n') / result: (1, 625, 4, 10)

[2]libmpf._normalize1 / x: (0, 25, 2, 5, 63, 'n') / result: (0, 25, 2, 5)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 30234295314688652144891370576048524889, -135, 125, 63, 'n') / result: (0, 6556017732750748919, -73, 63)

[3]libmpf._normalize1 / x: (1, 5297572047112714256253015390544579221, -131, 122, 63, 'n') / result: (1, 4594911297902468675, -71, 62)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 1875, 4, 11, 63, 'n') / result: (0, 1875, 4, 11)

[2]libmpf._normalize1 / x: (0, 124975, 3, 17, 63, 'n') / result: (0, 124975, 3, 17)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 21988578410682656106900066540738559557, -139, 125, 63, 'n') / result: (0, 2384006448272999607, -76, 62)

[3]libmpf._normalize1 / x: (1, 15411118682509714200313676905943066025, -137, 124, 63, 'n') / result: (1, 417719208900224425, -72, 59)

[2]libmpf._normalize. / x: (0, 30000, 0, 15, 63, 'n') / result: (0, 1875, 4, 11)

[2]libmpf._normalize. / x: (0, 999800, 0, 20, 63, 'n') / result: (0, 124975, 3, 17)

[3]libmpf._normalize1 / x: (0, 422105677148956254378125, -72, 79, 63, 'n') / result: (0, 3220410744849824939, -55, 62)

[3]libmpf._normalize1 / x: (0, 272878053338904660384825, -73, 78, 63, 'n') / result: (0, 8327577311367940075, -58, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (1, 3960406188164604740903825517662315099, -120, 122, 63, 'n') / result: (1, 6870209589012959869, -61, 63)

[3]libmpf._normalize1 / x: (1, 10241112494455644668736260347629298075, -123, 123, 63, 'n') / result: (1, 4441374566062901373, -62, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[3]libmpf._normalize1 / x: (0, 586257884929105908821, -72, 69, 63, 'n') / result: (0, 9160279452017279825, -66, 63)

[2]libmpf._normalize. / x: (0, 378997296304034250496, -73, 69, 63, 'n') / result: (0, 1480458188687633791, -65, 61)

[3]libmpf._normalize1 / x: (0, 32537692163043192025, -66, 65, 63, 'n') / result: (0, 4067211520380399003, -63, 62)

[3]libmpf._normalize1 / x: (1, 13849166144857250475, -65, 64, 63, 'n') / result: (1, 3462291536214312619, -63, 62)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 6243125, 4, 23, 63, 'n') / result: (0, 6243125, 4, 23)

[2]libmpf._normalize1 / x: (1, 749925, 3, 20, 63, 'n') / result: (1, 749925, 3, 20)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 7995846694793693130086747239172857221, -142, 123, 63, 'n') / result: (0, 3467645742942544883, -81, 62)

[3]libmpf._normalize1 / x: (1, 1401010789319064927301243355085733275, -138, 121, 63, 'n') / result: (1, 2430366306328578473, -79, 62)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 31234375, 5, 25, 63, 'n') / result: (1, 31234375, 5, 25)

[2]libmpf._normalize1 / x: (1, 311406325, 5, 29, 63, 'n') / result: (1, 311406325, 5, 29)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 11630322465154462734976537208610264249, -147, 124, 63, 'n') / result: (0, 5043848353370974375, -86, 63)

[3]libmpf._normalize1 / x: (1, 8151335501492741396121948648120773019, -145, 123, 63, 'n') / result: (1, 3535078263750659597, -84, 62)

[2]libmpf._normalize. / x: (1, 999500000, 0, 30, 63, 'n') / result: (1, 31234375, 5, 25)

[2]libmpf._normalize. / x: (1, 9965002400, 0, 34, 63, 'n') / result: (1, 311406325, 5, 29)

[3]libmpf._normalize1 / x: (1, 4560924373720216013455144725, -81, 92, 63, 'n') / result: (1, 4247691830359600497, -51, 62)

[3]libmpf._normalize1 / x: (1, 1129022439003208458387734375, -81, 90, 63, 'n') / result: (1, 8411872677528921205, -54, 63)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (1, 14924968399739131148213777850889686291, -118, 124, 63, 'n') / result: (1, 202271039540933357, -52, 58)

[3]libmpf._normalize1 / x: (1, 29556507135810652452236512899688035615, -121, 125, 63, 'n') / result: (1, 801130731193230591, -56, 60)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (0, 589157104326871488193, -73, 69, 63, 'n') / result: (0, 9205579755107367003, -67, 63)

[3]libmpf._normalize1 / x: (0, 583365595549772889019, -75, 69, 63, 'n') / result: (0, 9115087430465201391, -69, 63)

[3]libmpf._normalize1 / x: (0, 74280964081193751051, -67, 67, 63, 'n') / result: (0, 4642560255074609441, -63, 63)

[3]libmpf._normalize1 / x: (1, 212471570887250806225, -69, 68, 63, 'n') / result: (1, 6639736590226587695, -64, 63)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 30984460625, 5, 35, 63, 'n') / result: (1, 30984460625, 5, 35)

[2]libmpf._normalize1 / x: (0, 4680469125, 5, 33, 63, 'n') / result: (0, 4680469125, 5, 33)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 16916832676588309431778430448538423125, -152, 124, 63, 'n') / result: (0, 1834126673953081591, -89, 61)

[3]libmpf._normalize1 / x: (1, 11856488002171260212236111354725925191, -150, 124, 63, 'n') / result: (1, 2570966010000479707, -88, 62)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 326976838125, 6, 39, 63, 'n') / result: (0, 326976838125, 6, 39)

[2]libmpf._normalize1 / x: (0, 1535181623875, 6, 41, 63, 'n') / result: (0, 1535181623875, 6, 41)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 6151575518759385248224334114736443973, -155, 123, 63, 'n') / result: (0, 2667820616659027769, -94, 62)

[3]libmpf._normalize1 / x: (1, 8622900365215461972840258573250417521, -154, 123, 63, 'n') / result: (1, 233724182727316337, -89, 58)

[2]libmpf._normalize. / x: (0, 20926517640000, 0, 45, 63, 'n') / result: (0, 326976838125, 6, 39)

[2]libmpf._normalize. / x: (0, 98251623928000, 0, 47, 63, 'n') / result: (0, 1535181623875, 6, 41)

[3]libmpf._normalize1 / x: (0, 12354205802021575658951448761125, -88, 104, 63, 'n') / result: (0, 5618042360775496335, -47, 63)

[3]libmpf._normalize1 / x: (0, 1650072570120925809546796044875, -88, 101, 63, 'n') / result: (0, 1500732260065820637, -48, 61)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (1, 6908972641632307048768075902128388735, -112, 123, 63, 'n') / result: (1, 374536157385033089, -48, 59)

[3]libmpf._normalize1 / x: (1, 1845574928306261228284875836018911917, -113, 121, 63, 'n') / result: (1, 6403124309614168051, -55, 63)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (0, 623380358358997549733, -74, 70, 63, 'n') / result: (0, 4870159049679668357, -67, 63)

[3]libmpf._normalize1 / x: (0, 666087547229958916493, -77, 70, 63, 'n') / result: (0, 5203808962734054035, -70, 63)

[3]libmpf._normalize1 / x: (0, 79151123130873419413, -67, 67, 63, 'n') / result: (0, 4946945195679588713, -63, 63)

[3]libmpf._normalize1 / x: (1, 419739332811767558445, -70, 69, 63, 'n') / result: (1, 6558427075183868101, -64, 63)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 151229324520625, 6, 48, 63, 'n') / result: (0, 151229324520625, 6, 48)

[2]libmpf._normalize1 / x: (1, 43443955179625, 6, 46, 63, 'n') / result: (1, 43443955179625, 6, 46)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 8947746209104560361968291476329516107, -160, 123, 63, 'n') / result: (0, 7760932703008080783, -100, 63)

[3]libmpf._normalize1 / x: (1, 783900033201405633894568961204583411, -155, 120, 63, 'n') / result: (1, 5439399161653907479, -98, 63)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 1388557528531875, 8, 51, 63, 'n') / result: (1, 1388557528531875, 8, 51)

[2]libmpf._normalize1 / x: (1, 3693845202656375, 8, 52, 63, 'n') / result: (1, 3693845202656375, 8, 52)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 26029807153758721054523190416570951949, -166, 125, 63, 'n') / result: (0, 705539336637098253, -101, 60)

[3]libmpf._normalize1 / x: (1, 18243491681778167478813435787684707237, -164, 124, 63, 'n') / result: (1, 3955926663021023621, -102, 62)

[2]libmpf._normalize. / x: (1, 355470727304160000, 0, 59, 63, 'n') / result: (1, 1388557528531875, 8, 51)

[2]libmpf._normalize. / x: (1, 945624371880032000, 0, 60, 63, 'n') / result: (1, 3693845202656375, 8, 52)

[3]libmpf._normalize1 / x: (1, 16571944641386305726905251255862625, -94, 114, 63, 'n') / result: (1, 7359421801472223791, -43, 63)

[3]libmpf._normalize1 / x: (0, 280725562413206906836060882793625, -94, 108, 63, 'n') / result: (0, 7978700364594911515, -49, 63)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (1, 41138597121889883795908727034470850955, -109, 125, 63, 'n') / result: (1, 4460255637255893207, -46, 62)

[3]libmpf._normalize1 / x: (0, 44600316262574370538349442250952337575, -115, 126, 63, 'n') / result: (0, 4835575978542370615, -52, 63)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (0, 659882471265077315757, -75, 70, 63, 'n') / result: (0, 5155331806758416529, -68, 63)

[3]libmpf._normalize1 / x: (1, 357705038255805630335, -80, 69, 63, 'n') / result: (1, 2794570611373481487, -73, 62)

[3]libmpf._normalize1 / x: (0, 163457578068505255345, -68, 68, 63, 'n') / result: (0, 2554024657320394615, -62, 62)

[3]libmpf._normalize1 / x: (1, 3360709233105513949199, -73, 72, 63, 'n') / result: (1, 1640971305227301733, -62, 61)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 356887502508850625, 8, 59, 63, 'n') / result: (1, 356887502508850625, 8, 59)

[2]libmpf._normalize1 / x: (0, 172100359677094875, 8, 58, 63, 'n') / result: (0, 172100359677094875, 8, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 2366346104887156459502108219688268359, -167, 121, 63, 'n') / result: (0, 8209912280868052399, -109, 63)

[3]libmpf._normalize1 / x: (1, 13267993950384121802468502984866406063, -168, 124, 63, 'n') / result: (1, 2877037573106198997, -106, 62)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 10389455496398996875, 9, 64, 63, 'n') / result: (0, 2597363874099749219, 11, 62)

[3]libmpf._normalize1 / x: (0, 16983873327057056875, 9, 64, 63, 'n') / result: (0, 4245968331764264219, 11, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 27535663765959638803003601769075845997, -175, 125, 63, 'n') / result: (0, 5970845295176765381, -113, 63)

[3]libmpf._normalize1 / x: (1, 9649450145733906765126733673725823391, -172, 123, 63, 'n') / result: (1, 261548870282381727, -107, 58)

[2]libmpf._normalize. / x: (0, 5319401214156286400512, 0, 73, 63, 'n') / result: (0, 2597363874099749219, 11, 62)

[2]libmpf._normalize. / x: (0, 8695743143453213120512, 0, 73, 63, 'n') / result: (0, 4245968331764264219, 11, 62)

[3]libmpf._normalize1 / x: (0, 86582263974904170122741155498614665071, -102, 127, 63, 'n') / result: (0, 2346816967507613195, -37, 62)

[3]libmpf._normalize1 / x: (1, 18125585529731629132394694050743555193, -102, 124, 63, 'n') / result: (1, 3930359841781371005, -40, 62)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (1, 2739393058912947873209317660646634545, -99, 122, 63, 'n') / result: (1, 4752089449224207231, -40, 63)

[3]libmpf._normalize1 / x: (0, 4587831355693976457745669339047655655, -102, 122, 63, 'n') / result: (0, 3979309378272421047, -42, 62)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (0, 340876836688388892709, -75, 69, 63, 'n') / result: (0, 5326200573256076449, -69, 63)

[3]libmpf._normalize1 / x: (1, 570887567485240679801, -78, 69, 63, 'n') / result: (1, 4460059120978442811, -71, 62)

[3]libmpf._normalize1 / x: (0, 332241356710266587169, -69, 69, 63, 'n') / result: (0, 5191271198597915425, -63, 63)

[3]libmpf._normalize1 / x: (1, 844637367397356930107, -71, 70, 63, 'n') / result: (1, 824841179098981377, -61, 60)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 396025830561329180491, 11, 69, 63, 'n') / result: (0, 6187903602520768445, 17, 63)

[3]libmpf._normalize1 / x: (1, 306442039059381828309, 11, 69, 63, 'n') / result: (1, 4788156860302841067, 17, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 20025937284334282765515896425878143343, -179, 124, 63, 'n') / result: (0, 4342432941946738459, -117, 62)

[3]libmpf._normalize1 / x: (1, 877222740521264251375157606702347581, -173, 120, 63, 'n') / result: (1, 6086955526571792919, -116, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 138267632315133332010, 19, 67, 63, 'n') / result: (1, 8641727019695833251, 23, 63)

[2]libmpf._normalize. / x: (1, 140333119482110687924, 19, 67, 63, 'n') / result: (1, 8770819967631917995, 23, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 14564318024970387466134647715906576177, -183, 124, 63, 'n') / result: (0, 3158133048688537061, -121, 62)

[3]libmpf._normalize1 / x: (1, 20415365597585786212907135173814491557, -182, 124, 63, 'n') / result: (1, 8853753493195335155, -121, 63)

[2]libmpf._normalize. / x: (1, 72492060411236624376004608, 0, 86, 63, 'n') / result: (1, 8641727019695833251, 23, 63)

[2]libmpf._normalize. / x: (1, 73574970547036848348200960, 0, 86, 63, 'n') / result: (1, 8770819967631917995, 23, 63)

[2]libmpf._normalize. / x: (1, 104946401625254597586361319408090229536, -98, 127, 63, 'n') / result: (1, 1422288957957966351, -32, 61)

[2]libmpf._normalize. / x: (0, 48812304383996811407737974677867926210, -98, 126, 63, 'n') / result: (0, 2646120322857652759, -34, 62)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (1, 7652341785174814407926805942318476805, -94, 123, 63, 'n') / result: (1, 3318674235235254819, -33, 62)

[3]libmpf._normalize1 / x: (0, 14236922111999069994295625800152849245, -96, 124, 63, 'n') / result: (0, 6174280753334523105, -35, 63)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (0, 669693495518625069879, -77, 70, 63, 'n') / result: (0, 2615990216869629179, -69, 62)

[3]libmpf._normalize1 / x: (1, 622971006932961681087, -78, 70, 63, 'n') / result: (1, 4866960991663763133, -71, 63)

[3]libmpf._normalize1 / x: (0, 334857346927136216379, -69, 69, 63, 'n') / result: (0, 5232146045736503381, -63, 63)

[3]libmpf._normalize1 / x: (1, 849504328389020693181, -71, 70, 63, 'n') / result: (1, 6636752565539224165, -64, 63)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 764739545507145967237, 23, 70, 63, 'n') / result: (1, 5974527699274577869, 30, 63)

[3]libmpf._normalize1 / x: (0, 978193361548798259035, 23, 70, 63, 'n') / result: (0, 7642135637099986399, 30, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 10592231290887554520520293478118674383, -187, 123, 63, 'n') / result: (0, 9187296141639380541, -127, 63)

[3]libmpf._normalize1 / x: (1, 29695077232852052673624374204452641465, -187, 125, 63, 'n') / result: (1, 3219546724798303693, -124, 62)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 423928475749921365033, 31, 69, 63, 'n') / result: (0, 6623882433592521329, 37, 63)

[3]libmpf._normalize1 / x: (0, 245231435504028988657, 31, 68, 63, 'n') / result: (0, 957935294937613237, 39, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 30813763755309249513935948893804580823, -193, 125, 63, 'n') / result: (0, 6681669921192276757, -131, 63)

[3]libmpf._normalize1 / x: (1, 10798209902855291882232668838332012679, -190, 124, 63, 'n') / result: (1, 4682977054252078099, -129, 63)

[2]libmpf._normalize. / x: (0, 910379469594520668743598604288, 0, 100, 63, 'n') / result: (0, 6623882433592521329, 37, 63)

[2]libmpf._normalize. / x: (0, 526630497720468891291097235456, 0, 99, 63, 'n') / result: (0, 957935294937613237, 39, 60)

[3]libmpf._normalize1 / x: (0, 116034420108465682903779349531676593461, -94, 127, 63, 'n') / result: (0, 6290238518234709723, -30, 63)

[2]libmpf._normalize. / x: (1, 24618881999944089232451294215700641162, -92, 125, 63, 'n') / result: (1, 5338369069700732359, -30, 63)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (1, 51433394305431418512951994443663407235, -90, 126, 63, 'n') / result: (1, 2788209892212615817, -26, 62)

[3]libmpf._normalize1 / x: (0, 43650243232253809189407610823871306255, -90, 126, 63, 'n') / result: (0, 4732568854193026701, -27, 63)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (0, 600158062037480200229, -78, 70, 63, 'n') / result: (0, 293045928729238379, -67, 59)

[3]libmpf._normalize1 / x: (1, 509339228715217174647, -78, 69, 63, 'n') / result: (1, 3979212724337634177, -71, 62)

[3]libmpf._normalize1 / x: (0, 84007382660513292475, -67, 67, 63, 'n') / result: (0, 1312615354070520195, -61, 61)

[3]libmpf._normalize1 / x: (1, 853483541113358327297, -71, 70, 63, 'n') / result: (1, 1666960041237027983, -62, 61)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 283815881471157474865, 37, 68, 63, 'n') / result: (0, 4434623147986835545, 43, 62)

[2]libmpf._normalize. / x: (1, 179966090263877231780, 39, 68, 63, 'n') / result: (1, 5623940320746163493, 44, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 22410010003861272373466694334771768671, -197, 125, 63, 'n') / result: (0, 4859396306321655823, -135, 63)

[3]libmpf._normalize1 / x: (1, 15706487131425879101734241352841763097, -195, 124, 63, 'n') / result: (1, 3405801494001511345, -133, 62)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 149467754314627758415, 46, 68, 63, 'n') / result: (1, 2335433661166058725, 52, 62)

[3]libmpf._normalize1 / x: (1, 65874056133701580681, 45, 66, 63, 'n') / result: (1, 8234257016712697585, 48, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 16298189093717288997970154024939325069, -201, 124, 63, 'n') / result: (0, 7068212809195135743, -140, 63)

[3]libmpf._normalize1 / x: (1, 11422899731946093893085071929688698035, -199, 124, 63, 'n') / result: (1, 2476946541092008251, -137, 62)

[2]libmpf._normalize. / x: (1, 10517858166175975288697475668377600, 0, 114, 63, 'n') / result: (1, 2335433661166058725, 52, 62)

[2]libmpf._normalize. / x: (1, 2317737302008762306102111774965760, 0, 111, 63, 'n') / result: (1, 8234257016712697585, 48, 63)

[3]libmpf._normalize1 / x: (1, 53410498673767972537917131840656789185, -89, 126, 63, 'n') / result: (1, 2895388934781669459, -25, 62)

[3]libmpf._normalize1 / x: (0, 682245793189081023049451034407085836145, -92, 130, 63, 'n') / result: (0, 2311538659827180655, -24, 62)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (1, 5734449270936569087409430522045820091, -80, 123, 63, 'n') / result: (1, 4973841886045876181, -20, 63)

[3]libmpf._normalize1 / x: (0, 4578107287540356206829795398119599095, -79, 122, 63, 'n') / result: (0, 7941750187236758599, -20, 63)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (0, 447837750068083328411, -79, 69, 63, 'n') / result: (0, 3498732422406901003, -72, 62)

[3]libmpf._normalize1 / x: (1, 715064052484857188831, -79, 70, 63, 'n') / result: (1, 1396609477509486697, -70, 61)

[3]libmpf._normalize1 / x: (0, 2691734977558832260363, -72, 72, 63, 'n') / result: (0, 5257294878044594259, -63, 63)

[3]libmpf._normalize1 / x: (1, 428138380034188650345, -70, 69, 63, 'n') / result: (1, 3344831094017098831, -63, 62)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 47046936458525446325, 50, 66, 63, 'n') / result: (1, 5880867057315680791, 53, 63)

[3]libmpf._normalize1 / x: (0, 3876676227149809818945, 48, 72, 63, 'n') / result: (0, 7571633256151972303, 57, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 23706456863588783998572021067160468829, -206, 125, 63, 'n') / result: (0, 2570259203343685725, -143, 62)

[3]libmpf._normalize1 / x: (1, 8307563441415341013457684445950615953, -203, 123, 63, 'n') / result: (1, 3602831332497466547, -142, 62)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 6110234408437418969519, 54, 73, 63, 'n') / result: (0, 2983512894744833481, 65, 62)

[3]libmpf._normalize1 / x: (1, 398135918010049986041, 55, 69, 63, 'n') / result: (1, 777609214863378879, 64, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 8620529768577739636759085879316677175, -209, 123, 63, 'n') / result: (0, 7477117682454358473, -149, 63)

[3]libmpf._normalize1 / x: (1, 12083728642058677838061536782105186041, -208, 124, 63, 'n') / result: (1, 5240481938178133159, -147, 63)

[2]libmpf._normalize. / x: (0, 110072197619940572517663485234188910592, 0, 127, 63, 'n') / result: (0, 2983512894744833481, 65, 62)

[2]libmpf._normalize. / x: (1, 14344358175942971715969435869814718464, 0, 124, 63, 'n') / result: (1, 777609214863378879, 64, 60)

[3]libmpf._normalize1 / x: (0, 14157982930222351384040161436806136991, -84, 124, 63, 'n') / result: (0, 6140046340383904521, -23, 63)

[3]libmpf._normalize1 / x: (1, 130894639108349281188742675128278863599, -85, 127, 63, 'n') / result: (1, 1773953151099729521, -19, 61)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (1, 14631507797283706188361321937633276133, -75, 124, 63, 'n') / result: (1, 6345405016221436745, -14, 63)

[3]libmpf._normalize1 / x: (0, 4227266037329097186379254675521001133, -71, 122, 63, 'n') / result: (0, 7333137634154234645, -12, 63)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (0, 769793847741498517013, -82, 70, 63, 'n') / result: (0, 1503503608870114291, -73, 61)

[3]libmpf._normalize1 / x: (1, 889620791893133717511, -80, 70, 63, 'n') / result: (1, 217192576145784599, -68, 58)

[3]libmpf._normalize1 / x: (0, 5384973458726534635507, -73, 73, 63, 'n') / result: (0, 657345392910953935, -60, 60)

[3]libmpf._normalize1 / x: (1, 107251787584692947191, -68, 67, 63, 'n') / result: (1, 6703236724043309199, -64, 63)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 95567205743320780089, 65, 67, 63, 'n') / result: (1, 1493237589739387189, 71, 61)

[3]libmpf._normalize1 / x: (1, 581928003866562497499, 64, 69, 63, 'n') / result: (1, 9092625060415039023, 70, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 25077904781317060762395691685634113019, -215, 125, 63, 'n') / result: (0, 5437903769057715253, -153, 63)

[3]libmpf._normalize1 / x: (1, 17576332570267167763538429828167400277, -213, 124, 63, 'n') / result: (1, 3811259591402278661, -151, 62)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 212383250612982103685, 72, 68, 63, 'n') / result: (1, 1659244145413922685, 79, 61)

[3]libmpf._normalize1 / x: (0, 120125004789044554565, 72, 67, 63, 'n') / result: (0, 1876953199828821165, 78, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 18238476204594226008710143637920519359, -219, 124, 63, 'n') / result: (0, 3954839104769247457, -157, 62)

[3]libmpf._normalize1 / x: (1, 12782787323830667464086680468853819183, -217, 124, 63, 'n') / result: (1, 1385912578691737695, -154, 61)

[2]libmpf._normalize. / x: (1, 1002951544217650717849058798306617228001280, 0, 140, 63, 'n') / result: (1, 1659244145413922685, 79, 61)

[2]libmpf._normalize. / x: (0, 567274296370339620718765932969996331253760, 0, 139, 63, 'n') / result: (0, 1876953199828821165, 78, 61)

[3]libmpf._normalize1 / x: (0, 3843128566391466878161833591146396655, -78, 122, 63, 'n') / result: (0, 3333382672658184441, -18, 62)

[3]libmpf._normalize1 / x: (0, 44216125228501240502271627740965804605, -79, 126, 63, 'n') / result: (0, 4793921903163216611, -16, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (0, 2904922547848795163096730479350342437, -65, 122, 63, 'n') / result: (0, 5039237339647664673, -6, 63)

[3]libmpf._normalize1 / x: (0, 4177729710828508075845810362103717127, -63, 122, 63, 'n') / result: (0, 3623602902830005339, -3, 62)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (1, 338748898272041362037, -82, 69, 63, 'n') / result: (1, 2646475767750323141, -75, 62)

[3]libmpf._normalize1 / x: (1, 487173517885886866941, -80, 69, 63, 'n') / result: (1, 951510777120872787, -71, 60)

[3]libmpf._normalize1 / x: (0, 21537247359138388218939, -75, 75, 63, 'n') / result: (0, 5258117031039645561, -63, 63)

[3]libmpf._normalize1 / x: (1, 858965811454664450259, -71, 70, 63, 'n') / result: (1, 3355335200994783009, -63, 62)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 128691787045133434635, 79, 67, 63, 'n') / result: (0, 8043236690320839665, 83, 63)

[3]libmpf._normalize1 / x: (0, 292432811886379292535, 78, 68, 63, 'n') / result: (0, 2284631342862338223, 85, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 13264346330613982552703909955200520771, -223, 124, 63, 'n') / result: (0, 2876246621650361787, -161, 62)

[3]libmpf._normalize1 / x: (1, 4648286299574788169063697758487497085, -220, 122, 63, 'n') / result: (1, 8063491366933746589, -161, 63)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 368450664978938408285, 84, 69, 63, 'n') / result: (0, 5757041640295912629, 90, 63)

[3]libmpf._normalize1 / x: (1, 251342806800992432531, 85, 68, 63, 'n') / result: (1, 7854462712531013517, 90, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 9646797331355623674998657555413759761, -227, 123, 63, 'n') / result: (0, 8367262899346507017, -167, 63)

[3]libmpf._normalize1 / x: (1, 27044574833889676619702063915932056567, -227, 125, 63, 'n') / result: (1, 5864357357769997519, -165, 63)

[2]libmpf._normalize. / x: (0, 7126872354355492177398205115510829918921424896, 0, 153, 63, 'n') / result: (0, 5757041640295912629, 90, 63)

[2]libmpf._normalize. / x: (1, 9723353878916197390031528725320546262406135808, 0, 153, 63, 'n') / result: (1, 7854462712531013517, 90, 63)

[3]libmpf._normalize1 / x: (1, 136074823871404419595748165597214439599, -77, 127, 63, 'n') / result: (1, 3688315491548976269, -12, 62)

[3]libmpf._normalize1 / x: (1, 200765752457891640883170074609445418593, -77, 128, 63, 'n') / result: (1, 5441766624388327965, -12, 63)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (0, 22471223245941837387365445785166714023, -58, 125, 63, 'n') / result: (0, 4872669812331381761, 4, 63)

[3]libmpf._normalize1 / x: (0, 33154200867342388916080861850790413655, -58, 125, 63, 'n') / result: (0, 1797292830369670673, 6, 61)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (1, 607632423789335016009, -82, 70, 63, 'n') / result: (1, 4747128310854179813, -75, 63)

[3]libmpf._normalize1 / x: (1, 896505152894152867915, -82, 70, 63, 'n') / result: (1, 7003946506985569281, -75, 63)

[3]libmpf._normalize1 / x: (0, 21532500230827534038043, -75, 75, 63, 'n') / result: (0, 5256958064166878427, -63, 63)

[3]libmpf._normalize1 / x: (1, 13750456929781616774145, -75, 74, 63, 'n') / result: (1, 3357045148872465033, -63, 62)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 917858228979907342167, 90, 70, 63, 'n') / result: (1, 7170767413905526111, 97, 63)

[3]libmpf._normalize1 / x: (1, 395051521641377952009, 90, 69, 63, 'n') / result: (1, 1543170006411632625, 98, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 28063410418489087055456263834280171451, -233, 125, 63, 'n') / result: (0, 6085282108615641467, -171, 63)

[3]libmpf._normalize1 / x: (1, 19668781697374310267959513720328625357, -231, 124, 63, 'n') / result: (1, 4264987169287270923, -169, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 17066947918574237292, 100, 64, 63, 'n') / result: (1, 4266736979643559323, 102, 62)

[3]libmpf._normalize1 / x: (0, 197787225424577744275, 99, 68, 63, 'n') / result: (0, 6180850794518054509, 104, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 20409753031628426949727642194744414801, -237, 124, 63, 'n') / result: (0, 2212829857678415079, -174, 61)

[3]libmpf._normalize1 / x: (1, 14304568507181316558820914839143290369, -235, 124, 63, 'n') / result: (1, 6203617700781484979, -174, 63)

[2]libmpf._normalize. / x: (1, 21634926773044562356577777888326097202750834081792, 0, 164, 63, 'n') / result: (1, 4266736979643559323, 102, 62)

[2]libmpf._normalize. / x: (0, 125362547513471046187837335453797329803580637446144, 0, 167, 63, 'n') / result: (0, 6180850794518054509, 104, 63)

[3]libmpf._normalize1 / x: (0, 143932978595630143907010924271392649727, -72, 127, 63, 'n') / result: (0, 975327800535573819, -5, 60)

[3]libmpf._normalize1 / x: (0, 81177889787355336458573503203618074061, -72, 126, 63, 'n') / result: (0, 550082777907746871, -5, 59)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (0, 6114808673785229378944461710456441961, -47, 123, 63, 'n') / result: (0, 5303751078760921503, 13, 63)

[3]libmpf._normalize1 / x: (0, 3448738916088632198036852053661545149, -47, 122, 63, 'n') / result: (0, 5982608360253758095, 12, 63)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (1, 520971174581054804469, -82, 69, 63, 'n') / result: (1, 1017521825353622665, -73, 60)

[3]libmpf._normalize1 / x: (1, 587653239794954162285, -83, 69, 63, 'n') / result: (1, 4591040935898079393, -76, 62)

[3]libmpf._normalize1 / x: (0, 5382107535881529886583, -73, 73, 63, 'n') / result: (0, 2627982195254653265, -62, 62)

[3]libmpf._normalize1 / x: (1, 27505504900499131629729, -76, 75, 63, 'n') / result: (1, 839401394668552601, -61, 60)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 2579008742298310786675, 102, 72, 63, 'n') / result: (0, 5037126449801388255, 111, 63)

[2]libmpf._normalize. / x: (1, 47852845371862379650, 104, 66, 63, 'n') / result: (1, 373850354467674841, 111, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 7421728375137609800205865658811350037, -240, 123, 63, 'n') / result: (0, 6437323222337207503, -180, 63)

[3]libmpf._normalize1 / x: (1, 20806645101354642267680780990385439737, -240, 124, 63, 'n') / result: (1, 9023443928409432697, -179, 63)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 84175161570801789365, 112, 67, 63, 'n') / result: (1, 5260947598175111835, 116, 63)

[3]libmpf._normalize1 / x: (1, 246996267881989639817, 112, 68, 63, 'n') / result: (1, 1929658342828044061, 119, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 21590482545854864874850678947427196109, -246, 125, 63, 'n') / result: (0, 1170422404061310455, -182, 61)

[3]libmpf._normalize1 / x: (1, 30264211056515843299359486931818964491, -245, 125, 63, 'n') / result: (1, 6562504675206860143, -183, 63)

[2]libmpf._normalize. / x: (1, 437062426990735677478789120166383277283198450070978560, 0, 179, 63, 'n') / result: (1, 5260947598175111835, 116, 63)

[2]libmpf._normalize. / x: (1, 1282477945793481549770837839685546015133930656595181568, 0, 180, 63, 'n') / result: (1, 1929658342828044061, 119, 61)

[3]libmpf._normalize1 / x: (1, 56811098520940536586492974191754777817, -66, 126, 63, 'n') / result: (1, 1539867910942293937, -1, 61)

[3]libmpf._normalize1 / x: (1, 1611252497033746253480677396010231675, -67, 121, 63, 'n') / result: (1, 2795077532330690363, -8, 62)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (0, 11554676999457923964770321090725664949, -39, 124, 63, 'n') / result: (0, 5011042362072228361, 22, 63)

[3]libmpf._normalize1 / x: (0, 20973369108497079619765881342600146151, -46, 124, 63, 'n') / result: (0, 9095748940709160431, 15, 63)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (1, 333354867527770502951, -82, 69, 63, 'n') / result: (1, 5208669805121414109, -76, 63)

[3]libmpf._normalize1 / x: (1, 605086120633409379977, -89, 70, 63, 'n') / result: (1, 4727235317448510781, -82, 63)

[3]libmpf._normalize1 / x: (0, 43051651617247117679651, -76, 76, 63, 'n') / result: (0, 5255328566558486045, -63, 63)

[3]libmpf._normalize1 / x: (1, 1760357040867261872803133, -82, 81, 63, 'n') / result: (1, 6715229190320060245, -64, 63)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 1401681089111707229255, 116, 71, 63, 'n') / result: (1, 1368829188585651591, 126, 61)

[3]libmpf._normalize1 / x: (0, 235725240467092175169, 118, 68, 63, 'n') / result: (0, 3683206882298315237, 124, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 3925542281064520886031582220627927365, -248, 122, 63, 'n') / result: (0, 106402036732846405, -183, 57)

[3]libmpf._normalize1 / x: (1, 22010335313829704216801275913700922029, -249, 125, 63, 'n') / result: (1, 1193182668219429117, -185, 61)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 130407389337856125473, 126, 67, 63, 'n') / result: (0, 4075230916808003921, 131, 62)

[3]libmpf._normalize1 / x: (0, 111100470682476952441, 126, 67, 63, 'n') / result: (0, 867972427206851191, 133, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 356867480096774626002871110966175215, -249, 119, 63, 'n') / result: (0, 4952531164292487215, -193, 63)

[3]libmpf._normalize1 / x: (1, 4001879147969037130632409572304457751, -251, 122, 63, 'n') / result: (1, 3471076853001975613, -191, 62)

[2]libmpf._normalize. / x: (0, 4075230916808003921, 131, 62, 63, 'n') / result: (0, 4075230916808003921, 131, 62)

[2]libmpf._normalize. / x: (0, 867972427206851191, 133, 60, 63, 'n') / result: (0, 867972427206851191, 133, 60)

[3]libmpf._normalize1 / x: (0, 68387492135126178000028377110994451343, -62, 126, 63, 'n') / result: (0, 3707293377186957517, 2, 62)

[2]libmpf._normalize. / x: (1, 9846779210481759298825049966275355508, -60, 123, 63, 'n') / result: (1, 2135179882397884713, 2, 61)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (0, 19157588147801585964408000460908535967, -31, 124, 63, 'n') / result: (0, 8308279475771612207, 30, 63)

[3]libmpf._normalize1 / x: (1, 11033628215171944458240828824591111763, -31, 124, 63, 'n') / result: (1, 4785073472514712383, 30, 63)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (1, 650534790877239011801, -84, 70, 63, 'n') / result: (1, 1270575763432107445, -75, 61)

[3]libmpf._normalize1 / x: (0, 374669241670578607485, -84, 69, 63, 'n') / result: (0, 2927103450551395371, -77, 62)

[3]libmpf._normalize1 / x: (0, 21524555232860126732875, -75, 75, 63, 'n') / result: (0, 2627509183698745939, -62, 62)

[3]libmpf._normalize1 / x: (1, 55008230423651382131669, -77, 76, 63, 'n') / result: (1, 839358984735891451, -61, 60)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 229007274295308362691, 131, 68, 63, 'n') / result: (0, 3578238660864193167, 137, 62)

[2]libmpf._normalize. / x: (1, 127051973309198782564, 133, 67, 63, 'n') / result: (1, 3970374165912461955, 138, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 16610559073595328048203616014037969645, -259, 124, 63, 'n') / result: (0, 450230105844771565, -194, 59)

[3]libmpf._normalize1 / x: (1, 11641830248637198925171195713254132439, -257, 124, 63, 'n') / result: (1, 315552441181997783, -192, 59)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 450710996504209093005, 138, 69, 63, 'n') / result: (1, 3521179660189133539, 145, 62)

[2]libmpf._normalize. / x: (1, 29900354032917899850, 139, 65, 63, 'n') / result: (1, 3737544254114737481, 142, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 1510050824872302549836692364912542695, -260, 121, 63, 'n') / result: (0, 2619520615824125469, -201, 62)

[3]libmpf._normalize1 / x: (1, 1058348204421563538651926883023102949, -258, 120, 63, 'n') / result: (1, 7343765903871948405, -201, 63)

[2]libmpf._normalize. / x: (1, 3521179660189133539, 145, 62, 63, 'n') / result: (1, 3521179660189133539, 145, 62)

[2]libmpf._normalize. / x: (1, 3737544254114737481, 142, 62, 63, 'n') / result: (1, 3737544254114737481, 142, 62)

[3]libmpf._normalize1 / x: (1, 101238071752668513860036464708807706133, -59, 127, 63, 'n') / result: (1, 686015858328041139, 8, 60)

[3]libmpf._normalize1 / x: (0, 197079178813026420407814987615963438771, -59, 128, 63, 'n') / result: (0, 1335460461379640263, 8, 61)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (0, 5567368717547179270147479481349235177, -21, 123, 63, 'n') / result: (0, 1207230651718497695, 41, 61)

[3]libmpf._normalize1 / x: (1, 10837943038702818095314622899986676709, -21, 124, 63, 'n') / result: (1, 4700208555134297937, 40, 63)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (1, 390299468862514034123, -85, 69, 63, 'n') / result: (1, 6098429200976781783, -79, 63)

[3]libmpf._normalize1 / x: (0, 379896107674320282947, -84, 69, 63, 'n') / result: (0, 5935876682411254421, -78, 63)

[3]libmpf._normalize1 / x: (0, 344386785296561050934825, -79, 79, 63, 'n') / result: (0, 5254925312752701583, -63, 63)

[3]libmpf._normalize1 / x: (1, 110010524970620353011051, -78, 77, 63, 'n') / result: (1, 6714509580726339905, -64, 63)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 124874532578857842393, 144, 67, 63, 'n') / result: (0, 3902329143089307575, 149, 62)

[3]libmpf._normalize1 / x: (0, 2932807600028863693111, 142, 72, 63, 'n') / result: (0, 5728139843806374401, 151, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 8785750253802487562381305262405049207, -267, 123, 63, 'n') / result: (0, 7620423609670183183, -207, 63)

[3]libmpf._normalize1 / x: (1, 24630649121083660538033723302685881215, -267, 125, 63, 'n') / result: (1, 2670460328680708511, -204, 62)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 135398837808980744875, 153, 67, 63, 'n') / result: (0, 8462427363061296555, 157, 63)

[3]libmpf._normalize1 / x: (1, 280858703579036670207, 151, 68, 63, 'n') / result: (1, 1097104310855611993, 159, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 25558546192879963819361048703336139149, -273, 125, 63, 'n') / result: (0, 2771063130789157521, -210, 62)

[3]libmpf._normalize1 / x: (1, 8956599680394058377771713334426428733, -270, 123, 63, 'n') / result: (1, 3884305932626485107, -209, 62)

[2]libmpf._normalize. / x: (0, 8462427363061296555, 157, 63, 63, 'n') / result: (0, 8462427363061296555, 157, 63)

[2]libmpf._normalize. / x: (1, 1097104310855611993, 159, 60, 63, 'n') / result: (1, 1097104310855611993, 159, 60)

[3]libmpf._normalize1 / x: (1, 10641989804171890358781717625491065853, -53, 124, 63, 'n') / result: (1, 2307613693050350285, 9, 62)

[3]libmpf._normalize1 / x: (1, 38950947423643363131467540958485405091, -52, 125, 63, 'n') / result: (1, 8446140363416559229, 10, 63)

[3]libmpf._normalize1 / x: (0, 15478498771225430759843386699, -55, 94, 63, 'n') / result: (0, 7207737663400094379, -24, 63)

[8]gammazeta.mpf_bernoulli / n: 34 / prec: 63 / result: (0, 7207737663400094379, -24, 63)

[3]libmpf._normalize1 / x: (1, 16632674127976794372030160468009548015, -15, 124, 63, 'n') / result: (1, 7213272569518353385, 46, 63)

[3]libmpf._normalize1 / x: (1, 60877564007761294596381524410043473791, -14, 126, 63, 'n') / result: (1, 1650089678821003693, 51, 61)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (0, 532092525477930953071, -88, 69, 63, 'n') / result: (0, 4156972855296335571, -81, 62)

[3]libmpf._normalize1 / x: (0, 486880469860055152997, -85, 69, 63, 'n') / result: (0, 3803753670781680883, -78, 62)

[3]libmpf._normalize1 / x: (0, 1377551298159099500109523, -81, 81, 63, 'n') / result: (0, 5254941170345685959, -63, 63)

[3]libmpf._normalize1 / x: (1, 110006721216949571322637, -78, 77, 63, 'n') / result: (1, 3357138709013353617, -63, 62)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 718101827323267583515, 157, 70, 63, 'n') / result: (1, 1402542631490756999, 166, 61)

[2]libmpf._normalize. / x: (1, 175356241818297218106, 159, 68, 63, 'n') / result: (1, 2739941278410894033, 165, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 9294016797410895934008203758672487763, -276, 123, 63, 'n') / result: (0, 4030637281147865485, -215, 62)

[3]libmpf._normalize1 / x: (1, 13027781353300448549791033347160913721, -275, 124, 63, 'n') / result: (1, 5649899538365796519, -214, 63)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 44655307224929481842, 167, 66, 63, 'n') / result: (1, 2790956701558092615, 171, 62)

[3]libmpf._normalize1 / x: (0, 186833264882060898461, 166, 68, 63, 'n') / result: (0, 5838539527564403077, 171, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 13518569887143121358252482424619328455, -281, 124, 63, 'n') / result: (0, 5862745136215077069, -220, 63)

[3]libmpf._normalize1 / x: (1, 18949500150255197889690424831884822357, -280, 124, 63, 'n') / result: (1, 8218035692168431301, -219, 63)

[2]libmpf._normalize. / x: (1, 2790956701558092615, 171, 62, 63, 'n') / result: (1, 2790956701558092615, 171, 62)

[2]libmpf._normalize. / x: (0, 5838539527564403077, 171, 63, 63, 'n') / result: (0, 5838539527564403077, 171, 63)

[3]libmpf._normalize1 / x: (0, 79599984627874368360950651178230280919, -49, 126, 63, 'n') / result: (0, 2157561906583853685, 16, 61)

[3]libmpf._normalize1 / x: (0, 80102232795229841214833805686981625543, -49, 126, 63, 'n') / result: (0, 2171175370438195357, 16, 61)

[3]libmpf._normalize1 / x: (1, 1929743914758391793175373481, -47, 91, 63, 'n') / result: (1, 1797214071041337953, -17, 61)

[8]gammazeta.mpf_bernoulli / n: 36 / prec: 63 / result: (1, 1797214071041337953, -17, 61)

[3]libmpf._normalize1 / x: (1, 3877600617655278576776155369189406805, -1, 122, 63, 'n') / result: (1, 6726564821908778997, 58, 63)

[3]libmpf._normalize1 / x: (1, 3902066926449914076865200056072484221, -1, 122, 63, 'n') / result: (1, 6769007102145331017, 58, 63)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (0, 806505909389660391423, -87, 70, 63, 'n') / result: (0, 393801713569170113, -76, 59)

[3]libmpf._normalize1 / x: (0, 811594680660735105859, -87, 70, 63, 'n') / result: (0, 6340583442661993015, -80, 63)

[3]libmpf._normalize1 / x: (0, 43048871869185428546241, -76, 76, 63, 'n') / result: (0, 5254989241843924383, -63, 63)

[3]libmpf._normalize1 / x: (1, 440020544284355623294409, -80, 79, 63, 'n') / result: (1, 6714180668401422475, -64, 63)

[1]ctx_mp_python.convert / x: -35 / result: -35.0

[2]libmpf._normalize1 / x: (1, 35, 0, 6, 63, 'n') / result: (1, 35, 0, 6)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 681537437310973549225, 171, 70, 63, 'n') / result: (0, 5324511228991980853, 178, 63)

[3]libmpf._normalize1 / x: (0, 74746786691055153805, 171, 67, 63, 'n') / result: (0, 4671674168190947113, 175, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 19663374381299085611698705938723824007, -286, 124, 63, 'n') / result: (0, 8527629289040112101, -225, 63)

[3]libmpf._normalize1 / x: (1, 27562909309462106023502224689617045103, -285, 125, 63, 'n') / result: (1, 5976753230667950037, -223, 63)

[1]ctx_mp_python.convert / x: -36 / result: -36.0

[2]libmpf._normalize1 / x: (1, 9, 2, 4, 63, 'n') / result: (1, 9, 2, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 266572954282648943591, 177, 68, 63, 'n') / result: (1, 8330404821332779487, 182, 63)

[3]libmpf._normalize1 / x: (1, 1106947313312114694617, 177, 70, 63, 'n') / result: (1, 2162006471312724013, 186, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 28601271827344124528241542663201047503, -291, 125, 63, 'n') / result: (0, 6201912210210990619, -229, 63)

[3]libmpf._normalize1 / x: (1, 20045752225063349834969440368089924511, -289, 124, 63, 'n') / result: (1, 8693459244607927327, -228, 63)

[2]libmpf._normalize. / x: (1, 8330404821332779487, 182, 63, 63, 'n') / result: (1, 8330404821332779487, 182, 63)

[2]libmpf._normalize. / x: (1, 2162006471312724013, 186, 61, 63, 'n') / result: (1, 2162006471312724013, 186, 61)

[3]libmpf._normalize1 / x: (1, 653114524015368725265755549012930336485, -47, 129, 63, 'n') / result: (1, 8851352322741236633, 19, 63)

[3]libmpf._normalize1 / x: (1, 34848559858574585978658931857619931127, -46, 125, 63, 'n') / result: (1, 3778288430665770927, 17, 62)

[3]libmpf._normalize1 / x: (0, 17181666013769096711720228171, -45, 94, 63, 'n') / result: (0, 8000836714063350443, -14, 63)

[8]gammazeta.mpf_bernoulli / n: 38 / prec: 63 / result: (0, 8000836714063350443, -14, 63)

[3]libmpf._normalize1 / x: (1, 70818224632898000265862880277068378419, 5, 126, 63, 'n') / result: (1, 7678127299855447661, 68, 63)

[3]libmpf._normalize1 / x: (1, 30229468792391499741719865251161970661, 3, 125, 63, 'n') / result: (1, 3277485573779362223, 66, 62)

[1]ctx_mp_python.convert / x: -523022617466601111760007224100074291200000000 / result: -5.23022617466601112e+44

[3]libmpf._normalize1 / x: (0, 670477435249873764987, -87, 70, 63, 'n') / result: (0, 5238104962889638789, -80, 63)

[3]libmpf._normalize1 / x: (0, 572400023015356512859, -90, 69, 63, 'n') / result: (0, 8943750359614945513, -84, 63)

[3]libmpf._normalize1 / x: (0, 688787188011929746367365, -80, 80, 63, 'n') / result: (0, 5255029205413282367, -63, 63)

[3]libmpf._normalize1 / x: (1, 7040319764799330358200087, -84, 83, 63, 'n') / result: (1, 6714172138976412161, -64, 63)

[1]ctx_mp_python.convert / x: -37 / result: -37.0

[2]libmpf._normalize1 / x: (1, 37, 0, 6, 63, 'n') / result: (1, 37, 0, 6)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 3150985375711045579781, 182, 72, 63, 'n') / result: (1, 3077134155967817949, 192, 62)

[3]libmpf._normalize1 / x: (0, 528237078287602641099, 184, 69, 63, 'n') / result: (0, 8253704348243791267, 190, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 20800924965341181475389663161232324657, -295, 124, 63, 'n') / result: (0, 1127620401856543749, -231, 60)

[3]libmpf._normalize1 / x: (1, 29157457781910327034207346657197704381, -294, 125, 63, 'n') / result: (1, 6322515814260310783, -232, 63)

[1]ctx_mp_python.convert / x: -38 / result: -38.0

[2]libmpf._normalize1 / x: (1, 19, 1, 5, 63, 'n') / result: (1, 19, 1, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 323273706632871863737, 192, 69, 63, 'n') / result: (0, 5051151666138622871, 198, 63)

[3]libmpf._normalize1 / x: (0, 458606448576931555727, 191, 69, 63, 'n') / result: (0, 3582862879507277779, 198, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 3781986357334760268557570890037440047, -297, 122, 63, 'n') / result: (0, 102510945623322159, -232, 57)

[3]libmpf._normalize1 / x: (1, 21205423841389328751236082986703641949, -298, 124, 63, 'n') / result: (1, 2299096659731022103, -235, 61)

[2]libmpf._normalize. / x: (0, 5051151666138622871, 198, 63, 63, 'n') / result: (0, 5051151666138622871, 198, 63)

[2]libmpf._normalize. / x: (0, 3582862879507277779, 198, 62, 63, 'n') / result: (0, 3582862879507277779, 198, 62)

[3]libmpf._normalize1 / x: (0, 12379734748810969812652259736717737149, -37, 124, 63, 'n') / result: (0, 41944172842047325, 31, 56)

[3]libmpf._normalize1 / x: (1, 8674824628878174747463902798330278825, -37, 123, 63, 'n') / result: (1, 7524210966848381445, 23, 63)

[3]libmpf._normalize1 / x: (1, 5304203340691314808984868911, -38, 93, 63, 'n') / result: (1, 2469962155768328723, -7, 62)

[8]gammazeta.mpf_bernoulli / n: 40 / prec: 63 / result: (1, 2469962155768328723, -7, 62)

[3]libmpf._normalize1 / x: (1, 103600519574862598226006876922815975, 24, 117, 63, 'n') / result: (1, 2875492054878542265, 79, 62)

[3]libmpf._normalize1 / x: (0, 18584516340132529195895426225253744735, 16, 124, 63, 'n') / result: (0, 2014937299056404401, 79, 61)

[1]ctx_mp_python.convert / x: -815915283247897734345611269596115894272000000000 / result: -8.15915283247897734e+47

[3]libmpf._normalize1 / x: (0, 659289834834112953441, -88, 70, 63, 'n') / result: (0, 5150701834641507449, -81, 63)

[3]libmpf._normalize1 / x: (1, 923965466600534142031, -89, 70, 63, 'n') / result: (1, 7218480207816672985, -82, 63)

[3]libmpf._normalize1 / x: (0, 1377579526725694134322297, -81, 81, 63, 'n') / result: (0, 328440553361342939, -59, 59)

[3]libmpf._normalize1 / x: (1, 1760087159680040406206169, -82, 81, 63, 'n') / result: (1, 6714199675293122887, -64, 63)

[1]ctx_mp_python.convert / x: -39 / result: -39.0

[2]libmpf._normalize1 / x: (1, 39, 0, 6, 63, 'n') / result: (1, 39, 0, 6)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 161291372971321485931, 198, 68, 63, 'n') / result: (0, 5040355405353796435, 203, 63)

[3]libmpf._normalize1 / x: (1, 644846818914646120481, 198, 70, 63, 'n') / result: (1, 314866610798167051, 209, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 343816941575887297141597353639767277, -298, 119, 63, 'n') / result: (0, 9319176874847469, -233, 54)

[3]libmpf._normalize1 / x: (1, 7711063215050665000754389583160159909, -301, 123, 63, 'n') / result: (1, 6688281191944791573, -241, 63)

[1]ctx_mp_python.convert / x: -40 / result: -40.0

[2]libmpf._normalize1 / x: (1, 5, 3, 3, 63, 'n') / result: (1, 5, 3, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 277095065665302622975, 206, 68, 63, 'n') / result: (1, 1082402600255088371, 214, 60)

[3]libmpf._normalize1 / x: (0, 75505745776982001765, 205, 67, 63, 'n') / result: (0, 2359554555530687555, 210, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 31256085597807936103781577603615207, -299, 115, 63, 'n') / result: (0, 3470122589034112093, -246, 62)

[3]libmpf._normalize1 / x: (1, 22432183898329207277056194630614132319, -307, 125, 63, 'n') / result: (1, 2432102251616287845, -244, 62)

[2]libmpf._normalize. / x: (1, 1082402600255088371, 214, 60, 63, 'n') / result: (1, 1082402600255088371, 214, 60)

[2]libmpf._normalize. / x: (0, 2359554555530687555, 210, 62, 63, 'n') / result: (0, 2359554555530687555, 210, 62)

[3]libmpf._normalize1 / x: (1, 9285600906980114851965497099299813037, -34, 123, 63, 'n') / result: (1, 8053974940944968717, 26, 63)

[3]libmpf._normalize1 / x: (0, 176668826842291793815527707313911734295, -36, 128, 63, 'n') / result: (0, 4788618146821954077, 29, 63)

[3]libmpf._normalize1 / x: (0, 7230088225199077963422274409, -33, 93, 63, 'n') / result: (0, 841693047573682615, 0, 60)

[8]gammazeta.mpf_bernoulli / n: 42 / prec: 63 / result: (0, 841693047573682615, 0, 60)

[3]libmpf._normalize1 / x: (1, 6778974713126041183997190923661754955, 26, 123, 63, 'n') / result: (1, 2939911644478221217, 87, 62)

[3]libmpf._normalize1 / x: (0, 4030546601665210874269475173303271355, 29, 122, 63, 'n') / result: (0, 6991883810927181909, 88, 63)

[1]ctx_mp_python.convert / x: -1405006117752879898543142606244511569936384000000000 / result: -1.4050061177528799e+51

[3]libmpf._normalize1 / x: (0, 400834685768874606193, -90, 69, 63, 'n') / result: (0, 3131520982569332861, -83, 62)

[3]libmpf._normalize1 / x: (1, 476645200468751695317, -88, 69, 63, 'n') / result: (1, 7447581257324245239, -82, 63)

[3]libmpf._normalize1 / x: (0, 5510321238423759107010685, -83, 83, 63, 'n') / result: (0, 1313762960058154847, -61, 61)

[3]libmpf._normalize1 / x: (1, 1760094607261297730334967, -82, 81, 63, 'n') / result: (1, 3357114042780490361, -63, 62)

[2]libmpf._normalize. / x: (0, 22, 0, 5, 63, 'n') / result: (0, 11, 1, 4)

[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)

[2]libmpf._normalize. / x: (0, 799633470164863695528, -73, 70, 63, 'n') / result: (0, 6247136485662997621, -66, 63)

[2]libmpf._normalize. / x: (1, 5711019384969705841654, -73, 73, 63, 'n') / result: (1, 5577167368134478361, -63, 63)

[3]libmpf._normalize1 / x: (0, 445092063231603567605, -66, 69, 63, 'n') / result: (0, 434660217999612859, -56, 59)

[2]libmpf._normalize1 / x: (1, 547958713596238755, -63, 59, 63, 'n') / result: (1, 547958713596238755, -63, 59)

[2]libmpf._normalize1 / x: (0, 43, 0, 6, 63, 'n') / result: (0, 43, 0, 6)

[2]libmpf._normalize. / x: (0, 36376095460795824230704307, -83, 85, 63, 'n') / result: (0, 8672736993025737817, -61, 63)

[3]libmpf._normalize1 / x: (0, 627773893652404672411, -71, 70, 63, 'n') / result: (0, 4904483544159411503, -64, 63)

[3]libmpf._normalize1 / x: (0, 878579810766445621153, -75, 70, 63, 'n') / result: (0, 6863904771612856415, -68, 63)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (1, 111011033510729444063425, -68, 77, 73, 'd') / result: (1, 1734547398605147563491, -62, 71)

[2]libmpf._normalize. / x: (0, 6377670459875794279337619251, -93, 93, 63, 'n') / result: (0, 1484917118185151899, -61, 61)

[2]libmpf._normalize. / x: (0, 7576610991772281933075777068, -93, 93, 63, 'n') / result: (0, 3528134427858647859, -62, 62)

[2]libmpf._normalize. / x: (0, 37249121751854924012241214849, -93, 95, 73, 'd') / result: (0, 4440441340429177762537, -70, 72)

[2]libmpf._normalize1 / x: (1, 4440441340429177762537, -70, 72, 73, 'd') / result: (1, 4440441340429177762537, -70, 72)

[3]libmpf._normalize1 / x: (0, 111011033510729444063425, -68, 77, 73, 'd') / result: (0, 1734547398605147563491, -62, 71)

[2]libmpf._normalize. / x: (0, 3598662904899361264242083, -87, 82, 67, 'n') / result: (0, 27455619086451425661, -70, 65)

[2]libmpf._normalize. / x: (0, 102042727358012708469401908069, -97, 97, 67, 'n') / result: (0, 95034695563849721541, -67, 67)

[2]libmpf._normalize. / x: (1, 121225775868356510929212433068, -97, 97, 67, 'n') / result: (1, 112900301691476731495, -67, 67)

[3]libmpf._normalize1 / x: (0, 2609236401397933046639709559777311863601, -137, 131, 63, 'n') / result: (0, 8840436796637183399, -69, 63)

[3]libmpf._normalize1 / x: (1, 3099747677986632726077193615151249893195, -137, 132, 63, 'n') / result: (1, 1312794205714845715, -66, 61)

[3]libmpf._normalize1 / x: (0, 1041394927775239388601, -69, 70, 63, 'n') / result: (0, 8135897873244057723, -62, 63)

[3]libmpf._normalize1 / x: (0, 223636508327359276405, -67, 68, 63, 'n') / result: (0, 1747160221307494347, -60, 61)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[3]libmpf._normalize1 / x: (0, 115033935626565223525806916889147247273, -124, 127, 73, 'd') / result: (0, 6385666197293039721183, -70, 73)

[3]libmpf._normalize1 / x: (0, 770138674715095542283, -71, 70, 63, 'n') / result: (0, 1504177099052920981, -62, 61)

[3]libmpf._normalize1 / x: (1, 661540092226437039705, -71, 70, 63, 'n') / result: (1, 5168281970519039373, -64, 63)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1484917118185151899, -62, 61, 63, 'n') / result: (0, 1484917118185151899, -62, 61)

[2]libmpf._normalize1 / x: (0, 3528134427858647859, -63, 62, 63, 'n') / result: (0, 3528134427858647859, -63, 62)

[2]libmpf._normalize. / x: (0, 2989094217238072880, -62, 62, 63, 'n') / result: (0, 186818388577379555, -58, 58)

[2]libmpf._normalize1 / x: (0, 1887986885198256345, -64, 61, 63, 'n') / result: (0, 1887986885198256345, -64, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 10192329692960675962528893628051582085, -129, 123, 63, 'n') / result: (0, 4420218398318591699, -68, 62)

[3]libmpf._normalize1 / x: (0, 24216778734270568170094562342614165485, -130, 125, 63, 'n') / result: (0, 1312794205714845715, -66, 61)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 100, 0, 7, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 32819855142871142875, -64, 65, 63, 'n') / result: (0, 8204963785717785719, -62, 63)

[3]libmpf._normalize1 / x: (1, 110505459957964792475, -66, 67, 63, 'n') / result: (1, 3453295623686399765, -61, 62)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (0, 50451622363063683689273287426046795395, -127, 126, 63, 'n') / result: (0, 5469975857145190479, -64, 63)

[3]libmpf._normalize1 / x: (1, 21234020193668074920860486683930456825, -126, 124, 63, 'n') / result: (1, 9208788329830399373, -65, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 5469975857145190479, -65, 63, 63, 'n') / result: (1, 5469975857145190479, -65, 63)

[2]libmpf._normalize1 / x: (0, 9208788329830399373, -66, 63, 63, 'n') / result: (0, 9208788329830399373, -66, 63)

[3]libmpf._normalize1 / x: (0, 18442777880759392561, -65, 64, 63, 'n') / result: (0, 1152673617547462035, -61, 60)

[3]libmpf._normalize1 / x: (0, 16760735870623424753, -66, 64, 63, 'n') / result: (0, 1047545991913964047, -62, 60)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 625, 4, 10, 63, 'n') / result: (1, 625, 4, 10)

[2]libmpf._normalize1 / x: (0, 25, 2, 5, 63, 'n') / result: (0, 25, 2, 5)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 30339958155789919141877670065497899085, -136, 125, 63, 'n') / result: (0, 822366213640668223, -71, 60)

[3]libmpf._normalize1 / x: (0, 9010894412751839319264579122173011725, -134, 123, 63, 'n') / result: (0, 7815705038674430303, -74, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 1875, 4, 11, 63, 'n') / result: (0, 1875, 4, 11)

[2]libmpf._normalize1 / x: (0, 124975, 3, 17, 63, 'n') / result: (0, 124975, 3, 17)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 5644643377821380304986735958352200545, -139, 123, 63, 'n') / result: (0, 2447973845255942617, -78, 62)

[3]libmpf._normalize1 / x: (0, 53646255108476066643168123320663943745, -142, 126, 63, 'n') / result: (0, 5816338633432134179, -79, 63)

[2]libmpf._normalize. / x: (0, 30000, 0, 15, 63, 'n') / result: (0, 1875, 4, 11)

[2]libmpf._normalize. / x: (0, 999800, 0, 20, 63, 'n') / result: (0, 124975, 3, 17)

[3]libmpf._normalize1 / x: (1, 708537116873761399393025, -76, 80, 63, 'n') / result: (1, 5405709204664317317, -59, 63)

[2]libmpf._normalize. / x: (0, 316841166248546680145200, -75, 79, 63, 'n') / result: (0, 302163282631441765, -55, 59)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 6647848949022577941223396268409987797, -124, 123, 63, 'n') / result: (0, 2883044909154302569, -63, 62)

[3]libmpf._normalize1 / x: (1, 371595249544944844476216653275613365, -120, 119, 63, 'n') / result: (1, 2578460011788303061, -63, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[3]libmpf._normalize1 / x: (1, 492039664495667638443, -75, 69, 63, 'n') / result: (1, 7688119757744806851, -69, 63)

[3]libmpf._normalize1 / x: (0, 440057175345203722411, -75, 69, 63, 'n') / result: (0, 6875893364768808163, -69, 63)

[3]libmpf._normalize1 / x: (0, 287396326334405474109, -69, 68, 63, 'n') / result: (0, 4490567598975085533, -63, 62)

[3]libmpf._normalize1 / x: (0, 140961780329756206179, -69, 67, 63, 'n') / result: (0, 4405055635304881443, -64, 62)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 6243125, 4, 23, 63, 'n') / result: (0, 6243125, 4, 23)

[2]libmpf._normalize1 / x: (1, 749925, 3, 20, 63, 'n') / result: (1, 749925, 3, 20)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 16802659357235736719745847456700338055, -146, 124, 63, 'n') / result: (0, 7286991911459550115, -85, 63)

[3]libmpf._normalize1 / x: (0, 39922794499331026339261484907740908285, -147, 125, 63, 'n') / result: (0, 4328438052786704505, -84, 62)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 31234375, 5, 25, 63, 'n') / result: (1, 31234375, 5, 25)

[2]libmpf._normalize1 / x: (1, 311406325, 5, 29, 63, 'n') / result: (1, 311406325, 5, 29)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 50017218551771495346853195965991737725, -153, 126, 63, 'n') / result: (0, 5422877701551293109, -90, 63)

[3]libmpf._normalize1 / x: (0, 29709986604153321924817133837598649575, -152, 125, 63, 'n') / result: (0, 6442326404147653217, -90, 63)

[2]libmpf._normalize. / x: (1, 999500000, 0, 30, 63, 'n') / result: (1, 31234375, 5, 25)

[2]libmpf._normalize. / x: (1, 9965002400, 0, 34, 63, 'n') / result: (1, 311406325, 5, 29)

[2]libmpf._normalize. / x: (0, 1836800994256694274978975650, -85, 91, 63, 'n') / result: (0, 6842616924109661113, -57, 63)

[2]libmpf._normalize. / x: (1, 1889940454744084342021248800, -85, 91, 63, 'n') / result: (1, 3520288420364417773, -56, 62)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (0, 24042667274949442253853645413697922539, -124, 125, 63, 'n') / result: (0, 2606711209184632805, -61, 62)

[3]libmpf._normalize1 / x: (1, 12369116105924891883954132812121936519, -123, 124, 63, 'n') / result: (1, 5364249021507684225, -62, 63)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (1, 474537293903122487523, -78, 69, 63, 'n') / result: (1, 1853661304309072217, -70, 61)

[3]libmpf._normalize1 / x: (0, 488265866491010546347, -78, 69, 63, 'n') / result: (0, 7629154163922039787, -72, 63)

[3]libmpf._normalize1 / x: (0, 572938991364501876007, -70, 69, 63, 'n') / result: (0, 8952171740070341813, -64, 63)

[3]libmpf._normalize1 / x: (0, 1135323396801971689195, -72, 70, 63, 'n') / result: (0, 4434857018757701911, -64, 62)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 30984460625, 5, 35, 63, 'n') / result: (1, 30984460625, 5, 35)

[2]libmpf._normalize1 / x: (0, 4680469125, 5, 33, 63, 'n') / result: (0, 4680469125, 5, 33)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 37222116131550880259240688472395944235, -158, 125, 63, 'n') / result: (0, 4035629917433520453, -95, 62)

[3]libmpf._normalize1 / x: (0, 44219514945716572168925570188233837055, -158, 126, 63, 'n') / result: (0, 2397144708520057011, -94, 62)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 326976838125, 6, 39, 63, 'n') / result: (0, 326976838125, 6, 39)

[2]libmpf._normalize1 / x: (0, 1535181623875, 6, 41, 63, 'n') / result: (0, 1535181623875, 6, 41)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 27700179446735538796137834608654755995, -163, 125, 63, 'n') / result: (0, 6006518946877797883, -101, 63)

[3]libmpf._normalize1 / x: (0, 16453773003057329179294721576357075565, -162, 124, 63, 'n') / result: (0, 3567843287099619737, -100, 62)

[2]libmpf._normalize. / x: (0, 20926517640000, 0, 45, 63, 'n') / result: (0, 326976838125, 6, 39)

[2]libmpf._normalize. / x: (0, 98251623928000, 0, 47, 63, 'n') / result: (0, 1535181623875, 6, 41)

[3]libmpf._normalize1 / x: (1, 8990582329054216940939162152375, -95, 103, 63, 'n') / result: (1, 8176886994128123607, -55, 63)

[3]libmpf._normalize1 / x: (0, 11554301744586493142196185402875, -95, 104, 63, 'n') / result: (0, 2627144054846779259, -53, 62)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 10055796113355044888159649128884431687, -120, 123, 63, 'n') / result: (0, 2180503198434166295, -58, 61)

[3]libmpf._normalize1 / x: (1, 3230816934968407101736784180518130219, -118, 122, 63, 'n') / result: (1, 2802286991836564543, -58, 62)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (1, 907310841984644586089, -82, 70, 63, 'n') / result: (1, 7088365953005035829, -75, 63)

[3]libmpf._normalize1 / x: (0, 583018032688892361555, -81, 69, 63, 'n') / result: (0, 9109656760763943149, -75, 63)

[3]libmpf._normalize1 / x: (0, 18326959357711054997195, -75, 74, 63, 'n') / result: (0, 8948710623882351073, -64, 63)

[3]libmpf._normalize1 / x: (0, 9091696831176537456877, -75, 73, 63, 'n') / result: (0, 554913136668489835, -61, 59)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 151229324520625, 6, 48, 63, 'n') / result: (0, 151229324520625, 6, 48)

[2]libmpf._normalize1 / x: (1, 43443955179625, 6, 46, 63, 'n') / result: (1, 43443955179625, 6, 46)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 41228174060257546111510502446669969445, -169, 125, 63, 'n') / result: (0, 8939935176748350337, -107, 63)

[3]libmpf._normalize1 / x: (0, 24489336562689978311293753926881062855, -168, 125, 63, 'n') / result: (0, 5310278380799434027, -106, 63)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 1388557528531875, 8, 51, 63, 'n') / result: (1, 1388557528531875, 8, 51)

[2]libmpf._normalize1 / x: (1, 3693845202656375, 8, 52, 63, 'n') / result: (1, 3693845202656375, 8, 52)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 61362863717592626767268143171697861855, -175, 126, 63, 'n') / result: (0, 6652975015254586297, -112, 63)

[3]libmpf._normalize1 / x: (0, 36449245116561828183133788788816233205, -174, 125, 63, 'n') / result: (0, 3951835074083299741, -111, 62)

[2]libmpf._normalize. / x: (1, 355470727304160000, 0, 59, 63, 'n') / result: (1, 1388557528531875, 8, 51)

[2]libmpf._normalize. / x: (1, 945624371880032000, 0, 60, 63, 'n') / result: (1, 3693845202656375, 8, 52)

[3]libmpf._normalize1 / x: (0, 19956895515617372361280710196280875, -104, 114, 63, 'n') / result: (0, 8862641960590776851, -53, 63)

[3]libmpf._normalize1 / x: (1, 35549760530760248546254236670182125, -104, 115, 63, 'n') / result: (1, 7893632532232130693, -52, 63)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (0, 49541481231496216480075081555338736255, -119, 126, 63, 'n') / result: (0, 671412269741725519, -53, 60)

[3]libmpf._normalize1 / x: (1, 44124793676967872134715584628926489465, -118, 126, 63, 'n') / result: (1, 149500616140760051, -50, 58)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (1, 397334344779795176189, -84, 69, 63, 'n') / result: (1, 1552087284296074907, -76, 61)

[3]libmpf._normalize1 / x: (0, 353891235150140074751, -83, 69, 63, 'n') / result: (0, 1382387637305234667, -75, 61)

[3]libmpf._normalize1 / x: (0, 36652366628137813920101, -76, 75, 63, 'n') / result: (0, 8948331696322708477, -64, 63)

[3]libmpf._normalize1 / x: (0, 9093079218813842691307, -75, 73, 63, 'n') / result: (0, 8879960174622893253, -65, 63)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 356887502508850625, 8, 59, 63, 'n') / result: (1, 356887502508850625, 8, 59)

[2]libmpf._normalize1 / x: (0, 172100359677094875, 8, 58, 63, 'n') / result: (0, 172100359677094875, 8, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 45665386952627071080543019057287545255, -180, 126, 63, 'n') / result: (0, 2475525587071473971, -116, 62)

[3]libmpf._normalize1 / x: (0, 27125019621627407019846914801639688515, -179, 125, 63, 'n') / result: (0, 5881801040496074033, -117, 63)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 10389455496398996875, 9, 64, 63, 'n') / result: (0, 2597363874099749219, 11, 62)

[3]libmpf._normalize1 / x: (0, 16983873327057056875, 9, 64, 63, 'n') / result: (0, 4245968331764264219, 11, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 16991771889349607844082609527632873965, -184, 124, 63, 'n') / result: (0, 3684503199362193817, -122, 62)

[3]libmpf._normalize1 / x: (0, 40372122227538466261299605196438971695, -185, 125, 63, 'n') / result: (0, 8754308525389505537, -123, 63)

[2]libmpf._normalize. / x: (0, 5319401214156286400512, 0, 73, 63, 'n') / result: (0, 2597363874099749219, 11, 62)

[2]libmpf._normalize. / x: (0, 8695743143453213120512, 0, 73, 63, 'n') / result: (0, 4245968331764264219, 11, 62)

[3]libmpf._normalize1 / x: (1, 18030525757241137961490306488286722757, -112, 124, 63, 'n') / result: (1, 7819494078822674683, -51, 63)

[3]libmpf._normalize1 / x: (0, 54026692512122125510278530751464193449, -112, 126, 63, 'n') / result: (0, 2928792869692457179, -48, 62)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (0, 9127540877841484491424483284724879873, -113, 123, 63, 'n') / result: (0, 1979219929841197145, -51, 61)

[3]libmpf._normalize1 / x: (1, 3418722026179156477031526054244383649, -110, 122, 63, 'n') / result: (1, 5930537356651979225, -51, 63)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (1, 567893543253925245261, -88, 69, 63, 'n') / result: (1, 8873336613342581957, -82, 63)

[3]libmpf._normalize1 / x: (0, 425409251151170080853, -86, 69, 63, 'n') / result: (0, 6647019549237032513, -80, 63)

[3]libmpf._normalize1 / x: (0, 2345742590864206748412731, -82, 81, 63, 'n') / result: (0, 8948297847229792589, -64, 63)

[3]libmpf._normalize1 / x: (0, 290985182021592203146817, -80, 78, 63, 'n') / result: (0, 1110020378195160687, -62, 60)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 396025830561329180491, 11, 69, 63, 'n') / result: (0, 6187903602520768445, 17, 63)

[3]libmpf._normalize1 / x: (1, 306442039059381828309, 11, 69, 63, 'n') / result: (1, 4788156860302841067, 17, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 25290079091124997719350145296221786055, -190, 125, 63, 'n') / result: (0, 5483911738585590797, -128, 63)

[3]libmpf._normalize1 / x: (0, 60088740059592135827419365869028469855, -191, 126, 63, 'n') / result: (0, 6514834251452655283, -128, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 138267632315133332010, 19, 67, 63, 'n') / result: (1, 8641727019695833251, 23, 63)

[2]libmpf._normalize. / x: (1, 140333119482110687924, 19, 67, 63, 'n') / result: (1, 8770819967631917995, 23, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 37641047949581391951667974833506412755, -196, 125, 63, 'n') / result: (0, 8162101192313437465, -134, 63)

[3]libmpf._normalize1 / x: (0, 44717201904812752241266538051970190445, -196, 126, 63, 'n') / result: (0, 4848248745267092303, -133, 63)

[2]libmpf._normalize. / x: (1, 72492060411236624376004608, 0, 86, 63, 'n') / result: (1, 8641727019695833251, 23, 63)

[2]libmpf._normalize. / x: (1, 73574970547036848348200960, 0, 86, 63, 'n') / result: (1, 8770819967631917995, 23, 63)

[3]libmpf._normalize1 / x: (0, 14511583394963402025413919179927236255, -111, 124, 63, 'n') / result: (0, 786674512151194621, -47, 60)

[3]libmpf._normalize1 / x: (1, 155382804475737088085817493384467816781, -111, 127, 63, 'n') / result: (1, 8423318708974225637, -47, 63)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (0, 4232545156864325591226760745243206655, -109, 122, 63, 'n') / result: (0, 3671147723372241565, -49, 62)

[3]libmpf._normalize1 / x: (1, 45319984638756650693137383945848652535, -109, 126, 63, 'n') / result: (1, 4913602580234964955, -46, 63)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (1, 740821055988979033001, -93, 70, 63, 'n') / result: (1, 5787664499913898695, -86, 63)

[3]libmpf._normalize1 / x: (0, 495771421703526114741, -89, 69, 63, 'n') / result: (0, 7746428464117595543, -83, 63)

[3]libmpf._normalize1 / x: (0, 37531875666162808061314361, -86, 85, 63, 'n') / result: (0, 8948296467343046203, -64, 63)

[3]libmpf._normalize1 / x: (0, 2327889202601201742658967, -83, 81, 63, 'n') / result: (0, 8880192575840765925, -65, 63)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 764739545507145967237, 23, 70, 63, 'n') / result: (1, 5974527699274577869, 30, 63)

[3]libmpf._normalize1 / x: (0, 978193361548798259035, 23, 70, 63, 'n') / result: (0, 7642135637099986399, 30, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 56023885320307188019012084356126587975, -202, 126, 63, 'n') / result: (0, 6074121817535581369, -139, 63)

[3]libmpf._normalize1 / x: (0, 33277917696604838872911716019290673745, -201, 125, 63, 'n') / result: (0, 3607999066245277993, -138, 62)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 423928475749921365033, 31, 69, 63, 'n') / result: (0, 6623882433592521329, 37, 63)

[3]libmpf._normalize1 / x: (0, 245231435504028988657, 31, 68, 63, 'n') / result: (0, 957935294937613237, 39, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 41692193726740232942305952031746132135, -207, 125, 63, 'n') / result: (0, 9040553402843655991, -145, 63)

[3]libmpf._normalize1 / x: (0, 24764962006775694045436433184468375095, -206, 125, 63, 'n') / result: (0, 5370045121853437013, -144, 63)

[2]libmpf._normalize. / x: (0, 910379469594520668743598604288, 0, 100, 63, 'n') / result: (0, 6623882433592521329, 37, 63)

[2]libmpf._normalize. / x: (0, 526630497720468891291097235456, 0, 99, 63, 'n') / result: (0, 957935294937613237, 39, 60)

[3]libmpf._normalize1 / x: (0, 18730316814003478685462922815329803391, -108, 124, 63, 'n') / result: (0, 2030745018108434347, -45, 61)

[3]libmpf._normalize1 / x: (0, 52891077930948753259643361376432456011, -107, 126, 63, 'n') / result: (0, 1433615539945868929, -42, 61)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (1, 16604793116728083921992487211709448915, -105, 124, 63, 'n') / result: (1, 3600590554165787761, -43, 62)

[3]libmpf._normalize1 / x: (1, 11722244416436375032475881143729574905, -102, 124, 63, 'n') / result: (1, 1270928286270639195, -39, 61)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (0, 775021799906093357723, -95, 70, 63, 'n') / result: (0, 6054857811766354357, -88, 63)

[3]libmpf._normalize1 / x: (0, 547130873760373513913, -92, 69, 63, 'n') / result: (0, 8548919902505836155, -86, 63)

[3]libmpf._normalize1 / x: (0, 150127508719509044012065205, -88, 87, 63, 'n') / result: (0, 8948296828240695239, -64, 63)

[3]libmpf._normalize1 / x: (0, 18623122169729516446981755, -86, 84, 63, 'n') / result: (0, 4440098326141718971, -64, 62)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 283815881471157474865, 37, 68, 63, 'n') / result: (0, 4434623147986835545, 43, 62)

[2]libmpf._normalize. / x: (1, 179966090263877231780, 39, 68, 63, 'n') / result: (1, 5623940320746163493, 44, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 62053497639799416471790446877137532265, -213, 126, 63, 'n') / result: (0, 6727853695139464923, -150, 63)

[3]libmpf._normalize1 / x: (0, 36859478335666149278046024586215488395, -212, 125, 63, 'n') / result: (0, 999078162205290607, -147, 60)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 149467754314627758415, 46, 68, 63, 'n') / result: (1, 2335433661166058725, 52, 62)

[3]libmpf._normalize1 / x: (1, 65874056133701580681, 45, 66, 63, 'n') / result: (1, 8234257016712697585, 48, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 46179347080780961091614523030728031045, -218, 126, 63, 'n') / result: (0, 1251693710723621381, -153, 61)

[3]libmpf._normalize1 / x: (0, 6857577364775097539622708892439193905, -215, 123, 63, 'n') / result: (0, 5948000221501265009, -155, 63)

[2]libmpf._normalize. / x: (1, 10517858166175975288697475668377600, 0, 114, 63, 'n') / result: (1, 2335433661166058725, 52, 62)

[2]libmpf._normalize. / x: (1, 2317737302008762306102111774965760, 0, 111, 63, 'n') / result: (1, 8234257016712697585, 48, 63)

[3]libmpf._normalize1 / x: (1, 138110485472297518126122341243983047135, -107, 127, 63, 'n') / result: (1, 7486984419604633403, -43, 63)

[3]libmpf._normalize1 / x: (1, 65871407455970043234948415065819678985, -105, 126, 63, 'n') / result: (1, 1785448076711014391, -40, 61)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (1, 14828312642478450099180945356372558947, -98, 124, 63, 'n') / result: (1, 6430755512507762639, -37, 63)

[3]libmpf._normalize1 / x: (1, 3536160996817040020479931082159178559, -95, 122, 63, 'n') / result: (1, 95847835875188543, -30, 57)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (0, 579016210394436624601, -96, 69, 63, 'n') / result: (0, 9047128287413072259, -90, 63)

[3]libmpf._normalize1 / x: (0, 552320304835275284581, -95, 69, 63, 'n') / result: (0, 4315002381525588161, -88, 62)

[3]libmpf._normalize1 / x: (0, 600510043925164463472570755, -90, 89, 63, 'n') / result: (0, 8948296963053412191, -64, 63)

[3]libmpf._normalize1 / x: (0, 74492492993920447313352897, -88, 86, 63, 'n') / result: (0, 4440098583335903127, -64, 62)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 47046936458525446325, 50, 66, 63, 'n') / result: (1, 5880867057315680791, 53, 63)

[3]libmpf._normalize1 / x: (0, 3876676227149809818945, 48, 72, 63, 'n') / result: (0, 7571633256151972303, 57, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 8591506433633667179675634406377009115, -221, 123, 63, 'n') / result: (0, 7451943952215048221, -161, 63)

[3]libmpf._normalize1 / x: (0, 40826507101916859769978929130380682735, -223, 125, 63, 'n') / result: (0, 4426418769489313495, -160, 62)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 6110234408437418969519, 54, 73, 63, 'n') / result: (0, 2983512894744833481, 65, 62)

[3]libmpf._normalize1 / x: (1, 398135918010049986041, 55, 69, 63, 'n') / result: (1, 777609214863378879, 64, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 51149433651400437157452408152774187715, -229, 126, 63, 'n') / result: (0, 1386408177156288041, -164, 61)

[3]libmpf._normalize1 / x: (0, 30382516913054407270203116694356820425, -228, 125, 63, 'n') / result: (0, 6588158168542234039, -166, 63)

[2]libmpf._normalize. / x: (0, 110072197619940572517663485234188910592, 0, 127, 63, 'n') / result: (0, 2983512894744833481, 65, 62)

[2]libmpf._normalize. / x: (1, 14344358175942971715969435869814718464, 0, 124, 63, 'n') / result: (1, 777609214863378879, 64, 60)

[3]libmpf._normalize1 / x: (0, 38213945892239601568538989287681068049, -102, 125, 63, 'n') / result: (0, 8286328631121938827, -40, 63)

[3]libmpf._normalize1 / x: (0, 17499687300226922347877617439505687681, -101, 124, 63, 'n') / result: (0, 474329974718075527, -36, 59)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (1, 19746020674094013581648028811230495071, -92, 124, 63, 'n') / result: (1, 8563471405118565699, -31, 63)

[3]libmpf._normalize1 / x: (1, 1130311131029505185452610281425944171, -88, 120, 63, 'n') / result: (1, 3921554508309558989, -30, 62)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (0, 1038878934617791709801, -99, 70, 63, 'n') / result: (0, 8116241676701497733, -92, 63)

[3]libmpf._normalize1 / x: (0, 951488053595439249601, -99, 70, 63, 'n') / result: (0, 3716750209357184569, -91, 62)

[3]libmpf._normalize1 / x: (0, 2402040183816899530548541829, -92, 91, 63, 'n') / result: (0, 8948296993288768569, -64, 63)

[3]libmpf._normalize1 / x: (0, 595939947668113787891220025, -91, 89, 63, 'n') / result: (0, 8880197222055700241, -65, 63)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 95567205743320780089, 65, 67, 63, 'n') / result: (1, 1493237589739387189, 71, 61)

[3]libmpf._normalize1 / x: (1, 581928003866562497499, 64, 69, 63, 'n') / result: (1, 9092625060415039023, 70, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 9516173702586127842448831194514633015, -232, 123, 63, 'n') / result: (0, 8253964961674645081, -172, 63)

[3]libmpf._normalize1 / x: (0, 45220490289197257331916459398232510185, -234, 126, 63, 'n') / result: (0, 1225703845310183077, -169, 61)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 212383250612982103685, 72, 68, 63, 'n') / result: (1, 1659244145413922685, 79, 61)

[3]libmpf._normalize1 / x: (0, 120125004789044554565, 72, 67, 63, 'n') / result: (0, 1876953199828821165, 78, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 56654429485163923897155116831739044615, -240, 126, 63, 'n') / result: (0, 6142485552874154479, -177, 63)

[3]libmpf._normalize1 / x: (0, 8413114472408792061592273730563888955, -237, 123, 63, 'n') / result: (0, 1824303397670970161, -175, 61)

[2]libmpf._normalize. / x: (1, 1002951544217650717849058798306617228001280, 0, 140, 63, 'n') / result: (1, 1659244145413922685, 79, 61)

[2]libmpf._normalize. / x: (0, 567274296370339620718765932969996331253760, 0, 139, 63, 'n') / result: (0, 1876953199828821165, 78, 61)

[3]libmpf._normalize1 / x: (1, 17040147391330278574712868573092971245, -98, 124, 63, 'n') / result: (1, 3694992964230697823, -36, 62)

[3]libmpf._normalize1 / x: (1, 12686559942984825568112330350093270245, -99, 124, 63, 'n') / result: (1, 5501918340620690059, -38, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (1, 3220052850210838945071921879451113811, -83, 122, 63, 'n') / result: (1, 2792950636573385743, -23, 62)

[3]libmpf._normalize1 / x: (1, 4794723022708524510476201065574354063, -85, 122, 63, 'n') / result: (1, 8317518588298955015, -26, 63)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (0, 375496880698054765553, -100, 69, 63, 'n') / result: (0, 366696172556694107, -90, 59)

[3]libmpf._normalize1 / x: (0, 559122356864519969177, -102, 69, 63, 'n') / result: (0, 4368143413004062259, -95, 62)

[3]libmpf._normalize1 / x: (0, 600510046320921055181189723, -90, 89, 63, 'n') / result: (0, 8948296998752967345, -64, 63)

[3]libmpf._normalize1 / x: (0, 9535039167057964019372641843, -95, 93, 63, 'n') / result: (0, 8880197226123850811, -65, 63)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 128691787045133434635, 79, 67, 63, 'n') / result: (0, 8043236690320839665, 83, 63)

[3]libmpf._normalize1 / x: (0, 292432811886379292535, 78, 68, 63, 'n') / result: (0, 2284631342862338223, 85, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 42161435895935943366122866569156132785, -245, 125, 63, 'n') / result: (0, 285697002459262999, -178, 58)

[3]libmpf._normalize1 / x: (0, 12521844796143318416455488253442432815, -243, 124, 63, 'n') / result: (0, 678810566575244711, -179, 60)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 368450664978938408285, 84, 69, 63, 'n') / result: (0, 5757041640295912629, 90, 63)

[3]libmpf._normalize1 / x: (1, 251342806800992432531, 85, 68, 63, 'n') / result: (1, 7854462712531013517, 90, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 1960997018415625272683298334109288585, -246, 121, 63, 'n') / result: (0, 3401787564166108267, -187, 62)

[3]libmpf._normalize1 / x: (0, 4659291086937048712620839482331171065, -247, 122, 63, 'n') / result: (0, 4041290814959596419, -187, 62)

[2]libmpf._normalize. / x: (0, 7126872354355492177398205115510829918921424896, 0, 153, 63, 'n') / result: (0, 5757041640295912629, 90, 63)

[2]libmpf._normalize. / x: (1, 9723353878916197390031528725320546262406135808, 0, 153, 63, 'n') / result: (1, 7854462712531013517, 90, 63)

[2]libmpf._normalize. / x: (0, 51326400674939310979754857005340399566, -97, 126, 63, 'n') / result: (0, 1391204877940766551, -32, 61)

[2]libmpf._normalize. / x: (1, 3453334076426599444455014561937169488, -97, 122, 63, 'n') / result: (1, 1497644923191976849, -36, 61)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (1, 8475976489722993675439796468231174917, -78, 123, 63, 'n') / result: (1, 918967212409372959, -15, 60)

[3]libmpf._normalize1 / x: (0, 9124467114949742197916714660557032883, -82, 123, 63, 'n') / result: (0, 7914213655040842723, -22, 63)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (0, 916777530455429987991, -104, 70, 63, 'n') / result: (0, 7162324456683046781, -97, 63)

[3]libmpf._normalize1 / x: (1, 986919493996707583589, -108, 70, 63, 'n') / result: (1, 7710308546849277997, -101, 63)

[3]libmpf._normalize1 / x: (0, 76865285936240219516144945021, -97, 96, 63, 'n') / result: (0, 2237074249896692913, -62, 61)

[3]libmpf._normalize1 / x: (0, 610242506683999388714399954899, -101, 99, 63, 'n') / result: (0, 8880197226011651055, -65, 63)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 917858228979907342167, 90, 70, 63, 'n') / result: (1, 7170767413905526111, 97, 63)

[3]libmpf._normalize1 / x: (1, 395051521641377952009, 90, 69, 63, 'n') / result: (1, 1543170006411632625, 98, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 23349545893693026501530265434015482805, -255, 125, 63, 'n') / result: (0, 1265781419224598425, -191, 61)

[3]libmpf._normalize1 / x: (0, 27739035308276383033437181680195177885, -255, 125, 63, 'n') / result: (0, 1503736117194268435, -191, 61)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 17066947918574237292, 100, 64, 63, 'n') / result: (1, 4266736979643559323, 102, 62)

[3]libmpf._normalize1 / x: (0, 197787225424577744275, 99, 68, 63, 'n') / result: (0, 6180850794518054509, 104, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 8688203123234614512676185145560146375, -259, 123, 63, 'n') / result: (0, 470988435060315693, -195, 59)

[3]libmpf._normalize1 / x: (0, 10321501510056328570740902596621760525, -259, 123, 63, 'n') / result: (0, 4476237744206194411, -198, 62)

[2]libmpf._normalize. / x: (1, 21634926773044562356577777888326097202750834081792, 0, 164, 63, 'n') / result: (1, 4266736979643559323, 102, 62)

[2]libmpf._normalize. / x: (0, 125362547513471046187837335453797329803580637446144, 0, 167, 63, 'n') / result: (0, 6180850794518054509, 104, 63)

[3]libmpf._normalize1 / x: (1, 31686125163441156893980435331455860877, -94, 125, 63, 'n') / result: (1, 858854143496262789, -29, 60)

[3]libmpf._normalize1 / x: (0, 74056566664762918659540725142557967831, -96, 126, 63, 'n') / result: (0, 1003653630809419297, -30, 60)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (1, 5384578152374506977238461167095154391, -71, 123, 63, 'n') / result: (1, 583797133072242399, -8, 60)

[3]libmpf._normalize1 / x: (0, 6292397206128475208267250851504568843, -72, 123, 63, 'n') / result: (0, 5457784576820969021, -12, 63)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (0, 458756790983867874599, -106, 69, 63, 'n') / result: (0, 7168074859122935541, -100, 63)

[3]libmpf._normalize1 / x: (1, 536101411882447752523, -107, 69, 63, 'n') / result: (1, 8376584560663246133, -101, 63)

[3]libmpf._normalize1 / x: (0, 614922287497089831012081223413, -100, 99, 63, 'n') / result: (0, 4474148499845540435, -63, 62)

[3]libmpf._normalize1 / x: (0, 610242506675622804178359110347, -101, 99, 63, 'n') / result: (0, 8880197225889755707, -65, 63)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 2579008742298310786675, 102, 72, 63, 'n') / result: (0, 5037126449801388255, 111, 63)

[2]libmpf._normalize. / x: (1, 47852845371862379650, 104, 66, 63, 'n') / result: (1, 373850354467674841, 111, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 3232819766784972841766396687380220595, -263, 122, 63, 'n') / result: (0, 5608048343043758949, -204, 63)

[3]libmpf._normalize1 / x: (0, 30724469611330466442018330208518496565, -266, 125, 63, 'n') / result: (0, 6662307340213870751, -204, 63)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 84175161570801789365, 112, 67, 63, 'n') / result: (1, 5260947598175111835, 116, 63)

[3]libmpf._normalize1 / x: (1, 246996267881989639817, 112, 68, 63, 'n') / result: (1, 1929658342828044061, 119, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 38493109781253630114479533976608307835, -272, 125, 63, 'n') / result: (0, 4173431325055820613, -209, 62)

[3]libmpf._normalize1 / x: (0, 45729443142445345400317911182731217665, -272, 126, 63, 'n') / result: (0, 1239499040039789907, -207, 61)

[2]libmpf._normalize. / x: (1, 437062426990735677478789120166383277283198450070978560, 0, 179, 63, 'n') / result: (1, 5260947598175111835, 116, 63)

[2]libmpf._normalize. / x: (1, 1282477945793481549770837839685546015133930656595181568, 0, 180, 63, 'n') / result: (1, 1929658342828044061, 119, 61)

[3]libmpf._normalize1 / x: (0, 54581705727583043702625065966757699609, -93, 126, 63, 'n') / result: (0, 1479440098195250911, -28, 61)

[3]libmpf._normalize1 / x: (1, 22627532646865415255508072265781308131, -91, 125, 63, 'n') / result: (1, 613320501342953991, -26, 60)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (1, 11101245992087594965389965060994155547, -66, 124, 63, 'n') / result: (1, 4814398008766947771, -5, 63)

[3]libmpf._normalize1 / x: (0, 4602161159282061205291603222628404707, -64, 122, 63, 'n') / result: (0, 7983477003235229389, -5, 63)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (0, 320273287367458729153, -109, 69, 63, 'n') / result: (0, 5004270115116542643, -103, 63)

[3]libmpf._normalize1 / x: (1, 531093278908928556951, -109, 69, 63, 'n') / result: (1, 4149166241476004351, -102, 62)

[3]libmpf._normalize1 / x: (0, 4919378299981722918376393665203, -103, 102, 63, 'n') / result: (0, 279634281240630737, -59, 58)

[3]libmpf._normalize1 / x: (0, 1220485013347096442174343460353, -102, 100, 63, 'n') / result: (0, 8880197225859566549, -65, 63)

[1]ctx_mp_python.convert / x: -27 / result: -27.0

[2]libmpf._normalize1 / x: (1, 27, 0, 5, 63, 'n') / result: (1, 27, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 1401681089111707229255, 116, 71, 63, 'n') / result: (1, 1368829188585651591, 126, 61)

[3]libmpf._normalize1 / x: (0, 235725240467092175169, 118, 68, 63, 'n') / result: (0, 3683206882298315237, 124, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 28646035186049213107013254518766282395, -277, 125, 63, 'n') / result: (0, 3105809358181075805, -214, 62)

[3]libmpf._normalize1 / x: (0, 8507803375338668910569673396757203405, -275, 123, 63, 'n') / result: (0, 7379343122097353865, -215, 63)

[1]ctx_mp_python.convert / x: -28 / result: -28.0

[2]libmpf._normalize1 / x: (1, 7, 2, 3, 63, 'n') / result: (1, 7, 2, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 130407389337856125473, 126, 67, 63, 'n') / result: (0, 4075230916808003921, 131, 62)

[3]libmpf._normalize1 / x: (0, 111100470682476952441, 126, 67, 63, 'n') / result: (0, 867972427206851191, 133, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 21317979673338949288780470693695539075, -282, 125, 63, 'n') / result: (0, 4622599974967182593, -220, 63)

[3]libmpf._normalize1 / x: (0, 50651108467132540491312281485690293975, -283, 126, 63, 'n') / result: (0, 1372901045971600719, -218, 61)

[2]libmpf._normalize. / x: (0, 4075230916808003921, 131, 62, 63, 'n') / result: (0, 4075230916808003921, 131, 62)

[2]libmpf._normalize. / x: (0, 867972427206851191, 133, 60, 63, 'n') / result: (0, 867972427206851191, 133, 60)

[3]libmpf._normalize1 / x: (1, 228081716966553556677311412958754111, -89, 118, 63, 'n') / result: (1, 3165269670903824671, -33, 62)

[2]libmpf._normalize. / x: (0, 9607178108540108967303578355874937462, -87, 123, 63, 'n') / result: (0, 8332898701387492369, -27, 63)

[3]libmpf._normalize1 / x: (0, 2774302105120921920279183245, -62, 92, 63, 'n') / result: (0, 5167540358604717851, -33, 63)

[8]gammazeta.mpf_bernoulli / n: 30 / prec: 63 / result: (0, 5167540358604717851, -33, 63)

[3]libmpf._normalize1 / x: (1, 16356658770262987397173010300727902021, -66, 124, 63, 'n') / result: (1, 3546784994664642061, -4, 62)

[3]libmpf._normalize1 / x: (0, 43060590343584710008528263205660579019, -60, 126, 63, 'n') / result: (0, 583579819987785955, 6, 60)

[1]ctx_mp_python.convert / x: -265252859812191058636308480000000 / result: -2.65252859812191059e+32

[3]libmpf._normalize1 / x: (0, 555423548646672459769, -119, 69, 63, 'n') / result: (0, 271202904612633037, -108, 58)

[3]libmpf._normalize1 / x: (1, 365552436952102440499, -111, 69, 63, 'n') / result: (1, 5711756827376600633, -105, 63)

[3]libmpf._normalize1 / x: (0, 157420105599415404585462590699981, -108, 107, 63, 'n') / result: (0, 1118537124962524875, -61, 60)

[3]libmpf._normalize1 / x: (0, 9763880106771059780245412264391, -105, 103, 63, 'n') / result: (0, 1110024653231796467, -62, 60)

[1]ctx_mp_python.convert / x: -29 / result: -29.0

[2]libmpf._normalize1 / x: (1, 29, 0, 5, 63, 'n') / result: (1, 29, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 229007274295308362691, 131, 68, 63, 'n') / result: (0, 3578238660864193167, 137, 62)

[2]libmpf._normalize. / x: (1, 127051973309198782564, 133, 67, 63, 'n') / result: (1, 3970374165912461955, 138, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 31729086025434715217158328469596384095, -288, 125, 63, 'n') / result: (0, 6880148799951155487, -226, 63)

[3]libmpf._normalize1 / x: (0, 9423462040396751718835035757457762385, -286, 123, 63, 'n') / result: (0, 31927931301665133, -218, 55)

[1]ctx_mp_python.convert / x: -30 / result: -30.0

[2]libmpf._normalize1 / x: (1, 15, 1, 4, 63, 'n') / result: (1, 15, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 450710996504209093005, 138, 69, 63, 'n') / result: (1, 3521179660189133539, 145, 62)

[2]libmpf._normalize. / x: (1, 29900354032917899850, 139, 65, 63, 'n') / result: (1, 3737544254114737481, 142, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 47224686177391204042386745803870399105, -294, 126, 63, 'n') / result: (0, 5120110734847371525, -231, 63)

[3]libmpf._normalize1 / x: (0, 219150280009226784158954319940878195, -286, 118, 63, 'n') / result: (0, 6082642167982343477, -231, 63)

[2]libmpf._normalize. / x: (1, 3521179660189133539, 145, 62, 63, 'n') / result: (1, 3521179660189133539, 145, 62)

[2]libmpf._normalize. / x: (1, 3737544254114737481, 142, 62, 63, 'n') / result: (1, 3737544254114737481, 142, 62)

[3]libmpf._normalize1 / x: (1, 121496493934906402177079639909940854363, -89, 127, 63, 'n') / result: (1, 6586338133679871719, -25, 63)

[3]libmpf._normalize1 / x: (1, 190481247514325281458802101128798229349, -89, 128, 63, 'n') / result: (1, 2581502279659757019, -23, 62)

[3]libmpf._normalize1 / x: (1, 17427925518308093708320995697, -60, 94, 63, 'n') / result: (1, 8115510231958745843, -29, 63)

[8]gammazeta.mpf_bernoulli / n: 32 / prec: 63 / result: (1, 8115510231958745843, -29, 63)

[3]libmpf._normalize1 / x: (0, 53451494515019068920570012392364514117, -54, 126, 63, 'n') / result: (0, 2897611323789034937, 10, 62)

[3]libmpf._normalize1 / x: (0, 20950208164403585865987376885356322017, -52, 124, 63, 'n') / result: (0, 9085704482347967935, 9, 63)

[1]ctx_mp_python.convert / x: -263130836933693530167218012160000000 / result: -2.6313083693369353e+35

[3]libmpf._normalize1 / x: (1, 468401029676878371449, -115, 69, 63, 'n') / result: (1, 3659383044350612277, -108, 62)

[3]libmpf._normalize1 / x: (1, 734355449941198541821, -115, 70, 63, 'n') / result: (1, 717143994083201701, -105, 60)

[3]libmpf._normalize1 / x: (0, 157420105599411745200653688171723, -108, 107, 63, 'n') / result: (0, 2237074249924997747, -62, 61)

[3]libmpf._normalize1 / x: (0, 9763880106770342635781083737435, -105, 103, 63, 'n') / result: (0, 8880197225853719497, -65, 63)

[1]ctx_mp_python.convert / x: -31 / result: -31.0

[2]libmpf._normalize1 / x: (1, 31, 0, 5, 63, 'n') / result: (1, 31, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 124874532578857842393, 144, 67, 63, 'n') / result: (0, 3902329143089307575, 149, 62)

[3]libmpf._normalize1 / x: (0, 2932807600028863693111, 142, 72, 63, 'n') / result: (0, 5728139843806374401, 151, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 35143952504105082076618621459984582875, -299, 125, 63, 'n') / result: (0, 7620629930935622735, -237, 63)

[3]libmpf._normalize1 / x: (0, 41750676600827577108338515573612854955, -299, 125, 63, 'n') / result: (0, 4526617427335697471, -236, 62)

[1]ctx_mp_python.convert / x: -32 / result: -32.0

[2]libmpf._normalize1 / x: (1, 1, 5, 1, 63, 'n') / result: (1, 1, 5, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 135398837808980744875, 153, 67, 63, 'n') / result: (0, 8462427363061296555, 157, 63)

[3]libmpf._normalize1 / x: (1, 280858703579036670207, 151, 68, 63, 'n') / result: (1, 1097104310855611993, 159, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 52307278145644773324137472030164595025, -305, 126, 63, 'n') / result: (0, 5671166460231161105, -242, 63)

[3]libmpf._normalize1 / x: (0, 31070270958755406218403012694601626465, -304, 125, 63, 'n') / result: (0, 6737291054639177631, -242, 63)

[2]libmpf._normalize. / x: (0, 8462427363061296555, 157, 63, 63, 'n') / result: (0, 8462427363061296555, 157, 63)

[2]libmpf._normalize. / x: (1, 1097104310855611993, 159, 60, 63, 'n') / result: (1, 1097104310855611993, 159, 60)

[3]libmpf._normalize1 / x: (0, 77557878471670029209083383909350207607, -85, 126, 63, 'n') / result: (0, 8408842033235138003, -22, 63)

[3]libmpf._normalize1 / x: (0, 32126391489289203678981609234800832145, -85, 125, 63, 'n') / result: (0, 217696896542544843, -18, 58)

[3]libmpf._normalize1 / x: (0, 15478498771225430759843386699, -55, 94, 63, 'n') / result: (0, 7207737663400094379, -24, 63)

[8]gammazeta.mpf_bernoulli / n: 34 / prec: 63 / result: (0, 7207737663400094379, -24, 63)

[3]libmpf._normalize1 / x: (0, 60608727428530732350622016889289585137, -46, 126, 63, 'n') / result: (0, 6571211394959480069, 17, 63)

[3]libmpf._normalize1 / x: (0, 1569102120415014251389938635039737497, -42, 121, 63, 'n') / result: (0, 5443916568977824095, 16, 63)

[1]ctx_mp_python.convert / x: -295232799039604140847618609643520000000 / result: -2.95232799039604141e+38

[3]libmpf._normalize1 / x: (1, 484730395655465450085, -117, 69, 63, 'n') / result: (1, 3786956216058323829, -110, 62)

[3]libmpf._normalize1 / x: (1, 401574637276181619557, -118, 69, 63, 'n') / result: (1, 3137301853720168903, -111, 62)

[3]libmpf._normalize1 / x: (0, 629680422397643193835362212568203, -110, 109, 63, 'n') / result: (0, 2237074249924984293, -62, 61)

[3]libmpf._normalize1 / x: (0, 624888326833298791364423268546105, -111, 109, 63, 'n') / result: (0, 8880197225853674913, -65, 63)

[1]ctx_mp_python.convert / x: -33 / result: -33.0

[2]libmpf._normalize1 / x: (1, 33, 0, 6, 63, 'n') / result: (1, 33, 0, 6)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 718101827323267583515, 157, 70, 63, 'n') / result: (1, 1402542631490756999, 166, 61)

[2]libmpf._normalize. / x: (1, 175356241818297218106, 159, 68, 63, 'n') / result: (1, 2739941278410894033, 165, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 38926346526991459217164641421097738575, -310, 125, 63, 'n') / result: (0, 8440805894297542109, -248, 63)

[3]libmpf._normalize1 / x: (0, 46244124217682465067495113022482852865, -310, 126, 63, 'n') / result: (0, 5013797994150085679, -247, 63)

[1]ctx_mp_python.convert / x: -34 / result: -34.0

[2]libmpf._normalize1 / x: (1, 17, 1, 5, 63, 'n') / result: (1, 17, 1, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 44655307224929481842, 167, 66, 63, 'n') / result: (1, 2790956701558092615, 171, 62)

[3]libmpf._normalize1 / x: (0, 186833264882060898461, 166, 68, 63, 'n') / result: (0, 5838539527564403077, 171, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 57936887854126823015628562639233279235, -316, 126, 63, 'n') / result: (0, 3140764983924666831, -252, 62)

[3]libmpf._normalize1 / x: (0, 34414231975949741446375886990174780785, -315, 125, 63, 'n') / result: (0, 7462397014548964731, -253, 63)

[2]libmpf._normalize. / x: (1, 2790956701558092615, 171, 62, 63, 'n') / result: (1, 2790956701558092615, 171, 62)

[2]libmpf._normalize. / x: (0, 5838539527564403077, 171, 63, 63, 'n') / result: (0, 5838539527564403077, 171, 63)

[3]libmpf._normalize1 / x: (1, 61100978099629812323981141309773983417, -82, 126, 63, 'n') / result: (1, 6624581319660787071, -19, 63)

[3]libmpf._normalize1 / x: (0, 15847734053426152335705595661965916409, -82, 124, 63, 'n') / result: (0, 3436429537939428711, -20, 62)

[3]libmpf._normalize1 / x: (1, 1929743914758391793175373481, -47, 91, 63, 'n') / result: (1, 1797214071041337953, -17, 61)

[8]gammazeta.mpf_bernoulli / n: 36 / prec: 63 / result: (1, 1797214071041337953, -17, 61)

[3]libmpf._normalize1 / x: (0, 11905790762451962102172891632884005663, -36, 124, 63, 'n') / result: (0, 5163313683923307025, 25, 63)

[3]libmpf._normalize1 / x: (1, 6175999519726824587837744301902168583, -37, 123, 63, 'n') / result: (1, 5356825677245804173, 23, 63)

[1]ctx_mp_python.convert / x: -371993326789901217467999448150835200000000 / result: -3.71993326789901217e+41

[3]libmpf._normalize1 / x: (1, 619074238986515608221, -120, 70, 63, 'n') / result: (1, 4836517492082153189, -113, 63)

[3]libmpf._normalize1 / x: (0, 642276061950302835829, -122, 70, 63, 'n') / result: (0, 5017781733986740905, -115, 63)

[3]libmpf._normalize1 / x: (0, 5037443379181140714100440763656475, -113, 112, 63, 'n') / result: (0, 8948296999699928581, -64, 63)

[3]libmpf._normalize1 / x: (0, 9998213229332785679320719134632617, -115, 113, 63, 'n') / result: (0, 4440098612926839685, -64, 62)

[1]ctx_mp_python.convert / x: -35 / result: -35.0

[2]libmpf._normalize1 / x: (1, 35, 0, 6, 63, 'n') / result: (1, 35, 0, 6)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 681537437310973549225, 171, 70, 63, 'n') / result: (0, 5324511228991980853, 178, 63)

[3]libmpf._normalize1 / x: (0, 74746786691055153805, 171, 67, 63, 'n') / result: (0, 4671674168190947113, 175, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 21557911759675096934291954645116070865, -320, 125, 63, 'n') / result: (0, 1168656738204527193, -256, 61)

[3]libmpf._normalize1 / x: (0, 51221182475832173311864812968002099365, -321, 126, 63, 'n') / result: (0, 2776705865878684551, -257, 62)

[1]ctx_mp_python.convert / x: -36 / result: -36.0

[2]libmpf._normalize1 / x: (1, 9, 2, 4, 63, 'n') / result: (1, 9, 2, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 266572954282648943591, 177, 68, 63, 'n') / result: (1, 8330404821332779487, 182, 63)

[3]libmpf._normalize1 / x: (1, 1106947313312114694617, 177, 70, 63, 'n') / result: (1, 2162006471312724013, 186, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 8021548561739570952773557875271993095, -324, 123, 63, 'n') / result: (0, 27178063679175051, -256, 55)

[3]libmpf._normalize1 / x: (0, 19059044642170110999284774259841744665, -325, 124, 63, 'n') / result: (0, 1033192880326952391, -261, 60)

[2]libmpf._normalize. / x: (1, 8330404821332779487, 182, 63, 63, 'n') / result: (1, 8330404821332779487, 182, 63)

[2]libmpf._normalize. / x: (1, 2162006471312724013, 186, 61, 63, 'n') / result: (1, 2162006471312724013, 186, 61)

[3]libmpf._normalize1 / x: (0, 1780961147966125600305535310663507409, -75, 121, 63, 'n') / result: (0, 772368778294860517, -14, 60)

[3]libmpf._normalize1 / x: (1, 38691599522330735458566140608788630873, -79, 125, 63, 'n') / result: (1, 8389903251810017803, -17, 63)

[3]libmpf._normalize1 / x: (0, 17181666013769096711720228171, -45, 94, 63, 'n') / result: (0, 8000836714063350443, -14, 63)

[8]gammazeta.mpf_bernoulli / n: 38 / prec: 63 / result: (0, 8000836714063350443, -14, 63)

[3]libmpf._normalize1 / x: (0, 6179596478177776246186969336375159031, -28, 123, 63, 'n') / result: (0, 5359945541379293679, 32, 63)

[3]libmpf._normalize1 / x: (1, 67126245964521081478965324521657936729, -31, 126, 63, 'n') / result: (1, 7277842170553008153, 32, 63)

[1]ctx_mp_python.convert / x: -523022617466601111760007224100074291200000000 / result: -5.23022617466601112e+44

[3]libmpf._normalize1 / x: (1, 468046751416929778337, -123, 69, 63, 'n') / result: (1, 7313230490889527787, -117, 63)

[3]libmpf._normalize1 / x: (0, 635523319958191061053, -123, 70, 63, 'n') / result: (0, 310314121073335479, -112, 59)

[3]libmpf._normalize1 / x: (0, 80599094066898244115807637163564565, -117, 116, 63, 'n') / result: (0, 8948296999699927769, -64, 63)

[3]libmpf._normalize1 / x: (0, 1249776653666598520273479816518839, -112, 110, 63, 'n') / result: (0, 8880197225853681575, -65, 63)

[1]ctx_mp_python.convert / x: -37 / result: -37.0

[2]libmpf._normalize1 / x: (1, 37, 0, 6, 63, 'n') / result: (1, 37, 0, 6)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 3150985375711045579781, 182, 72, 63, 'n') / result: (1, 3077134155967817949, 192, 62)

[3]libmpf._normalize1 / x: (0, 528237078287602641099, 184, 69, 63, 'n') / result: (0, 8253704348243791267, 190, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 186547640970687696576129252913302165, -324, 118, 63, 'n') / result: (0, 5177737154879116693, -269, 63)

[3]libmpf._normalize1 / x: (0, 7091737541272599441115457531223938265, -329, 123, 63, 'n') / result: (0, 6151101799155809583, -269, 63)

[1]ctx_mp_python.convert / x: -38 / result: -38.0

[2]libmpf._normalize1 / x: (1, 19, 1, 5, 63, 'n') / result: (1, 19, 1, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 323273706632871863737, 192, 69, 63, 'n') / result: (0, 5051151666138622871, 198, 63)

[3]libmpf._normalize1 / x: (0, 458606448576931555727, 191, 69, 63, 'n') / result: (0, 3582862879507277779, 198, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 35539494763531944427899957517838635595, -337, 125, 63, 'n') / result: (0, 3853199743165854283, -274, 62)

[3]libmpf._normalize1 / x: (0, 42220576989901987366051899980460024945, -337, 125, 63, 'n') / result: (0, 9155128259208646821, -275, 63)

[2]libmpf._normalize. / x: (0, 5051151666138622871, 198, 63, 63, 'n') / result: (0, 5051151666138622871, 198, 63)

[2]libmpf._normalize. / x: (0, 3582862879507277779, 198, 62, 63, 'n') / result: (0, 3582862879507277779, 198, 62)

[3]libmpf._normalize1 / x: (0, 6124623408267493433071841339801922427, -77, 123, 63, 'n') / result: (0, 5312264003919352767, -17, 63)

[3]libmpf._normalize1 / x: (0, 73854914014446378112445300088987798005, -77, 126, 63, 'n') / result: (0, 8007365822319289075, -14, 63)

[3]libmpf._normalize1 / x: (1, 5304203340691314808984868911, -38, 93, 63, 'n') / result: (1, 2469962155768328723, -7, 62)

[8]gammazeta.mpf_bernoulli / n: 40 / prec: 63 / result: (1, 2469962155768328723, -7, 62)

[3]libmpf._normalize1 / x: (1, 13121091051131138024954756191455626541, -24, 124, 63, 'n') / result: (1, 5690366169206596315, 37, 63)

[3]libmpf._normalize1 / x: (1, 19777890548521387498611380898262601225, -21, 124, 63, 'n') / result: (1, 2144323189988741327, 42, 61)

[1]ctx_mp_python.convert / x: -815915283247897734345611269596115894272000000000 / result: -8.15915283247897734e+47

[3]libmpf._normalize1 / x: (0, 652340625576916184079, -129, 70, 63, 'n') / result: (0, 637051392164957211, -119, 60)

[3]libmpf._normalize1 / x: (0, 983296392254055424125, -126, 70, 63, 'n') / result: (0, 7682003064484808001, -119, 63)

[3]libmpf._normalize1 / x: (0, 322396376267592977097820724978584603, -119, 118, 63, 'n') / result: (0, 8948296999699927787, -64, 63)

[3]libmpf._normalize1 / x: (0, 159971411669324618278549697020052801, -119, 117, 63, 'n') / result: (0, 8880197225853682001, -65, 63)

[1]ctx_mp_python.convert / x: -39 / result: -39.0

[2]libmpf._normalize1 / x: (1, 39, 0, 6, 63, 'n') / result: (1, 39, 0, 6)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 161291372971321485931, 198, 68, 63, 'n') / result: (0, 5040355405353796435, 203, 63)

[3]libmpf._normalize1 / x: (1, 644846818914646120481, 198, 70, 63, 'n') / result: (1, 314866610798167051, 209, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 26447996103093540038250030399291775445, -342, 125, 63, 'n') / result: (0, 5734994966572434281, -280, 63)

[3]libmpf._normalize1 / x: (0, 62839928543109934682919685018719206715, -343, 126, 63, 'n') / result: (0, 1703279676131841269, -278, 61)

[1]ctx_mp_python.convert / x: -40 / result: -40.0

[2]libmpf._normalize1 / x: (1, 5, 3, 3, 63, 'n') / result: (1, 5, 3, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 277095065665302622975, 206, 68, 63, 'n') / result: (1, 1082402600255088371, 214, 60)

[3]libmpf._normalize1 / x: (0, 75505745776982001765, 205, 67, 63, 'n') / result: (0, 2359554555530687555, 210, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (0, 39364459316232245633696481562276762615, -348, 125, 63, 'n') / result: (0, 8535806461875251023, -286, 63)

[3]libmpf._normalize1 / x: (0, 11691149496392545987360315706468390635, -346, 124, 63, 'n') / result: (0, 5070227873136643777, -285, 63)

[2]libmpf._normalize. / x: (1, 1082402600255088371, 214, 60, 63, 'n') / result: (1, 1082402600255088371, 214, 60)

[2]libmpf._normalize. / x: (0, 2359554555530687555, 210, 62, 63, 'n') / result: (0, 2359554555530687555, 210, 62)

[3]libmpf._normalize1 / x: (1, 85876912152501897182551619411307323499, -75, 127, 63, 'n') / result: (1, 4655396736104468689, -11, 63)

[3]libmpf._normalize1 / x: (1, 155476189658359716889893084842023833779, -76, 127, 63, 'n') / result: (1, 2107095282467024031, -10, 61)

[3]libmpf._normalize1 / x: (0, 7230088225199077963422274409, -33, 93, 63, 'n') / result: (0, 841693047573682615, 0, 60)

[8]gammazeta.mpf_bernoulli / n: 42 / prec: 63 / result: (0, 841693047573682615, 0, 60)

[3]libmpf._normalize1 / x: (1, 3918415066476345334591381893691141735, -11, 122, 63, 'n') / result: (1, 1699341651109434355, 50, 61)

[3]libmpf._normalize1 / x: (1, 1773527449827799065374458454371921065, -10, 121, 63, 'n') / result: (1, 6153159405011123883, 48, 63)

[1]ctx_mp_python.convert / x: -1405006117752879898543142606244511569936384000000000 / result: -1.4050061177528799e+51

[3]libmpf._normalize1 / x: (0, 463384726555143001477, -128, 69, 63, 'n') / result: (0, 3620193176212054699, -121, 62)

[3]libmpf._normalize1 / x: (0, 419468340354012346141, -128, 69, 63, 'n') / result: (0, 1638548204507860727, -120, 61)

[3]libmpf._normalize1 / x: (0, 1289585505070371912057343892831969963, -121, 120, 63, 'n') / result: (0, 2237074249924981953, -62, 61)

[3]libmpf._normalize1 / x: (0, 319942823338649238179908999657000695, -120, 118, 63, 'n') / result: (0, 4440098612926841023, -64, 62)

[2]libmpf._normalize1 / x: (0, 43, 0, 6, 63, 'n') / result: (0, 43, 0, 6)

[1]libmpf._normalize1 / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 8866461766385664, -48, 53, 53, 'd') / result: (0, 63, -1, 6)

[2]libmpf._normalize. / x: (1, 1001305660731199412229, -73, 70, 63, 'n') / result: (1, 488918779653905963, -62, 59)

[2]libmpf._normalize. / x: (1, 4090827670502434988754, -73, 72, 63, 'n') / result: (1, 7989897793950068337, -64, 63)

[3]libmpf._normalize1 / x: (0, 27329335172321317013, -62, 65, 63, 'n') / result: (0, 6832333793080329253, -60, 63)

[2]libmpf._normalize1 / x: (1, 9085815221142545847, -64, 63, 63, 'n') / result: (1, 9085815221142545847, -64, 63)

[2]libmpf._normalize1 / x: (0, 85, 0, 7, 63, 'n') / result: (0, 85, 0, 7)

[2]libmpf._normalize. / x: (0, 42966686492116143688264533, -83, 86, 63, 'n') / result: (0, 5122028171076314889, -60, 63)

[3]libmpf._normalize1 / x: (0, 1062961328772023194637, -72, 70, 63, 'n') / result: (0, 1038048172628928901, -62, 60)

[3]libmpf._normalize1 / x: (0, 888916043834286157873, -76, 70, 63, 'n') / result: (0, 217020518514230019, -64, 58)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (0, 43997886967926931136782886277, -93, 96, 73, 'd') / result: (0, 5244956847182146446321, -70, 73)

[3]libmpf._normalize1 / x: (1, 131123921179553661158025, -68, 77, 73, 'd') / result: (1, 1024405634215262977797, -61, 70)

[2]libmpf._normalize. / x: (1, 2643821553991668172904368831, -93, 92, 63, 'n') / result: (1, 2462250696487415743, -63, 62)

[2]libmpf._normalize. / x: (0, 9544104054654159508319285420, -93, 93, 63, 'n') / result: (0, 4444319780289269755, -62, 62)

[2]libmpf._normalize. / x: (0, 43997886967926931136782886277, -93, 96, 73, 'd') / result: (0, 5244956847182146446321, -70, 73)

[2]libmpf._normalize1 / x: (1, 5244956847182146446321, -70, 73, 73, 'd') / result: (1, 5244956847182146446321, -70, 73)

[3]libmpf._normalize1 / x: (0, 131123921179553661158025, -68, 77, 73, 'd') / result: (0, 1024405634215262977797, -61, 70)

[2]libmpf._normalize. / x: (0, 3641000115545236102645573, -88, 82, 67, 'n') / result: (0, 55557252739642884867, -72, 66)

[2]libmpf._normalize. / x: (1, 42301144863866690766469901299, -97, 96, 67, 'n') / result: (1, 78792022287597303775, -68, 67)

[2]libmpf._normalize. / x: (1, 152705664874466552133108566765, -97, 97, 67, 'n') / result: (1, 71109116484628316077, -66, 66)

[3]libmpf._normalize1 / x: (1, 4377468296099618549651656818111949472925, -140, 132, 63, 'n') / result: (1, 7415719744715040355, -71, 63)

[3]libmpf._normalize1 / x: (1, 3950627156629201539659573767428596106759, -138, 132, 63, 'n') / result: (1, 52286115062226703, -62, 56)

[3]libmpf._normalize1 / x: (0, 2684464810930722233955, -71, 72, 63, 'n') / result: (0, 5243095333849066863, -62, 63)

[3]libmpf._normalize1 / x: (1, 178700370889910990891, -69, 68, 63, 'n') / result: (1, 5584386590309718465, -64, 63)

[1]ctx_mp_python.convert / x: 1 / result: 1.0

[3]libmpf._normalize1 / x: (0, 471026152467308729838481338961076528529, -128, 129, 73, 'd') / result: (0, 3268400497936285244427, -71, 72)

[3]libmpf._normalize1 / x: (0, 484832973177043999093, -69, 69, 63, 'n') / result: (0, 3787757602945656243, -62, 62)

[3]libmpf._normalize1 / x: (0, 516392432628579905655, -71, 69, 63, 'n') / result: (0, 4034315879910780513, -64, 62)

[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 63, 'n') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (1, 2462250696487415743, -64, 62, 63, 'n') / result: (1, 2462250696487415743, -64, 62)

[2]libmpf._normalize1 / x: (0, 4444319780289269755, -63, 62, 63, 'n') / result: (0, 4444319780289269755, -63, 62)

[3]libmpf._normalize1 / x: (0, 12688779715295209229, -64, 64, 63, 'n') / result: (0, 3172194928823802307, -62, 62)

[3]libmpf._normalize1 / x: (0, 12922955440489320023, -64, 64, 63, 'n') / result: (0, 1615369430061165003, -61, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 534358922863722967464701904783789117, -127, 119, 63, 'n') / result: (1, 7415719744715040355, -71, 63)

[3]libmpf._normalize1 / x: (0, 964508583161426157132060101609775345, -126, 120, 63, 'n') / result: (0, 52286115062226703, -62, 56)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 63, 'n') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (1, 100, 0, 7, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 1307152876555667575, -60, 61, 63, 'n') / result: (0, 1307152876555667575, -60, 61)

[3]libmpf._normalize1 / x: (0, 185392993617876008875, -69, 68, 63, 'n') / result: (0, 5793531050558625277, -64, 63)

[3]libmpf._normalize1 / x: (0, 6602346876188694799461995861, -95, 93, 63, 'n') / result: (0, 6148914691236517205, -65, 63)

[8]gammazeta.mpf_bernoulli / n: 2 / prec: 63 / result: (0, 6148914691236517205, -65, 63)

[3]libmpf._normalize1 / x: (0, 8037571526345217976100500846748127875, -125, 123, 63, 'n') / result: (0, 6971482008296893733, -65, 63)

[3]libmpf._normalize1 / x: (0, 35623928190914864493668084146158390785, -129, 125, 63, 'n') / result: (0, 7724708067411500369, -67, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 6971482008296893733, -66, 63, 63, 'n') / result: (1, 6971482008296893733, -66, 63)

[2]libmpf._normalize1 / x: (1, 7724708067411500369, -68, 63, 63, 'n') / result: (1, 7724708067411500369, -68, 63)

[3]libmpf._normalize1 / x: (0, 43783636852883943179, -66, 66, 63, 'n') / result: (0, 5472954606610492897, -63, 63)

[3]libmpf._normalize1 / x: (0, 199042578980417620015, -68, 68, 63, 'n') / result: (0, 6220080593138050625, -63, 63)

[1]ctx_mp_python.convert / x: -1 / result: -1.0

[2]libmpf._normalize1 / x: (1, 1, 0, 1, 63, 'n') / result: (1, 1, 0, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 625, 4, 10, 63, 'n') / result: (1, 625, 4, 10)

[2]libmpf._normalize1 / x: (0, 25, 2, 5, 63, 'n') / result: (0, 25, 2, 5)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1609363344154271525456494241337416745, -135, 121, 63, 'n') / result: (1, 2791800374480956369, -76, 62)

[3]libmpf._normalize1 / x: (0, 11347159801899131260377177665997357, -126, 114, 63, 'n') / result: (0, 5039151230467778247, -75, 63)

[1]ctx_mp_python.convert / x: -2 / result: -2.0

[2]libmpf._normalize1 / x: (1, 1, 1, 1, 63, 'n') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 1875, 4, 11, 63, 'n') / result: (0, 1875, 4, 11)

[2]libmpf._normalize1 / x: (0, 124975, 3, 17, 63, 'n') / result: (0, 124975, 3, 17)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 605877964858078691949328450769041011, -140, 119, 63, 'n') / result: (1, 4204122916865440179, -83, 62)

[3]libmpf._normalize1 / x: (0, 1093599212907737450460390932842596693, -139, 120, 63, 'n') / result: (0, 948546113970405317, -79, 60)

[2]libmpf._normalize. / x: (0, 30000, 0, 15, 63, 'n') / result: (0, 1875, 4, 11)

[2]libmpf._normalize. / x: (0, 999800, 0, 20, 63, 'n') / result: (0, 124975, 3, 17)

[3]libmpf._normalize1 / x: (1, 956239135216733936272225, -79, 80, 63, 'n') / result: (1, 7295525628789779177, -62, 63)

[3]libmpf._normalize1 / x: (1, 468497494697034067350525, -80, 79, 63, 'n') / result: (1, 3574352223945877589, -63, 62)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 4 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 8971912943831600612565683082102248057, -127, 123, 63, 'n') / result: (0, 3890947002021215561, -66, 62)

[3]libmpf._normalize1 / x: (0, 4395677380294944898716594607524483749, -128, 122, 63, 'n') / result: (0, 7625284744417872189, -69, 63)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[3]libmpf._normalize1 / x: (1, 664054955011620789077, -78, 70, 63, 'n') / result: (1, 5187929336028287415, -71, 63)

[2]libmpf._normalize. / x: (1, 325345482428495880064, -79, 69, 63, 'n') / result: (1, 2541761581472624063, -72, 62)

[3]libmpf._normalize1 / x: (0, 1395888449956257894217, -71, 71, 63, 'n') / result: (0, 5452689257641632399, -63, 63)

[3]libmpf._normalize1 / x: (0, 3182139502105209295937, -72, 72, 63, 'n') / result: (0, 3107558107524618453, -62, 62)

[1]ctx_mp_python.convert / x: -3 / result: -3.0

[2]libmpf._normalize1 / x: (1, 3, 0, 2, 63, 'n') / result: (1, 3, 0, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 6243125, 4, 23, 63, 'n') / result: (0, 6243125, 4, 23)

[2]libmpf._normalize1 / x: (1, 749925, 3, 20, 63, 'n') / result: (1, 749925, 3, 20)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 912380935315694971362643445690533401, -147, 120, 63, 'n') / result: (1, 6330914510103251093, -90, 63)

[3]libmpf._normalize1 / x: (0, 205853969488515284774671897598611023, -143, 118, 63, 'n') / result: (0, 5713595415915853203, -88, 63)

[1]ctx_mp_python.convert / x: -4 / result: -4.0

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 63, 'n') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 31234375, 5, 25, 63, 'n') / result: (1, 31234375, 5, 25)

[2]libmpf._normalize1 / x: (1, 311406325, 5, 29, 63, 'n') / result: (1, 311406325, 5, 29)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1373938349651870074504696675515160767, -154, 121, 63, 'n') / result: (1, 2383403109685929823, -95, 62)

[3]libmpf._normalize1 / x: (0, 1239967439742586185811741248979900857, -152, 120, 63, 'n') / result: (0, 8604002508673284823, -95, 63)

[2]libmpf._normalize. / x: (1, 999500000, 0, 30, 63, 'n') / result: (1, 31234375, 5, 25)

[2]libmpf._normalize. / x: (1, 9965002400, 0, 34, 63, 'n') / result: (1, 311406325, 5, 29)

[2]libmpf._normalize. / x: (0, 2753784908020824716723971100, -90, 92, 63, 'n') / result: (0, 5129324100950406337, -61, 63)

[2]libmpf._normalize. / x: (0, 473466162524025179744939850, -90, 89, 63, 'n') / result: (0, 3527597803801485745, -63, 62)

[3]libmpf._normalize1 / x: (0, 3772769643536397028263997635, -97, 92, 63, 'n') / result: (0, 3513665537849438403, -67, 62)

[8]gammazeta.mpf_bernoulli / n: 6 / prec: 63 / result: (0, 3513665537849438403, -67, 62)

[3]libmpf._normalize1 / x: (0, 18022729325969996565244031910102359811, -128, 124, 63, 'n') / result: (0, 7816112915733952513, -67, 63)

[3]libmpf._normalize1 / x: (0, 12394798834610645096490711445260065235, -130, 124, 63, 'n') / result: (0, 671923391200282999, -66, 60)

[1]ctx_mp_python.convert / x: -720 / result: -720.0

[3]libmpf._normalize1 / x: (1, 711439966729917099849, -83, 70, 63, 'n') / result: (1, 5558124740077477343, -76, 63)

[3]libmpf._normalize1 / x: (1, 489279681841130518027, -85, 69, 63, 'n') / result: (1, 955624378595958043, -76, 60)

[3]libmpf._normalize1 / x: (0, 44662872273860175135265, -76, 76, 63, 'n') / result: (0, 681501346952212145, -60, 60)

[3]libmpf._normalize1 / x: (0, 50913276409304752775909, -76, 76, 63, 'n') / result: (0, 6214999561682709079, -63, 63)

[1]ctx_mp_python.convert / x: -5 / result: -5.0

[2]libmpf._normalize1 / x: (1, 5, 0, 3, 63, 'n') / result: (1, 5, 0, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 30984460625, 5, 35, 63, 'n') / result: (1, 30984460625, 5, 35)

[2]libmpf._normalize1 / x: (0, 4680469125, 5, 33, 63, 'n') / result: (0, 4680469125, 5, 33)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 517247378692468733877563090913956637, -159, 119, 63, 'n') / result: (1, 7178249365642329819, -103, 63)

[3]libmpf._normalize1 / x: (0, 1867245085730012138560109233323701637, -159, 121, 63, 'n') / result: (0, 6478307771236355631, -101, 63)

[1]ctx_mp_python.convert / x: -6 / result: -6.0

[2]libmpf._normalize1 / x: (1, 3, 1, 2, 63, 'n') / result: (1, 3, 1, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 326976838125, 6, 39, 63, 'n') / result: (0, 326976838125, 6, 39)

[2]libmpf._normalize1 / x: (0, 1535181623875, 6, 41, 63, 'n') / result: (0, 1535181623875, 6, 41)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1557827399356141127727219452028636561, -167, 121, 63, 'n') / result: (1, 2702399761182994755, -108, 62)

[3]libmpf._normalize1 / x: (0, 1405925711608479727762555667619886989, -165, 121, 63, 'n') / result: (0, 1219446168703314001, -105, 61)

[2]libmpf._normalize. / x: (0, 20926517640000, 0, 45, 63, 'n') / result: (0, 326976838125, 6, 39)

[2]libmpf._normalize. / x: (0, 98251623928000, 0, 47, 63, 'n') / result: (0, 1535181623875, 6, 41)

[3]libmpf._normalize1 / x: (1, 15860192925246177063701986025375, -102, 104, 63, 'n') / result: (1, 7212380717303939065, -61, 63)

[3]libmpf._normalize1 / x: (1, 958829233682282532968323070625, -102, 100, 63, 'n') / result: (1, 6976400863512262971, -65, 63)

[3]libmpf._normalize1 / x: (1, 10563755001901911679139193377, -98, 94, 63, 'n') / result: (1, 1229782938247303441, -65, 61)

[8]gammazeta.mpf_bernoulli / n: 8 / prec: 63 / result: (1, 1229782938247303441, -65, 61)

[3]libmpf._normalize1 / x: (0, 8869662750284232191519985343628822665, -126, 123, 63, 'n') / result: (0, 3846603049228767501, -65, 62)

[3]libmpf._normalize1 / x: (0, 8579458752321135694846942776425183211, -130, 123, 63, 'n') / result: (0, 3720747127206540251, -69, 62)

[1]ctx_mp_python.convert / x: -40320 / result: -40320.0

[3]libmpf._normalize1 / x: (1, 800288817251607958557, -88, 70, 63, 'n') / result: (1, 781532048097273397, -78, 60)

[3]libmpf._normalize1 / x: (1, 774104392789231180601, -92, 70, 63, 'n') / result: (1, 3023845284332934299, -84, 62)

[3]libmpf._normalize1 / x: (0, 178650707563392603265483, -78, 78, 63, 'n') / result: (0, 340749182822022635, -59, 59)

[3]libmpf._normalize1 / x: (0, 13033795736936732377508709, -84, 84, 63, 'n') / result: (0, 1553749529950229213, -61, 61)

[1]ctx_mp_python.convert / x: -7 / result: -7.0

[2]libmpf._normalize1 / x: (1, 7, 0, 3, 63, 'n') / result: (1, 7, 0, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (0, 151229324520625, 6, 48, 63, 'n') / result: (0, 151229324520625, 6, 48)

[2]libmpf._normalize1 / x: (1, 43443955179625, 6, 46, 63, 'n') / result: (1, 43443955179625, 6, 46)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 586476197404664895060109945340550345, -172, 119, 63, 'n') / result: (1, 4069496110957921513, -115, 62)

[3]libmpf._normalize1 / x: (0, 264644839832184419315454882097196019, -169, 118, 63, 'n') / result: (0, 1836342465812049319, -112, 61)

[1]ctx_mp_python.convert / x: -8 / result: -8.0

[2]libmpf._normalize1 / x: (1, 1, 3, 1, 63, 'n') / result: (1, 1, 3, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 1388557528531875, 8, 51, 63, 'n') / result: (1, 1388557528531875, 8, 51)

[2]libmpf._normalize1 / x: (1, 3693845202656375, 8, 52, 63, 'n') / result: (1, 3693845202656375, 8, 52)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 883164156091730665412921821830498747, -179, 120, 63, 'n') / result: (1, 6128182378854281807, -122, 63)

[3]libmpf._normalize1 / x: (0, 398523994100230654935964213738307061, -176, 119, 63, 'n') / result: (0, 2765315713222850739, -119, 62)

[2]libmpf._normalize. / x: (1, 355470727304160000, 0, 59, 63, 'n') / result: (1, 1388557528531875, 8, 51)

[2]libmpf._normalize. / x: (1, 945624371880032000, 0, 60, 63, 'n') / result: (1, 3693845202656375, 8, 52)

[3]libmpf._normalize1 / x: (0, 90226519227322642103168037686587125, -114, 117, 63, 'n') / result: (0, 626072244237237411, -57, 60)

[3]libmpf._normalize1 / x: (1, 8081842537770425822970416195375375, -114, 113, 63, 'n') / result: (1, 7178118133462186477, -64, 63)

[3]libmpf._normalize1 / x: (0, 12004267047615808726294537927, -97, 94, 63, 'n') / result: (0, 5589922446578652005, -66, 63)

[8]gammazeta.mpf_bernoulli / n: 10 / prec: 63 / result: (0, 5589922446578652005, -66, 63)

[3]libmpf._normalize1 / x: (0, 3499695291241605512182554429536159055, -123, 122, 63, 'n') / result: (0, 6071003580482302167, -64, 63)

[3]libmpf._normalize1 / x: (1, 40125123678433532330074714538599936385, -130, 125, 63, 'n') / result: (1, 4350374626340719077, -67, 62)

[1]ctx_mp_python.convert / x: -3628800 / result: -3628800.0

[3]libmpf._normalize1 / x: (1, 449094084684854354643, -92, 69, 63, 'n') / result: (1, 7017095073200849291, -86, 63)

[3]libmpf._normalize1 / x: (0, 643625879956239272929, -96, 70, 63, 'n') / result: (0, 628540898394764915, -86, 60)

[3]libmpf._normalize1 / x: (0, 45734574119133433233423989, -86, 86, 63, 'n') / result: (0, 5451986088649443773, -63, 63)

[3]libmpf._normalize1 / x: (0, 52135183576287827906786931, -86, 86, 63, 'n') / result: (0, 6214998194728830803, -63, 63)

[1]ctx_mp_python.convert / x: -9 / result: -9.0

[2]libmpf._normalize1 / x: (1, 9, 0, 4, 63, 'n') / result: (1, 9, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize1 / x: (1, 356887502508850625, 8, 59, 63, 'n') / result: (1, 356887502508850625, 8, 59)

[2]libmpf._normalize1 / x: (0, 172100359677094875, 8, 58, 63, 'n') / result: (0, 172100359677094875, 8, 58)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1329941317408723825386818557844964333, -186, 121, 63, 'n') / result: (1, 4614160849960871007, -128, 63)

[3]libmpf._normalize1 / x: (0, 600130249939170868566047888750134041, -183, 119, 63, 'n') / result: (0, 2082120066426617027, -125, 61)

[1]ctx_mp_python.convert / x: -10 / result: -10.0

[2]libmpf._normalize1 / x: (1, 5, 1, 3, 63, 'n') / result: (1, 5, 1, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 10389455496398996875, 9, 64, 63, 'n') / result: (0, 2597363874099749219, 11, 62)

[3]libmpf._normalize1 / x: (0, 16983873327057056875, 9, 64, 63, 'n') / result: (0, 4245968331764264219, 11, 62)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1001367580166568527214756473186159133, -192, 120, 63, 'n') / result: (1, 6948383397588135163, -135, 63)

[3]libmpf._normalize1 / x: (0, 451862776424787477506000521899933513, -189, 119, 63, 'n') / result: (0, 6270855729473105399, -133, 63)

[2]libmpf._normalize. / x: (0, 5319401214156286400512, 0, 73, 63, 'n') / result: (0, 2597363874099749219, 11, 62)

[2]libmpf._normalize. / x: (0, 8695743143453213120512, 0, 73, 63, 'n') / result: (0, 4245968331764264219, 11, 62)

[3]libmpf._normalize1 / x: (1, 124550899381911094808333513421261361221, -124, 127, 63, 'n') / result: (1, 6751917784744574021, -60, 63)

[3]libmpf._normalize1 / x: (0, 35648160662583691423618507527203100827, -124, 125, 63, 'n') / result: (0, 241561332721784609, -57, 58)

[3]libmpf._normalize1 / x: (1, 5013430430160866051020043011, -94, 93, 63, 'n') / result: (1, 1167280233968250931, -62, 61)

[8]gammazeta.mpf_bernoulli / n: 12 / prec: 63 / result: (1, 1167280233968250931, -62, 61)

[3]libmpf._normalize1 / x: (0, 7881380171511040889833018286031663551, -122, 123, 63, 'n') / result: (0, 6836007603309158459, -62, 63)

[3]libmpf._normalize1 / x: (1, 281969768977167247870802608645720979, -119, 118, 63, 'n') / result: (1, 3913116622083590677, -63, 62)

[1]ctx_mp_python.convert / x: -479001600 / result: -479001600.0

[3]libmpf._normalize1 / x: (1, 490360434560889599679, -97, 69, 63, 'n') / result: (1, 7661881790013899995, -91, 63)

[3]libmpf._normalize1 / x: (0, 561391291128314004327, -99, 69, 63, 'n') / result: (0, 4385869461939953159, -92, 62)

[3]libmpf._normalize1 / x: (0, 1463506364150388073337715493, -91, 91, 63, 'n') / result: (0, 5451986060106709873, -63, 63)

[3]libmpf._normalize1 / x: (0, 3336651753268290447840255495, -92, 92, 63, 'n') / result: (0, 6214998202898149281, -63, 63)

[1]ctx_mp_python.convert / x: -11 / result: -11.0

[2]libmpf._normalize1 / x: (1, 11, 0, 4, 63, 'n') / result: (1, 11, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 396025830561329180491, 11, 69, 63, 'n') / result: (0, 6187903602520768445, 17, 63)

[3]libmpf._normalize1 / x: (1, 306442039059381828309, 11, 69, 63, 'n') / result: (1, 4788156860302841067, 17, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1507941767780244370289305733044058097, -199, 121, 63, 'n') / result: (1, 2615861984974356767, -140, 62)

[3]libmpf._normalize1 / x: (0, 1360904361938183461672790531316772581, -197, 121, 63, 'n') / result: (0, 4721585490426808771, -139, 63)

[1]ctx_mp_python.convert / x: -12 / result: -12.0

[2]libmpf._normalize1 / x: (1, 3, 2, 2, 63, 'n') / result: (1, 3, 2, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 138267632315133332010, 19, 67, 63, 'n') / result: (1, 8641727019695833251, 23, 63)

[2]libmpf._normalize. / x: (1, 140333119482110687924, 19, 67, 63, 'n') / result: (1, 8770819967631917995, 23, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 567695724340797880525886500807188573, -204, 119, 63, 'n') / result: (1, 7878360801805121557, -148, 63)

[3]libmpf._normalize1 / x: (0, 1024680931341691077021665570420696649, -203, 120, 63, 'n') / result: (0, 7110152267936841443, -146, 63)

[2]libmpf._normalize. / x: (1, 72492060411236624376004608, 0, 86, 63, 'n') / result: (1, 8641727019695833251, 23, 63)

[2]libmpf._normalize. / x: (1, 73574970547036848348200960, 0, 86, 63, 'n') / result: (1, 8770819967631917995, 23, 63)

[3]libmpf._normalize1 / x: (0, 317530105349967112294884649033631358947, -125, 128, 63, 'n') / result: (0, 4303335375624817967, -59, 62)

[3]libmpf._normalize1 / x: (1, 176676295639244674048021242029786166557, -125, 128, 63, 'n') / result: (1, 149650643405281507, -55, 58)

[3]libmpf._normalize1 / x: (0, 11554107033330215899058492755, -93, 94, 63, 'n') / result: (0, 5380300354831952555, -62, 63)

[8]gammazeta.mpf_bernoulli / n: 14 / prec: 63 / result: (0, 5380300354831952555, -62, 63)

[3]libmpf._normalize1 / x: (0, 23153236848435101939808612347055555685, -121, 125, 63, 'n') / result: (0, 5020557938228954295, -59, 63)

[3]libmpf._normalize1 / x: (1, 805165409814266092720171328242900385, -117, 120, 63, 'n') / result: (1, 2793478676898588131, -59, 62)

[1]ctx_mp_python.convert / x: -87178291200 / result: -87178291200.0

[3]libmpf._normalize1 / x: (1, 506562976174126798711, -102, 69, 63, 'n') / result: (1, 3957523251360365615, -95, 62)

[3]libmpf._normalize1 / x: (0, 563711400150832670267, -103, 69, 63, 'n') / result: (0, 8807990627356760473, -97, 63)

[3]libmpf._normalize1 / x: (0, 23416101822448685923334947793, -95, 95, 63, 'n') / result: (0, 5451986059185277187, -63, 63)

[3]libmpf._normalize1 / x: (0, 106772856113393284950640417177, -97, 97, 63, 'n') / result: (0, 6214998203410841813, -63, 63)

[1]ctx_mp_python.convert / x: -13 / result: -13.0

[2]libmpf._normalize1 / x: (1, 13, 0, 4, 63, 'n') / result: (1, 13, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 764739545507145967237, 23, 70, 63, 'n') / result: (1, 5974527699274577869, 30, 63)

[3]libmpf._normalize1 / x: (0, 978193361548798259035, 23, 70, 63, 'n') / result: (0, 7642135637099986399, 30, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1709765946249932440154209418553419583, -212, 121, 63, 'n') / result: (1, 2965971125385457527, -153, 62)

[3]libmpf._normalize1 / x: (0, 1543048931902781857077782540033877417, -210, 121, 63, 'n') / result: (0, 2676763206752693249, -151, 62)

[1]ctx_mp_python.convert / x: -14 / result: -14.0

[2]libmpf._normalize1 / x: (1, 7, 1, 3, 63, 'n') / result: (1, 7, 1, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 423928475749921365033, 31, 69, 63, 'n') / result: (0, 6623882433592521329, 37, 63)

[3]libmpf._normalize1 / x: (0, 245231435504028988657, 31, 68, 63, 'n') / result: (0, 957935294937613237, 39, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 643676591529386330336954192432903013, -217, 119, 63, 'n') / result: (1, 4466403577051041923, -160, 62)

[3]libmpf._normalize1 / x: (0, 580912539069282581460021359734441731, -215, 119, 63, 'n') / result: (0, 8061780952102229079, -159, 63)

[2]libmpf._normalize. / x: (0, 910379469594520668743598604288, 0, 100, 63, 'n') / result: (0, 6623882433592521329, 37, 63)

[2]libmpf._normalize. / x: (0, 526630497720468891291097235456, 0, 99, 63, 'n') / result: (0, 957935294937613237, 39, 60)

[3]libmpf._normalize1 / x: (1, 91366248307959048044092693421464425451, -123, 127, 63, 'n') / result: (1, 1238243561341740543, -57, 61)

[3]libmpf._normalize1 / x: (0, 44843237976315145554091293937458056489, -122, 126, 63, 'n') / result: (0, 607739200440066953, -56, 60)

[3]libmpf._normalize1 / x: (1, 17559329890569491977686793399, -91, 94, 63, 'n') / result: (1, 8176700161103853945, -60, 63)

[8]gammazeta.mpf_bernoulli / n: 16 / prec: 63 / result: (1, 8176700161103853945, -60, 63)

[3]libmpf._normalize1 / x: (0, 10124746327508819752684516671556992135, -117, 123, 63, 'n') / result: (0, 137215899551871187, -51, 57)

[3]libmpf._normalize1 / x: (1, 4969301218147422838942726122133179585, -116, 122, 63, 'n') / result: (1, 4310181741160239547, -56, 62)

[1]ctx_mp_python.convert / x: -20922789888000 / result: -20922789888000.0

[3]libmpf._normalize1 / x: (1, 945136632197281834075, -108, 70, 63, 'n') / result: (1, 7383879939041264329, -101, 63)

[3]libmpf._normalize1 / x: (0, 927760255075805809549, -108, 70, 63, 'n') / result: (0, 7248126992779732887, -101, 63)

[3]libmpf._normalize1 / x: (0, 1498630516629332019123990822199, -101, 101, 63, 'n') / result: (0, 1362996514789603697, -61, 61)

[3]libmpf._normalize1 / x: (0, 1708365697821540686267297982359, -101, 101, 63, 'n') / result: (0, 6214998203437210345, -63, 63)

[1]ctx_mp_python.convert / x: -15 / result: -15.0

[2]libmpf._normalize1 / x: (1, 15, 0, 4, 63, 'n') / result: (1, 15, 0, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 283815881471157474865, 37, 68, 63, 'n') / result: (0, 4434623147986835545, 43, 62)

[2]libmpf._normalize. / x: (1, 179966090263877231780, 39, 68, 63, 'n') / result: (1, 5623940320746163493, 44, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 969301220185428826857801366034086537, -224, 120, 63, 'n') / result: (1, 3362939163897255095, -166, 62)

[3]libmpf._normalize1 / x: (0, 1749571882373368715852610271236522501, -223, 121, 63, 'n') / result: (0, 3035023417262015653, -164, 62)

[1]ctx_mp_python.convert / x: -16 / result: -16.0

[2]libmpf._normalize1 / x: (1, 1, 4, 1, 63, 'n') / result: (1, 1, 4, 1)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 149467754314627758415, 46, 68, 63, 'n') / result: (1, 2335433661166058725, 52, 62)

[3]libmpf._normalize1 / x: (1, 65874056133701580681, 45, 66, 63, 'n') / result: (1, 8234257016712697585, 48, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 729826801080793469641768811549696805, -230, 120, 63, 'n') / result: (1, 2532095370463815601, -172, 62)

[3]libmpf._normalize1 / x: (0, 658662355717032928262259491220487407, -228, 119, 63, 'n') / result: (0, 9140776409636188319, -172, 63)

[2]libmpf._normalize. / x: (1, 10517858166175975288697475668377600, 0, 114, 63, 'n') / result: (1, 2335433661166058725, 52, 62)

[2]libmpf._normalize. / x: (1, 2317737302008762306102111774965760, 0, 111, 63, 'n') / result: (1, 8234257016712697585, 48, 63)

[3]libmpf._normalize1 / x: (0, 169884154472671669599315184460951209215, -124, 127, 63, 'n') / result: (0, 4604719233753341227, -59, 62)

[3]libmpf._normalize1 / x: (1, 320712906588884343198166155757090508815, -124, 128, 63, 'n') / result: (1, 4346470375847613177, -58, 62)

[3]libmpf._normalize1 / x: (0, 17012755546156571591165376669, -88, 94, 63, 'n') / result: (0, 1980545412068787449, -55, 61)

[8]gammazeta.mpf_bernoulli / n: 18 / prec: 63 / result: (0, 1980545412068787449, -55, 61)

[3]libmpf._normalize1 / x: (0, 9119855552275082396256427562231859923, -114, 123, 63, 'n') / result: (0, 7910213762024507347, -54, 63)

[3]libmpf._normalize1 / x: (1, 8608381961577888498166722447184615473, -113, 123, 63, 'n') / result: (1, 7466581139462219895, -53, 63)

[1]ctx_mp_python.convert / x: -6402373705728000 / result: -6402373705728000.0

[3]libmpf._normalize1 / x: (1, 712224556972973779371, -113, 70, 63, 'n') / result: (1, 5564254351351357651, -106, 63)

[3]libmpf._normalize1 / x: (0, 672280497612646628033, -112, 70, 63, 'n') / result: (0, 2626095693799400891, -104, 62)

[3]libmpf._normalize1 / x: (0, 47956176532133060355262008254253, -106, 106, 63, 'n') / result: (0, 2725993029578891103, -62, 62)

[3]libmpf._normalize1 / x: (0, 13666925582574951584972712486331, -104, 104, 63, 'n') / result: (0, 6214998203438404555, -63, 63)

[1]ctx_mp_python.convert / x: -17 / result: -17.0

[2]libmpf._normalize1 / x: (1, 17, 0, 5, 63, 'n') / result: (1, 17, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 47046936458525446325, 50, 66, 63, 'n') / result: (1, 5880867057315680791, 53, 63)

[3]libmpf._normalize1 / x: (0, 3876676227149809818945, 48, 72, 63, 'n') / result: (0, 7571633256151972303, 57, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 549516650225538612448921253314726419, -236, 119, 63, 'n') / result: (1, 476629716793188819, -176, 59)

[3]libmpf._normalize1 / x: (0, 1983736036041887407336898144366948061, -236, 121, 63, 'n') / result: (0, 6882466943726071205, -178, 63)

[1]ctx_mp_python.convert / x: -18 / result: -18.0

[2]libmpf._normalize1 / x: (1, 9, 1, 4, 63, 'n') / result: (1, 9, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 6110234408437418969519, 54, 73, 63, 'n') / result: (0, 2983512894744833481, 65, 62)

[3]libmpf._normalize1 / x: (1, 398135918010049986041, 55, 69, 63, 'n') / result: (1, 777609214863378879, 64, 60)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 103438428277748444693714347464957561, -240, 117, 63, 'n') / result: (1, 5741986235249710007, -186, 63)

[3]libmpf._normalize1 / x: (0, 1493636544784479930253113716542502895, -242, 121, 63, 'n') / result: (0, 647761594703630231, -181, 60)

[2]libmpf._normalize. / x: (0, 110072197619940572517663485234188910592, 0, 127, 63, 'n') / result: (0, 2983512894744833481, 65, 62)

[2]libmpf._normalize. / x: (1, 14344358175942971715969435869814718464, 0, 124, 63, 'n') / result: (1, 777609214863378879, 64, 60)

[3]libmpf._normalize1 / x: (1, 9072003813096608369196120025613687583, -121, 123, 63, 'n') / result: (1, 7868708994364898333, -61, 63)

[3]libmpf._normalize1 / x: (0, 128151745921349331010521062675642845257, -122, 127, 63, 'n') / result: (0, 217097502087089573, -53, 58)

[3]libmpf._normalize1 / x: (1, 10234751335211152233920974423, -84, 94, 63, 'n') / result: (1, 2382963741014514173, -52, 62)

[8]gammazeta.mpf_bernoulli / n: 20 / prec: 63 / result: (1, 2382963741014514173, -52, 62)

[3]libmpf._normalize1 / x: (0, 18750848222166333854321211912532573609, -113, 124, 63, 'n') / result: (0, 8131884151367479065, -52, 63)

[3]libmpf._normalize1 / x: (1, 517335475738357267381332472129018129, -105, 119, 63, 'n') / result: (1, 1794867989437916545, -47, 61)

[1]ctx_mp_python.convert / x: -2432902008176640000 / result: -2.43290200817664e+18

[3]libmpf._normalize1 / x: (1, 986520856315159771609, -120, 70, 63, 'n') / result: (1, 1926798547490546429, -111, 61)

[3]libmpf._normalize1 / x: (0, 870978815218463854029, -117, 70, 63, 'n') / result: (0, 1701130498473562215, -108, 61)

[3]libmpf._normalize1 / x: (0, 1534597649028256004705362436840707, -111, 111, 63, 'n') / result: (0, 5451986059157775361, -63, 63)

[3]libmpf._normalize1 / x: (0, 218670809321200926487953286991975, -108, 108, 63, 'n') / result: (0, 776874775429806613, -60, 60)

[1]ctx_mp_python.convert / x: -19 / result: -19.0

[2]libmpf._normalize1 / x: (1, 19, 0, 5, 63, 'n') / result: (1, 19, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 95567205743320780089, 65, 67, 63, 'n') / result: (1, 1493237589739387189, 71, 61)

[3]libmpf._normalize1 / x: (1, 581928003866562497499, 64, 69, 63, 'n') / result: (1, 9092625060415039023, 70, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1246128830075463615919120472644100133, -250, 120, 63, 'n') / result: (1, 8646755742493680951, -193, 63)

[3]libmpf._normalize1 / x: (0, 140577557156186346363997731056104389, -245, 117, 63, 'n') / result: (0, 7803622035017851253, -191, 63)

[1]ctx_mp_python.convert / x: -20 / result: -20.0

[2]libmpf._normalize1 / x: (1, 5, 2, 3, 63, 'n') / result: (1, 5, 2, 3)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 212383250612982103685, 72, 68, 63, 'n') / result: (1, 1659244145413922685, 79, 61)

[3]libmpf._normalize1 / x: (0, 120125004789044554565, 72, 67, 63, 'n') / result: (0, 1876953199828821165, 78, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1876523414701874621463637280812668069, -257, 121, 63, 'n') / result: (1, 6510498441407006833, -199, 63)

[3]libmpf._normalize1 / x: (0, 1693546100328644925509057369169363807, -255, 121, 63, 'n') / result: (0, 5875668355778146825, -197, 63)

[2]libmpf._normalize. / x: (1, 1002951544217650717849058798306617228001280, 0, 140, 63, 'n') / result: (1, 1659244145413922685, 79, 61)

[2]libmpf._normalize. / x: (0, 567274296370339620718765932969996331253760, 0, 139, 63, 'n') / result: (0, 1876953199828821165, 78, 61)

[3]libmpf._normalize1 / x: (1, 11254202620390437573344496384946395645, -120, 124, 63, 'n') / result: (1, 4880732372247747671, -59, 63)

[3]libmpf._normalize1 / x: (1, 90213247439829350121750371794515821445, -121, 127, 63, 'n') / result: (1, 4890469943061767617, -57, 63)

[3]libmpf._normalize1 / x: (0, 7485817600698229130186221535, -80, 93, 63, 'n') / result: (0, 871463865123017357, -47, 60)

[8]gammazeta.mpf_bernoulli / n: 22 / prec: 63 / result: (0, 871463865123017357, -47, 60)

[3]libmpf._normalize1 / x: (1, 4253381897750055719572666482689325547, -106, 122, 63, 'n') / result: (1, 922305178790225619, -44, 60)

[3]libmpf._normalize1 / x: (1, 4261867838848550628126058844991528269, -104, 122, 63, 'n') / result: (1, 7393162191561120485, -45, 63)

[1]ctx_mp_python.convert / x: -1124000727777607680000 / result: -1.12400072777760768e+21

[3]libmpf._normalize1 / x: (0, 495995472533360216029, -123, 69, 63, 'n') / result: (0, 7749929258333753375, -117, 63)

[3]libmpf._normalize1 / x: (0, 496985035301581124023, -121, 69, 63, 'n') / result: (0, 7765391176587205063, -115, 63)

[3]libmpf._normalize1 / x: (0, 98214249537808392057621696282349599, -117, 117, 63, 'n') / result: (0, 5451986059157775791, -63, 63)

[3]libmpf._normalize1 / x: (0, 27989863593113726355683776442325447, -115, 115, 63, 'n') / result: (0, 1553749550859613657, -61, 61)

[1]ctx_mp_python.convert / x: -21 / result: -21.0

[2]libmpf._normalize1 / x: (1, 21, 0, 5, 63, 'n') / result: (1, 21, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 128691787045133434635, 79, 67, 63, 'n') / result: (0, 8043236690320839665, 83, 63)

[3]libmpf._normalize1 / x: (0, 292432811886379292535, 78, 68, 63, 'n') / result: (0, 2284631342862338223, 85, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1412911747540235008951395004466719827, -263, 121, 63, 'n') / result: (1, 612752794485365349, -202, 60)

[3]libmpf._normalize1 / x: (0, 1275140593188626767271050551604539675, -261, 120, 63, 'n') / result: (0, 1106008161087651167, -201, 60)

[1]ctx_mp_python.convert / x: -22 / result: -22.0

[2]libmpf._normalize1 / x: (1, 11, 1, 4, 63, 'n') / result: (1, 11, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 368450664978938408285, 84, 69, 63, 'n') / result: (0, 5757041640295912629, 90, 63)

[3]libmpf._normalize1 / x: (1, 251342806800992432531, 85, 68, 63, 'n') / result: (1, 7854462712531013517, 90, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 132979929180257412609743300638211631, -266, 117, 63, 'n') / result: (1, 3690934479723612455, -211, 62)

[3]libmpf._normalize1 / x: (0, 240026464600212097355902426271782173, -265, 118, 63, 'n') / result: (0, 1665518171990815875, -208, 61)

[2]libmpf._normalize. / x: (0, 7126872354355492177398205115510829918921424896, 0, 153, 63, 'n') / result: (0, 5757041640295912629, 90, 63)

[2]libmpf._normalize. / x: (1, 9723353878916197390031528725320546262406135808, 0, 153, 63, 'n') / result: (1, 7854462712531013517, 90, 63)

[3]libmpf._normalize1 / x: (0, 83405139540184663350231868680929264805, -121, 126, 63, 'n') / result: (0, 9042803348592485835, -58, 63)

[3]libmpf._normalize1 / x: (0, 105697966995949422599783770513084037235, -121, 127, 63, 'n') / result: (0, 5729898272215475541, -57, 63)

[3]libmpf._normalize1 / x: (1, 6541818966109015457452048587, -76, 93, 63, 'n') / result: (1, 6092543682185016067, -46, 63)

[8]gammazeta.mpf_bernoulli / n: 24 / prec: 63 / result: (1, 6092543682185016067, -46, 63)

[3]libmpf._normalize1 / x: (1, 55093674410708657076914756184944910945, -104, 126, 63, 'n') / result: (1, 5973268148629936927, -41, 63)

[3]libmpf._normalize1 / x: (1, 34909655517949234892580484623130517247, -103, 125, 63, 'n') / result: (1, 473114054416014225, -37, 59)

[1]ctx_mp_python.convert / x: -620448401733239439360000 / result: -6.20448401733239439e+23

[3]libmpf._normalize1 / x: (0, 744879407570414493171, -127, 70, 63, 'n') / result: (0, 1454842592910965807, -118, 61)

[3]libmpf._normalize1 / x: (0, 943973470596578445333, -127, 70, 63, 'n') / result: (0, 460924546189735569, -116, 59)

[3]libmpf._normalize1 / x: (0, 196428499075616785562610186962664495, -118, 118, 63, 'n') / result: (0, 5451986059157775831, -63, 63)

[3]libmpf._normalize1 / x: (0, 55979727186227453169921261073446545, -116, 116, 63, 'n') / result: (0, 6214998203438454679, -63, 63)

[1]ctx_mp_python.convert / x: -23 / result: -23.0

[2]libmpf._normalize1 / x: (1, 23, 0, 5, 63, 'n') / result: (1, 23, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 917858228979907342167, 90, 70, 63, 'n') / result: (1, 7170767413905526111, 97, 63)

[3]libmpf._normalize1 / x: (1, 395051521641377952009, 90, 69, 63, 'n') / result: (1, 1543170006411632625, 98, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 801008514591668179451380037483286645, -275, 120, 63, 'n') / result: (1, 694764137359738815, -215, 60)

[3]libmpf._normalize1 / x: (0, 361451617280319393662805765226751625, -272, 119, 63, 'n') / result: (0, 2508074423703816847, -215, 62)

[1]ctx_mp_python.convert / x: -24 / result: -24.0

[2]libmpf._normalize1 / x: (1, 3, 3, 2, 63, 'n') / result: (1, 3, 3, 2)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[2]libmpf._normalize. / x: (1, 17066947918574237292, 100, 64, 63, 'n') / result: (1, 4266736979643559323, 102, 62)

[3]libmpf._normalize1 / x: (0, 197787225424577744275, 99, 68, 63, 'n') / result: (0, 6180850794518054509, 104, 63)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 150778073334902245531023270672487485, -279, 117, 63, 'n') / result: (1, 2092466107812860431, -223, 61)

[3]libmpf._normalize1 / x: (0, 544303611904480969267694533605330093, -279, 119, 63, 'n') / result: (0, 3776865014518688899, -222, 62)

[2]libmpf._normalize. / x: (1, 21634926773044562356577777888326097202750834081792, 0, 164, 63, 'n') / result: (1, 4266736979643559323, 102, 62)

[2]libmpf._normalize. / x: (0, 125362547513471046187837335453797329803580637446144, 0, 167, 63, 'n') / result: (0, 6180850794518054509, 104, 63)

[3]libmpf._normalize1 / x: (1, 177825910485346295594573077020493716515, -121, 128, 63, 'n') / result: (1, 4819980961810632397, -56, 63)

[3]libmpf._normalize1 / x: (1, 41981331234523337504645458096622522135, -120, 125, 63, 'n') / result: (1, 9103250105660753273, -58, 63)

[3]libmpf._normalize1 / x: (0, 841476811077746064295810389, -69, 90, 63, 'n') / result: (0, 6269490801377192619, -42, 63)

[8]gammazeta.mpf_bernoulli / n: 26 / prec: 63 / result: (0, 6269490801377192619, -42, 63)

[3]libmpf._normalize1 / x: (1, 30218826302884953359499571412870677743, -98, 125, 63, 'n') / result: (1, 1638165856377498523, -34, 61)

[3]libmpf._normalize1 / x: (1, 57072742800076049420570347925555691987, -100, 126, 63, 'n') / result: (1, 773479896669361053, -34, 60)

[1]ctx_mp_python.convert / x: -403291461126605635584000000 / result: -4.03291461126605636e+26

[3]libmpf._normalize1 / x: (0, 643647997563978837733, -131, 70, 63, 'n') / result: (0, 2514249990484292335, -123, 62)

[3]libmpf._normalize1 / x: (0, 607812432067322197301, -132, 70, 63, 'n') / result: (0, 2374267312762977333, -124, 62)

[3]libmpf._normalize1 / x: (0, 6285711970419737140079673184412529391, -123, 123, 63, 'n') / result: (0, 5451986059157775833, -63, 63)

[3]libmpf._normalize1 / x: (0, 14330810159674228013475419792891378741, -124, 124, 63, 'n') / result: (0, 776874775429806835, -60, 60)

[1]ctx_mp_python.convert / x: -25 / result: -25.0

[2]libmpf._normalize1 / x: (1, 25, 0, 5, 63, 'n') / result: (1, 25, 0, 5)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (0, 2579008742298310786675, 102, 72, 63, 'n') / result: (0, 5037126449801388255, 111, 63)

[2]libmpf._normalize. / x: (1, 47852845371862379650, 104, 66, 63, 'n') / result: (1, 373850354467674841, 111, 59)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 454108079690999704174786525877478189, -287, 119, 63, 'n') / result: (1, 6302015571765791415, -231, 63)

[3]libmpf._normalize1 / x: (0, 819657203809100753718210350387859081, -286, 120, 63, 'n') / result: (0, 5687514374804613871, -229, 63)

[1]ctx_mp_python.convert / x: -26 / result: -26.0

[2]libmpf._normalize1 / x: (1, 13, 1, 4, 63, 'n') / result: (1, 13, 1, 4)

[2]libmpf._normalize1 / x: (1, 25, 2, 5, 63, 'n') / result: (1, 25, 2, 5)

[3]libmpf._normalize1 / x: (1, 84175161570801789365, 112, 67, 63, 'n') / result: (1, 5260947598175111835, 116, 63)

[3]libmpf._normalize1 / x: (1, 246996267881989639817, 112, 68, 63, 'n') / result: (1, 1929658342828044061, 119, 61)

[1]ctx_mp_python.convert / x: 0 / result: 0.0

[3]libmpf._normalize1 / x: (1, 1367666687069363814770671752885486885, -295, 121, 63, 'n') / result: (1, 4745047018741301771, -237, 63)

[3]libmpf._normalize1 / x: (0, 1234307318677234076092954890171993549, -293, 120, 63, 'n') / result: (0, 4282363764558768091, -235, 62)

[2]libmpf._normalize. / x: (1, 437062426990735677478789120166383277283198450070978560, 0, 179, 63, 'n') / result: (1, 5260947598175111835, 116, 63)

[2]libmpf._normalize. / x: (1, 1282477945793481549770837839685546015133930656595181568, 0, 180, 63, 'n') / result: (1, 1929658342828044061, 119, 61)

[3]libmpf._normalize1 / x: (0, 289395410606245800132582435208732001417, -121, 128, 63, 'n') / result: (0, 980509790270707151, -53, 60)

[3]libmpf._normalize1 / x: (1, 4216652228016598484366860645983792923, -119, 122, 63, 'n') / result: (1, 7314725609970301891, -60, 63)

[3]libmpf._normalize1 / x: (1, 16114031429535694696800219683, -69, 94, 63, 'n') / result: (1, 7503680619194961477, -38, 63)

[8]gammazeta.mpf_bernoulli / n: 28 / prec: 63 / result: (1, 7503680619194961477, -38, 63)

[3]libmpf._normalize1 / x: (1, 7357432310185221649307543764993422027, -91, 123, 63, 'n') / result: (1, 6381555275694288835, -31, 63)

[3]libmpf._normalize1 / x: (0, 54887364794263197173845286511805253007, -98, 126, 63, 'n') / result: (0, 5950900015194455049, -35, 63)

[1]ctx_mp_python.convert / x: -304888344611713860501504000000 / result: -3.04888344611713861e+29

[3]libmpf._normalize1 / x: (0, 424526946659157326669, -135, 69, 63, 'n') / result: (0, 6633233541549333229, -129, 63)

[3]libmpf._normalize1 / x: (1, 395878011579172799677, -139, 69, 63, 'n') / result: (1, 6185593930924574995, -133, 63)

[3]libmpf._normalize1 / x: (0, 402285566106863176958394270542632917741, -129, 129, 63, 'n') / result: (0, 5451986059157775833, -63, 63)

[3]libmpf._normalize1 / x: (0, 7337374801753204742858196096612228249325, -133, 133, 63, 'n') / result: (0, 776874775429806835, -60, 60)

[2]libmpf._normalize. / x: (0, 5451986059157775833, -63, 63, 63, 'n') / result: (0, 5451986059157775833, -63, 63)

[2]libmpf._normalize. / x: (0, 776874775429806835, -60, 60, 63, 'n') / result: (0, 776874775429806835, -60, 60)

[3]libmpf._normalize1 / x: (0, 60110656403800409857, -63, 66, 63, 'n') / result: (0, 234807251577345351, -55, 58)

[2]libmpf._normalize1 / x: (0, 3344181185734363513, -64, 62, 63, 'n') / result: (0, 3344181185734363513, -64, 62)

[3]libmpf._normalize1 / x: (0, 60110656403800409857, -63, 66, 63, 'n') / result: (0, 234807251577345351, -55, 58)

[2]libmpf._normalize1 / x: (0, 3344181185734363513, -64, 62, 63, 'n') / result: (0, 3344181185734363513, -64, 62)

[3]libmpf._normalize1 / x: (0, 234807251577345351, -55, 58, 53, 'n') / result: (0, 3668863305896021, -49, 52)

[3]libmpf._normalize1 / x: (0, 3344181185734363513, -64, 62, 53, 'n') / result: (0, 6531603878387429, -55, 53)

zeta_ / result: (6.51721042625301 + 0.181288425337917j) / count: 15112
zeta / count: 0 / s: Complex { re: 0.0, im: 100.0 }
gamma_ / s: (1.0, -100.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1-100j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1-100j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-100.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7036874417766400, exp=-46, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7036874417766400, exp=-46, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7036874417766400, -46, 53, 53, 'd') / result: (1, 25, 2, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7036874417766400, -46, 53, 53, 'd') / result: (1, 25, 2, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (1, 25, 2, 5)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='-100.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (1, 25, 2, 5)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 25, 2, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 25, 2, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 2, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 2, 5), prec=62 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=62, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1000000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1000000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1-100j) / result: (1.0 - 100.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1-100j) / result: (1.0 - 100.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, 0, 1), (1, 25, 2, 5)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, 0, 1), (1, 25, 2, 5)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, 0, 1), (1, 25, 2, 5)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 0, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 25, 2, 5), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=700 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 25, 2, 5), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=9671406556917033397649408, y=-967140655691703339764940800, prec=83 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=83, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, 0, 1), (1, 25, 2, 5)), prec=83, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, 0, 1), b=(1, 25, 2, 5), prec=83, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 25, 2, 5), t=(1, 25, 2, 5), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 625, 4, 10), prec=103, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10001 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=10001, exp=0, bc=14, prec=103, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 10001, 0, 14, 103, 'd') / result: (0, 10001, 0, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 10001, 0, 14, 103, 'd') / result: (0, 10001, 0, 14)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 10001, 0, 14), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=10000, exp=0, bc=14, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 10000, 0, 14, 10, 'd') / result: (0, 625, 4, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 10000, 0, 14, 10, 'd') / result: (0, 625, 4, 10)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 10001, 0, 14), prec=83, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=10001, n=89 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=6190319166446544064633070682112, prec=103 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=103, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=93404962076512752336629319154612, exp=-103, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=93404962076512752336629319154612 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=93404962076512752336629319154612, exp=-103, bc=107, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 93404962076512752336629319154612, -103, 107, 83, 'd') / result: (0, 5567369584829375287093479, -79, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 93404962076512752336629319154612, -103, 107, 83, 'd') / result: (0, 5567369584829375287093479, -79, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 5567369584829375287093479, -79, 83), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, 0, 1), (1, 25, 2, 5)), prec=83, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 25, 2, 5), x=(0, 1, 0, 1), prec=83, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 25, 2, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 25, 2, 5), x=(0, 1, 0, 1), prec=83, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 25, 2, 5), t=(0, 1, 0, 1), prec=87, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=2, bc=5, prec=87, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 2, 5, 87, 'd') / result: (0, 25, 2, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 2, 5, 87, 'd') / result: (0, 25, 2, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 25, 2, 5), prec=87, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 25, 2, 5), prec=124, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1742245718635204932932477990050653242655 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1742245718635204932932477990050653242655, exp=-137, bc=131, prec=124, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 1742245718635204932932477990050653242655, -137, 131, 124, 'd') / result: (0, 6805647338418769269267492148635364229, -129, 123)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1742245718635204932932477990050653242655, -137, 131, 124, 'd') / result: (0, 6805647338418769269267492148635364229, -129, 123)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 6805647338418769269267492148635364229, -129, 123), prec=124 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=212676479325586539664609129644855132, prec=124 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=1, prec=124 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=123 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=124, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=33194473861495279271841862308866813574, exp=-124, prec=87, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=33194473861495279271841862308866813574 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=33194473861495279271841862308866813574, exp=-124, bc=125, prec=87, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 33194473861495279271841862308866813574, -124, 125, 87, 'd') / result: (0, 120760792420679642498150723, -86, 87)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 33194473861495279271841862308866813574, -124, 125, 87, 'd') / result: (0, 120760792420679642498150723, -86, 87)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 120760792420679642498150723, -86, 87), prec=83, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=120760792420679642498150723, exp=-86, bc=87, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 120760792420679642498150723, -86, 87, 83, 'd') / result: (0, 1886887381573119414033605, -80, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 120760792420679642498150723, -86, 87, 83, 'd') / result: (0, 1886887381573119414033605, -80, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1886887381573119414033605, -80, 81), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5567369584829375287093479, -80, 83), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 1886887381573119414033605, -80, 81), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1488024324732854008816592638, exp=-83, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1488024324732854008816592638 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-3494294502971645559741682874, exp=-83, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3494294502971645559741682874 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 744012162366427004408296319, -82, 90), (1, 1747147251485822779870841437, -82, 91)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 744012162366427004408296319, -82, 90), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=79, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=48557806596727482314, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2410243784782432826032, exp=-293, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2410243784782432826032 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2410243784782432826032, exp=-293, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2410243784782432826032, -293, 72, 57, 'n') / result: (0, 18388700750598395, -276, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2410243784782432826032, -293, 72, 57, 'n') / result: (0, 18388700750598395, -276, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 1747147251485822779870841437, -82, 91), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=1747147251485822779870841437, exp=-82, mag=9, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=95, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=2851635619425046667661078, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-154716230308287093473242295, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=154716230308287093473242295 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=154716230308287093473242295, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 154716230308287093473242295, -87, 87, 57, 'n') / result: (1, 144090717945515265, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 154716230308287093473242295, -87, 87, 57, 'n') / result: (1, 144090717945515265, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2851474219167972265980979, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2851474219167972265980979 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2851474219167972265980979, exp=-87, bc=82, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2851474219167972265980979, -87, 82, 57, 'n') / result: (0, 42490276979922835, -61, 56)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2851474219167972265980979, -87, 82, 57, 'n') / result: (0, 42490276979922835, -61, 56)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 18388700750598395, -276, 55), t=(1, 144090717945515265, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=2649641093238958177806955356999675, exp=-333, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 2649641093238958177806955356999675, -333, 112, 53, 'n') / result: (1, 4596394607354473, -274, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 2649641093238958177806955356999675, -333, 112, 53, 'n') / result: (1, 4596394607354473, -274, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 18388700750598395, -276, 55), t=(0, 42490276979922835, -61, 56), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=781340988193840740200027174849825, exp=-337, bc=110, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 781340988193840740200027174849825, -337, 110, 53, 'n') / result: (0, 5421642219851091, -280, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 781340988193840740200027174849825, -337, 110, 53, 'n') / result: (0, 5421642219851091, -280, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 4596394607354473, -274, 53), (0, 5421642219851091, -280, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.51425318049776e-67 + 2.79082155561748e-69j) / count: 134
gamma__ / s: Complex { re: 1.0, im: -100.0 } / result: Complex { re: -1.514253180497756e-67, im: 2.7908215556174775e-69 }
zeta__ / s: Complex { re: 0.0, im: 100.0 } / result: Complex { re: 6.51721042625301, im: 0.18128842533791736 } / z: Complex { re: 0.0, im: 0.0 }

test_critical_strip¶

In [ ]:
inl test_critical_strip log = run_test log (3u8, 2u8) fun zeta, gamma =>
    ;[
        .^(0.5, 14.134725)
        .^(0.75, 20.5)
        .^(1.25, 30.1)
        .^(0.25, 40.0)
        .^(1.0, 50.0)
    ]
    |> fun x => a x : _ i32 _
    |> am.iter fun s =>
        inl result = zeta s
        result |> re |> _assert_ne 0
        result |> im |> _assert_ne 0
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_critical_strip true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (0.5, 14.134725) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5+14.134725j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5+14.134725j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5+14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7957142780373054, -49, 53, 53, 'd') / result: (0, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7957142780373054, -49, 53, 53, 'd') / result: (0, 3978571390186527, -48, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+14.134725j) / result: (0.5 + 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+14.134725j) / result: (0.5 + 14.134725j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 3978571390186527, -48, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 15829030306810754071359852321729, -96, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15848837347439320155758238309313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15848837347439320155758238309313, exp=-96, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6401, -5, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13109248 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13109248 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13109248 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3620, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3620, exp=-8, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 905, -6, 10), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 905, -6, 10), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 3978571390186527, -48, 52), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 3978571390186527, -48, 52), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3978571390186527, exp=-48, bc=52, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 3978571390186527, -48, 52, 73, 'd') / result: (1, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 3978571390186527, -48, 52, 73, 'd') / result: (1, 3978571390186527, -48, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 3978571390186527, -48, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3978571390186527, -48, 52), t=(1, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 15829030306810754071359852321729, -96, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15848837347439320155758238309313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15848837347439320155758238309313, exp=-96, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6401, -5, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13109248 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13109248 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13109248 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3620, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3620, exp=-8, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=45 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 45 / result: [1, 4051, 2736451, 739027171, 106764890851, 9573696452323, 583327124420323, 25664548404164323, 851672769217066723, 22025556704041924323, 455310086907194799843, 7676718923626409391843, 107311229250534993327843, 1260619007250012201842403, 12586223430355989445244643, 107825444073394299229992675, 799077851966414289603163875, 5158527083919185637090293475, 29183936184458903285463807715, 145449144946956939472898651875, 641514035666948560539287320291, 2514000556967729940871184152291, 8784653093416858284308234008291, 27457262868620929351431893579491, 76986029222708323529476210456291, 194156939340377930327821051524835, 441576659045864279524929313208035, 908060519119520582902845518673635, 1693207379711025218198662924236515, 2872115128040193097693048163563235, 4449320522415034644948813274707683, 6325953064637876253264768589395683, 8306842970317542395376054754899683, 10155673548951897461346588509370083, 11674993497680392932591908609619683, 12768400566371956133016076863960803, 13452849435662449529212739307992803, 13822314985986603313609160575448803, 13992398776170915511899723629098723, 14058212084260882469746421687154403, 14079205696461732689211444358837987, 14084578948605882850772802163996387, 14085639418334848803484854421583587, 14085790872561530124227861611312867, 14085804799386972084755954226460387, 14085805418356991727446091676022499]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 45 / result: [1, 4051, 2736451, 739027171, 106764890851, 9573696452323, 583327124420323, 25664548404164323, 851672769217066723, 22025556704041924323, 455310086907194799843, 7676718923626409391843, 107311229250534993327843, 1260619007250012201842403, 12586223430355989445244643, 107825444073394299229992675, 799077851966414289603163875, 5158527083919185637090293475, 29183936184458903285463807715, 145449144946956939472898651875, 641514035666948560539287320291, 2514000556967729940871184152291, 8784653093416858284308234008291, 27457262868620929351431893579491, 76986029222708323529476210456291, 194156939340377930327821051524835, 441576659045864279524929313208035, 908060519119520582902845518673635, 1693207379711025218198662924236515, 2872115128040193097693048163563235, 4449320522415034644948813274707683, 6325953064637876253264768589395683, 8306842970317542395376054754899683, 10155673548951897461346588509370083, 11674993497680392932591908609619683, 12768400566371956133016076863960803, 13452849435662449529212739307992803, 13822314985986603313609160575448803, 13992398776170915511899723629098723, 14058212084260882469746421687154403, 14079205696461732689211444358837987, 14084578948605882850772802163996387, 14085639418334848803484854421583587, 14085790872561530124227861611312867, 14085804799386972084755954226460387, 14085805418356991727446091676022499]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=86 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=86, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: pi_fixed / f_locals: prec=85, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=958288617897701126742203875414927711381592807340433735680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 0, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=0, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=0 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 1, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=108, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 689 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=123 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=123, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 224939120507729810846275465740351, -108, 108, 88, 'd') / result: (0, 214518661983232317777896371, -88, 88)

[2]libmpf._normalize. / x: (0, 356520070949948947528356728229971, -108, 109, 88, 'd') / result: (0, 85001008737075077898110563, -86, 87)

[2]libmpf._normalize. / x: (0, 449878241015459621692550931480702, -108, 109, 88, 'd') / result: (0, 214518661983232317777896371, -87, 88)

[2]libmpf._normalize. / x: (0, 522292463546151898066896762790005, -108, 109, 88, 'd') / result: (0, 124524227034128164784168425, -86, 87)

[2]libmpf._normalize. / x: (0, 581459191457678758374632193970322, -108, 109, 88, 'd') / result: (0, 8664417139555197333911541, -82, 83)

[2]libmpf._normalize. / x: (0, 631483947120683840791049765974625, -108, 109, 88, 'd') / result: (0, 301115010795919342418217547, -87, 88)

[2]libmpf._normalize. / x: (0, 674817361523189432538826397221053, -108, 110, 88, 'd') / result: (0, 80444498243712119166711139, -85, 87)

[2]libmpf._normalize. / x: (0, 713040141899897895056713456459942, -108, 110, 88, 'd') / result: (0, 85001008737075077898110563, -85, 87)

[2]libmpf._normalize. / x: (0, 747231584053881708913172228530356, -108, 110, 88, 'd') / result: (0, 89076946264968122114321259, -85, 87)

[2]libmpf._normalize. / x: (0, 778161505752905805354238767353817, -108, 110, 88, 'd') / result: (0, 92764080256570077580718847, -85, 87)

[2]libmpf._normalize. / x: (0, 806398311965408569220907659710673, -108, 110, 88, 'd') / result: (0, 192260339728691236787058749, -86, 88)

[2]libmpf._normalize. / x: (0, 832373655690528864538379510958074, -108, 110, 88, 'd') / result: (0, 198453344271309105047793271, -86, 88)

[2]libmpf._normalize. / x: (0, 856423067628413651637325231714976, -108, 110, 88, 'd') / result: (0, 102093585446883875326791433, -85, 87)

[2]libmpf._normalize. / x: (0, 878812534496100845595253491019976, -108, 110, 88, 'd') / result: (0, 52381308942800810670569747, -84, 86)

[2]libmpf._normalize. / x: (0, 899756482030919243385101862961404, -108, 110, 88, 'd') / result: (0, 214518661983232317777896371, -86, 88)

[2]libmpf._normalize. / x: (0, 919430296618877781423204854757461, -108, 110, 88, 'd') / result: (0, 219209264902800984721947873, -86, 88)

[2]libmpf._normalize. / x: (0, 937979262407627705902988922200293, -108, 110, 88, 'd') / result: (0, 223631682969958235240695219, -86, 88)

[2]libmpf._normalize. / x: (0, 955525078854587723508080664044832, -108, 110, 88, 'd') / result: (0, 28476866449552408561351319, -83, 85)

[2]libmpf._normalize. / x: (0, 972170704561611519759447694270707, -108, 110, 88, 'd') / result: (0, 231783558025744323673116611, -86, 88)

[2]libmpf._normalize. / x: (0, 988004018070632788319406494204596, -108, 110, 88, 'd') / result: (0, 235558514135034749107219337, -86, 88)

[2]libmpf._normalize. / x: (0, 1003100626260635616200514233094168, -108, 110, 88, 'd') / result: (0, 239157826008948234605911787, -86, 88)

[2]libmpf._normalize. / x: (0, 1017526047957690401622753083176439, -108, 110, 88, 'd') / result: (0, 242597114552900886922539015, -86, 88)

[2]libmpf._normalize. / x: (0, 1031337432473138380067183125451024, -108, 110, 88, 'd') / result: (0, 122945002612249658115766421, -85, 87)

[2]libmpf._normalize. / x: (0, 1044584927092303796133793525580010, -108, 110, 88, 'd') / result: (0, 124524227034128164784168425, -85, 87)

[2]libmpf._normalize. / x: (0, 1057312776198258675384654976698425, -108, 110, 88, 'd') / result: (0, 63020752441779296123066841, -84, 86)

[2]libmpf._normalize. / x: (0, 1069560212849846842585070184689914, -108, 110, 88, 'd') / result: (0, 255003026211225233694331689, -86, 88)

[2]libmpf._normalize. / x: (0, 1081362188136143462483600697455327, -108, 110, 88, 'd') / result: (0, 257816836389575830098056959, -86, 88)

[2]libmpf._normalize. / x: (0, 1092749972487262132322162826065000, -108, 110, 88, 'd') / result: (0, 260531895753684552269497591, -86, 88)

[2]libmpf._normalize. / x: (0, 1103751655003830656441528956760327, -108, 110, 88, 'd') / result: (0, 263154901267011322126753081, -86, 88)

[2]libmpf._normalize. / x: (0, 1114392560881063724586709659212406, -108, 110, 88, 'd') / result: (0, 265691890926614695688893713, -86, 88)

[2]libmpf._normalize. / x: (0, 1124695602538649054231377328701755, -108, 110, 88, 'd') / result: (0, 8379635233720012413199077, -81, 83)

[2]libmpf._normalize. / x: (0, 1134681576702854752882595495583788, -108, 110, 88, 'd') / result: (0, 270529169250215233059548257, -86, 88)

[2]libmpf._normalize. / x: (0, 1144369417126607592269480320497812, -108, 110, 88, 'd') / result: (0, 136419465199304532083210983, -85, 87)

[2]libmpf._normalize. / x: (0, 1153776410666835738857946528764630, -108, 110, 88, 'd') / result: (0, 137540866216043917996638599, -85, 87)

[2]libmpf._normalize. / x: (0, 1162918382915357516749264387940644, -108, 110, 88, 'd') / result: (0, 8664417139555197333911541, -81, 83)

[2]libmpf._normalize. / x: (0, 1171809858390608982398566213337114, -108, 110, 88, 'd') / result: (0, 34922655176836519908862299, -83, 85)

[2]libmpf._normalize. / x: (0, 1180464199362317534354356129785183, -108, 110, 88, 'd') / result: (0, 281444597092227347935284645, -86, 88)

[2]libmpf._normalize. / x: (0, 1188893726640477812066736239188045, -108, 110, 88, 'd') / result: (0, 283454353008384182945903835, -86, 88)

[2]libmpf._normalize. / x: (0, 1197109825069341330605723160011058, -108, 110, 88, 'd') / result: (0, 285413223521552403117590703, -86, 88)

[2]libmpf._normalize. / x: (0, 1205123035993216547930927173891029, -108, 110, 88, 'd') / result: (0, 143661860942031925670019051, -85, 87)

[2]libmpf._normalize. / x: (0, 1212943138578362599165681959944947, -108, 110, 88, 'd') / result: (0, 289188179630842828551693429, -86, 88)

[2]libmpf._normalize. / x: (0, 1220579221564782150033120128189249, -108, 110, 88, 'd') / result: (0, 291008763686366593845634491, -86, 88)

[2]libmpf._normalize. / x: (0, 1228039746768365427046789698834519, -108, 110, 88, 'd') / result: (0, 36598436438094539256298235, -83, 85)

[2]libmpf._normalize. / x: (0, 1235332605446049793123610219249947, -108, 110, 88, 'd') / result: (0, 294526244508278320580389551, -86, 88)

[2]libmpf._normalize. / x: (1, 153120441794174, -73, 48, 73, 'd') / result: (1, 76560220897087, -72, 47)

[2]libmpf._normalize. / x: (1, 2515609284194685, -73, 52, 73, 'd') / result: (1, 2515609284194685, -73, 52)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 26671181600861946303071036718460217276547, -131, 135, 83, 'd') / result: (1, 5922191981447154929945283, -79, 83)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (1, 151121746166493518974841525782529, -107, 107, 77, 'd') / result: (1, 70371546860082782327589, -76, 76)

[2]libmpf._normalize. / x: (0, 59078682726760234328303176772303, -107, 106, 77, 'd') / result: (0, 55021310901977340065225, -77, 76)

[3]libmpf._normalize1 / x: (1, 7519548517005631292626979655834296412779829963, -152, 153, 73, 'd') / result: (1, 6220024748418928932523, -72, 73)

[3]libmpf._normalize1 / x: (0, 5879299734867058439431761933794605628385657575, -153, 153, 73, 'd') / result: (0, 2431621378035093300407, -72, 72)

[3]libmpf._normalize1 / x: (0, 10942391231288574146219, -72, 74, 73, 'd') / result: (0, 5471195615644287073109, -71, 73)

[2]libmpf._normalize1 / x: (1, 2431621378035093300407, -72, 72, 73, 'd') / result: (1, 2431621378035093300407, -72, 72)

[3]libmpf._normalize1 / x: (0, 125648708384698363898211291208006903590069173, -144, 147, 63, 'd') / result: (0, 3247942986504735535, -59, 62)

[3]libmpf._normalize1 / x: (0, 4441505534611752507045341591641202863, -145, 122, 63, 'd') / result: (0, 963097989946490775, -83, 60)

[2]libmpf._normalize. / x: (1, 13949555956200469759062948925906440074, -144, 124, 63, 'd') / result: (1, 6049655549168262979, -83, 63)

[3]libmpf._normalize1 / x: (0, 683741302274438299, -85, 60, 53, 'n') / result: (0, 5341728924019049, -78, 53)

[3]libmpf._normalize1 / x: (1, 536861176988063609, -82, 59, 53, 'n') / result: (1, 4194227945219247, -75, 52)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5341728924019049, -78, 53), (1, 4194227945219247, -75, 52))

zeta_ / result: (1.76742984138492e-8 - 1.11020289309231e-7j) / count: 1633
zeta / count: 0 / s: Complex { re: 0.5, im: 14.134725 }
gamma_ / s: (0.5, -14.134725) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-14.134725j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=56 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 3978571390186527, -48, 52), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=287275361037200865517000943840, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=287275361037200865517000943840 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-243790725006669908234919702522, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=243790725006669908234919702522 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3324546003940230230441984, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3324546003940230230441984 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=3324546003940230230441984, y=-8543917002826194402410496, prec=79 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=79, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: ln_sqrt2pi_fixed / f_locals: prec=92 / f_lineno: 298 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: f / f_locals: prec=102, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=16703571626015105435307505830654230989 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=16703571626015105435307505830654230989, exp=-122, bc=124, prec=102, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 16703571626015105435307505830654230989, -122, 124, 102, 'd') / result: (0, 124451306656115542615260972311, -95, 97)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 16703571626015105435307505830654230989, -122, 124, 102, 'd') / result: (0, 124451306656115542615260972311, -95, 97)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 124451306656115542615260972311, -95, 97), n=1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 124451306656115542615260972311, -94, 97), prec=102, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=124451306656115542615260972311, n=25 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=4175892906503776358826876457663332352, prec=122 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=280153111556540953215542460800145041418878976, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=99961970518367115073231831877510988860191686310266891205533259355525058899519208482144256 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=112812380252346714256619501890993673050670816217087917444950810085789266016207277765165056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119844398375027416975362124250156558253081446922452215126903700549285702590021345940078592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123523112981967131966433631211306545068774826918748702154819251296018532790592798371872768 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125404601453928029720323931284714870129867852460400437921184426881038853667772148177960960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126356065534944591108671811195750949899937575479834920054591589616121392668525122285469696 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126834501251325580293361066030583655283751847122811260937259636407222732982902106993197056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127074398013868139835428851315650043196027587579164016306760379080409009090078308965548032 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=122, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=9771830597929420112984881758595737588, exp=-122, prec=102, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9771830597929420112984881758595737588 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=9771830597929420112984881758595737588, exp=-122, bc=123, prec=102, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9771830597929420112984881758595737588, -122, 123, 102, 'd') / result: (0, 291223245797438028841760210949, -97, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9771830597929420112984881758595737588, -122, 123, 102, 'd') / result: (0, 291223245797438028841760210949, -97, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 291223245797438028841760210949, -97, 98), prec=91 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 11, -1, 4), (1, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 11, -1, 4), b=(1, 3978571390186527, -48, 52), prec=79, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 11, -1, 4), t=(0, 11, -1, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3978571390186527, -48, 52), t=(1, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 121, -2, 7), t=(0, 15829030306810754071359852321729, -96, 104), prec=99, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18225682222867250283564556819393 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=18225682222867250283564556819393, exp=-96, bc=104, prec=99, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 284776284732300785680696200303, -90, 98), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=283538344693015405405797076079 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=283538344693015405405797076079, exp=-90, bc=98, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 284776284732300785680696200303, -90, 98), prec=79, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=284776284732300785680696200303, n=1 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=569552569464601571361392400606, prec=99 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=320573212228877707659575950169320196648468480, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=114384344374250927695737917073768793223104914683389975011306714685426684312882676372602880 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=120676485028096484433951552367843431407527463960676057612806510180772854322011304760442880 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123951185326074664259857871786972098313394081357046750141548787348173476088241469901504512 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125621709862019204453913212908825132427429745625801802714947246381288877340626171700707328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126465396056981193274815852744801877898272499397908483525622083986070613245447135251398656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126889361632846350693997912295296262541909385612810917707591166893070219651155061672771584 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127101877115422858141706372732003982758358472832807458644577177971327327704869509082906624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127208268290567809871602809777025776342159359187110407689967463022858021207834437890342912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3446903713076390561309005800422, exp=-99, prec=79, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3446903713076390561309005800422 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3446903713076390561309005800422, exp=-99, bc=102, prec=79, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 410902942785786457217813, -76, 79), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 11, -1, 4), (1, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 11, -1, 4), prec=83, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=795361000990365733460758901 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=795361000990365733460758901, exp=-88, bc=90, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 3106878910118616146331089, -80, 82), prec=83, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 3106878910118616146331089, -80, 82), prec=115, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4137755196124176474103397727147895027 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4137755196124176474103397727147895027, exp=-123, bc=122, prec=115, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 32326212469720128703932794743342929, -116, 115), prec=115 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=16163106234860064351966397371671464, prec=115 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=49, prec=115 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=114 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=136592064341000066741906274419971214224130048, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=31102006696265179814114748792328683520, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=31102006696265179814114748792328683520, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=960596954648329995352001931985120417250650554932471146773005280633120915390264924402228071420211273294155979973862067535872, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=960596954648329995352001931985120417250650554932471146773005280633120915390264924402228071420211273294155979973862067535872 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=63616873907402959623674243669028964632506234012469323646411736841980019385839238149504021818082361165649382199226525885399626852659704893752844651084805216602074576870728350790448963184095728456929980200294747108689588245232463420734175062766544694001965766172367 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=63616873907402959623674243669028964632506234012469323646411736841980019385839238149504021818082361165649382199226525885399626852659704893752844651084805216602074576870728350790448963184095728456929980200294747108689588245232463420734175062766544694001965766172367 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=136592064341000066741906274419971214224130048, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=146875073972429994300413514533805050883358785970196765999104, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: pi_fixed / f_locals: prec=216, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=6, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=6, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=4, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=6, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=5, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=5, b=6, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=7101583434157760683541000681561997427937677552418571477652645940236617263256392795779825646866410618589286160811223740454114930951454720 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=146875073972429994300413514533805050883358785970196765999104, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=136592064341000066741906274419971214224130048, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=146875073972429994300413514533803264057810994313047999882333, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=115, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=49834032997671069426337453096415908, exp=-115, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=49834032997671069426337453096415908 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=49834032997671069426337453096415908, exp=-115, bc=116, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 2900722494678983315030197, -81, 82), prec=79, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2900722494678983315030197, exp=-81, bc=82, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 181295155917436457189387, -77, 78), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 410902942785786457217813, -77, 79), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 181295155917436457189387, -77, 78), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4800046813251803222648618, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4800046813251803222648618 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-18310891217218483114822925, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18310891217218483114822925 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 2400023406625901611324309, -78, 81), (1, 18310891217218483114822925, -79, 84)), prec=79, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 2400023406625901611324309, -78, 81), prec=83, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=59699187411898656429395990080, prec=97 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=230957530658735881693891676201, exp=-109, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=230957530658735881693891676201 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=230957530658735881693891676201, exp=-109, bc=98, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 18310891217218483114822925, -79, 84), prec=83, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=18310891217218483114822925, exp=-79, mag=5, wp=93 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=117, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=4649164099690916627888465732026023, prec=113 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=1177505944407630316883099142433373414694345841530125921850780666582535315639679584751118281095742851134771846419572856979456, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1177505944407630316883099142433373414694345841530125921850780666582535315639679584751118281095742851134771846419572856979456 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=93477364213445395674486584006672159009349578834116038418346307598933757089764905705753957410338063415411683564056931495176489629478493565113272041128563300977300636534135255003477278175347280633168128240323507519288257651602240552345475774780715975148167786059120 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=93477364213445395674486584006672159009349578834116038418346307598933757089764905705753957410338063415411683564056931495176489629478493565113272041128563300977300636534135255003477278175347280633168128240323507519288257651602240552345475774780715975148167786059120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4495404953043347407944683301079216, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4495404953043347407944683301079216 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4495404953043347407944683301079216, exp=-113, bc=112, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4495404953043347407944683301079216, -113, 112, 83, 'd') / result: (0, 8373344229615009218351325, -84, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4495404953043347407944683301079216, -113, 112, 83, 'd') / result: (0, 8373344229615009218351325, -84, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=9361149554235093976625001073510346, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9361149554235093976625001073510346 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=9361149554235093976625001073510346, exp=-113, bc=113, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9361149554235093976625001073510346, -113, 113, 83, 'd') / result: (0, 8718249904210766755626537, -83, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9361149554235093976625001073510346, -113, 113, 83, 'd') / result: (0, 8718249904210766755626537, -83, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 8373344229615009218351325, -84, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3688596547369876239432441312247797506607298704825, exp=-174, bc=162, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3688596547369876239432441312247797506607298704825, -174, 162, 79, 'd') / result: (0, 381391943939299648778581, -91, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3688596547369876239432441312247797506607298704825, -174, 162, 79, 'd') / result: (0, 381391943939299648778581, -91, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 8718249904210766755626537, -83, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3840533198437269834067505864995107096179479656597, exp=-173, bc=162, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3840533198437269834067505864995107096179479656597, -173, 162, 79, 'd') / result: (0, 198550912725848715621957, -89, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3840533198437269834067505864995107096179479656597, -173, 162, 79, 'd') / result: (0, 198550912725848715621957, -89, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((0, 381391943939299648778581, -91, 79), (0, 198550912725848715621957, -89, 78)), w=((0, 8977355032412527047406279495, -74, 93), (1, 121895362503334954117459851261, -78, 97)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 8977355032412527047406279495, -74, 93), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 121895362503334954117459851261, -78, 97), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 80592903377982524553907910110515080449823065558057455025, -148, 186), t=(0, 14858479399819437132148394216276916640401370646256243290121, -156, 194), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=35490262664582963417948819204568777235556075429118951776521 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35490262664582963417948819204568777235556075429118951776521, exp=-156, bc=195, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 35490262664582963417948819204568777235556075429118951776521, -156, 195, 63, 'd') / result: (0, 6518531761158815351, -24, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 35490262664582963417948819204568777235556075429118951776521, -156, 195, 63, 'd') / result: (0, 6518531761158815351, -24, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778581, -91, 79), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 198550912725848715621957, -89, 78), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 3423890887245068097056047351909084148739746255496595, -165, 172), t=(1, 24202435482085350494818342228484790191920956325737777, -167, 175), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10506871933105078106594152820848453596961971303751397 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=10506871933105078106594152820848453596961971303751397, exp=-167, bc=173, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 10506871933105078106594152820848453596961971303751397, -167, 173, 63, 'd') / result: (1, 8094199711123548935, -57, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 10506871933105078106594152820848453596961971303751397, -167, 173, 63, 'd') / result: (1, 8094199711123548935, -57, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 198550912725848715621957, -89, 78), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778581, -91, 79), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1782462035549498425446128939415939579200266300871715, -163, 171), t=(1, 46489909262332533317794197358759010978315664582640641, -169, 175), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1782462035549498425446128939415939579200266300871715, -163, 171), t=(1, 46489909262332533317794197358759010978315664582640641, -169, 175), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=160567479537500432546346449481379144047132707838430401 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=160567479537500432546346449481379144047132707838430401, exp=-169, bc=177, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 160567479537500432546346449481379144047132707838430401, -169, 177, 63, 'd') / result: (0, 7731042923401420971, -55, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 160567479537500432546346449481379144047132707838430401, -169, 177, 63, 'd') / result: (0, 7731042923401420971, -55, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 8094199711123548935, -57, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=715803592853699603 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=715803592853699603, exp=-92, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 7731042923401420971, -55, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=683688134538102371 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=683688134538102371, exp=-90, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 683688134538102371, -90, 60, 53, 'n') / result: (0, 5341313551078925, -83, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 683688134538102371, -90, 60, 53, 'n') / result: (0, 5341313551078925, -83, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 699026946146191, -82, 50), (0, 5341313551078925, -83, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.4455538437607e-10 + 5.52278876877407e-10j) / count: 244
gamma__ / s: Complex { re: 0.5, im: -14.134725 } / result: Complex { re: -1.4455538437606964e-10, im: 5.522788768774066e-10 }
zeta__ / s: Complex { re: 0.5, im: 14.134725 } / result: Complex { re: 1.767429841384921e-8, im: -1.1102028930923147e-7 } / z: Complex { re: 0.0, im: 0.0 }
zeta_ / s: (0.75, 20.5) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.75+20.5j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.75+20.5j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.75+20.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.75, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -53, 53, 53, 'd') / result: (0, 3, -2, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -53, 53, 53, 'd') / result: (0, 3, -2, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=20.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5770237022568448, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5770237022568448 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5770237022568448, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5770237022568448, -48, 53, 53, 'd') / result: (0, 41, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5770237022568448, -48, 53, 53, 'd') / result: (0, 41, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, -2, 2), (0, 41, -1, 6)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.75', imag='20.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, -2, 2), (0, 41, -1, 6)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3, -2, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, -2, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -2, 2), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=750000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=750000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 41, -1, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 41, -1, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 41, -1, 6), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=378158253511045808128, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=205000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=205000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.75+20.5j) / result: (0.75 + 20.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.75+20.5j) / result: (0.75 + 20.5j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 3, -2, 2), (0, 41, -1, 6)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 3, -2, 2), (0, 41, -1, 6)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 3, -2, 2), y=(0, 41, -1, 6), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3, -2, 2), t=(0, 3, -2, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 41, -1, 6), t=(0, 41, -1, 6), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, -4, 4), t=(0, 1681, -2, 11), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6733 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=6733, exp=-4, bc=13, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 6733, -4, 13, 14, 'd') / result: (0, 6733, -4, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 6733, -4, 13, 14, 'd') / result: (0, 6733, -4, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6733, -4, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=27578368 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=27578368 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=27578368 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5251, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5251 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5251, exp=-8, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5251, -8, 13, 10, 'd') / result: (0, 41, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5251, -8, 13, 10, 'd') / result: (0, 41, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 41, -1, 6), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 41, -1, 6), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 3, -2, 2), (0, 41, -1, 6)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 3, -2, 2), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 3, -2, 2), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-2, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -2, 1, 73, 'd') / result: (0, 1, -2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -2, 1, 73, 'd') / result: (0, 1, -2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 41, -1, 6), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 41, -1, 6), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 41, -1, 6), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=41, exp=-1, bc=6, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 41, -1, 6, 73, 'd') / result: (1, 41, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 41, -1, 6, 73, 'd') / result: (1, 41, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -2, 1), (1, 41, -1, 6)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -2, 1), y=(1, 41, -1, 6), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -2, 1), t=(0, 1, -2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 41, -1, 6), t=(1, 41, -1, 6), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -4, 1), t=(0, 1681, -2, 11), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6725 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=6725, exp=-4, bc=13, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 6725, -4, 13, 14, 'd') / result: (0, 6725, -4, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 6725, -4, 13, 14, 'd') / result: (0, 6725, -4, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6725, -4, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=27545600 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=27545600 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=27545600 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5248, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5248 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5248, exp=-8, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5248, -8, 13, 10, 'd') / result: (0, 41, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5248, -8, 13, 10, 'd') / result: (0, 41, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 3, -2, 2), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 3, -2, 2), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 3, -2, 2) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 41, -1, 6), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=51 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 51 / result: [1, 5203, 4513603, 1565622243, 290593736163, 33496712602083, 2625586476196323, 148751086335959523, 6363955680371220963, 212481263589749760483, 5680014062870106808803, 124072217794473336054243, 2251700226884154557276643, 34421435724320134622159331, 448372741172808513023189475, 5025627406017013340859867619, 48878680162750201530133848547, 415493327986419814021568733667, 3106328457409671065069814620643, 20537428285849907476554468631011, 120654514479968188404056071152099, 632519106148387088105405727711715, 2969998002562308490547087034622435, 12532206357554137686622525347144163, 47661454073056035016885483119387107, 163803048561041899659795670039863779, 509950545858568398203371129096970723, 1441234867728223897429622364156273123, 3705344284013931812431625366793953763, 8682823787209492951643530334480179683, 18581540087349817929059296145923973603, 36389807064122628914341387785549455843, 65363574764427599168173362278590915043, 107966494730283951699915109388638822883, 164521029399620918361893618282749829603, 232199126788599731468774732445888881123, 305066937435888344015776620621537812963, 375479742245004700456974298569869435363, 436355935595763543359118536627655090659, 483264863805439188539125785001186894307, 515329194480407351067232005408411165155, 534658550099584183762585408978198274531, 544861078596223705322955535934138687971, 549533864561579261846090855366216458723, 551369776288824496174929810545381810659, 551979454839944636413969962951946084835, 552147240241495138457776521855998173667, 552184474704891154697193671738617831907, 552190876419650469769935567683348931043, 552191676465635538811216587290159423971, 552191741115816150450916063622022898147, 552191743651117350907374866615429308899]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 51 / result: [1, 5203, 4513603, 1565622243, 290593736163, 33496712602083, 2625586476196323, 148751086335959523, 6363955680371220963, 212481263589749760483, 5680014062870106808803, 124072217794473336054243, 2251700226884154557276643, 34421435724320134622159331, 448372741172808513023189475, 5025627406017013340859867619, 48878680162750201530133848547, 415493327986419814021568733667, 3106328457409671065069814620643, 20537428285849907476554468631011, 120654514479968188404056071152099, 632519106148387088105405727711715, 2969998002562308490547087034622435, 12532206357554137686622525347144163, 47661454073056035016885483119387107, 163803048561041899659795670039863779, 509950545858568398203371129096970723, 1441234867728223897429622364156273123, 3705344284013931812431625366793953763, 8682823787209492951643530334480179683, 18581540087349817929059296145923973603, 36389807064122628914341387785549455843, 65363574764427599168173362278590915043, 107966494730283951699915109388638822883, 164521029399620918361893618282749829603, 232199126788599731468774732445888881123, 305066937435888344015776620621537812963, 375479742245004700456974298569869435363, 436355935595763543359118536627655090659, 483264863805439188539125785001186894307, 515329194480407351067232005408411165155, 534658550099584183762585408978198274531, 544861078596223705322955535934138687971, 549533864561579261846090855366216458723, 551369776288824496174929810545381810659, 551979454839944636413969962951946084835, 552147240241495138457776521855998173667, 552184474704891154697193671738617831907, 552190876419650469769935567683348931043, 552191676465635538811216587290159423971, 552191741115816150450916063622022898147, 552191743651117350907374866615429308899]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -2, 2), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 41, -1, 6), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-4909942519757819773359, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1636647506585939924452, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-134205095540047073805126, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14152422961372402006904, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3956006813229143959352868171508614191473109274614370421656570134220272156929800710172616681225171157759803659462249159852032, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3956006813229143959352868171508614191473109274614370421656570134220272156929800710172616681225171157759803659462249159852032 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128259735507973691990547407135488027463069713257654509557277212851786016257666132850454707717175847686441877106010759567725448452015220438012085511091236931307021379934818711115090441104250076080319666107825393970133620437270631306034696151495320747139827828578331191 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128259735507973691990547407135488027463069713257654509557277212851786016257666132850454707717175847686441877106010759567725448452015220438012085511091236931307021379934818711115090441104250076080319666107825393970133620437270631306034696151495320747139827828578331191 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-7782074774512488821238, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5311105278175030574384, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-212710043836674694447172, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9826233915454519270873, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2747513870284470739393897999011204634286806963570293817651821555359249069825919031085942655890066652647800974979003332952064, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2747513870284470739393897999011204634286806963570293817651821555359249069825919031085942655890066652647800974979003332952064 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=95820718237525792823623715288681485875052157680453413191911111312180492233832504108192017311361104695218248037057013067652800079683641641739164945773147329706030348785639238290323454777246841236190991085012221957152609642448046455682281759263652485674162481025488112 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=95820718237525792823623715288681485875052157680453413191911111312180492233832504108192017311361104695218248037057013067652800079683641641739164945773147329706030348785639238290323454777246841236190991085012221957152609642448046455682281759263652485674162481025488112 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-9819885039515639546718, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848904, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-268410191080094147610272, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13469094072602856432585, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3770084822006886540897641991124397336521370457530666328732762660549345528144588144159282215789001233896418631080211340328960, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3770084822006886540897641991124397336521370457530666328732762660549345528144588144159282215789001233896418631080211340328960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=126284786941024818271813865467493432578101688261742183076805788878457714137448474498297292959927303159887273519609701203985859924557793492533712815191835902397338954863391641982668876843839940262969375085399345945618061903186159896158649220183296398028996659002632167 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=126284786941024818271813865467493432578101688261742183076805788878457714137448474498297292959927303159887273519609701203985859924557793492533712815191835902397338954863391641982668876843839940262969375085399345945618061903186159896158649220183296398028996659002632167 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-11400533480907729930191, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1692646571779789465431, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-311614581811477951425207, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14771958891644895361259, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4131599804939053743449470675204818998927529268526757620529054970465036195226945911407432565248220530297445075156395989401600, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4131599804939053743449470675204818998927529268526757620529054970465036195226945911407432565248220530297445075156395989401600 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128969279776709178283614004824098921198520420919709897774674134060110518337631236115713670154718233727498369037980392829102862357394629304374416262734619985975736480129284161168868088958383718084423102976682756013331911879737416386899375079639754495182975856670958615 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128969279776709178283614004824098921198520420919709897774674134060110518337631236115713670154718233727498369037980392829102862357394629304374416262734619985975736480129284161168868088958383718084423102976682756013331911879737416386899375079639754495182975856670958615 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-12692017294270308594597, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=401162758417210801025, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-346915139376721768252298, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9142905026684973696574, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2551262879549865686580048141938975731837749323315272830676691444262159850552639100294089609040776177458672333909074523455488, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2551262879549865686580048141938975731837749323315272830676691444262159850552639100294089609040776177458672333909074523455488 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5446248866453932067390790649368314010286491465691777230683409930938123494419264915047316075225542146076908915564369052860820632244677866714210531427331011782857622236644613019683427799019683768894257241838602995836882295746781539211288257163094130471489302951368687 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5446248866453932067390790649368314010286491465691777230683409930938123494419264915047316075225542146076908915564369052860820632244677866714210531427331011782857622236644613019683427799019683768894257241838602995836882295746781539211288257163094130471489302951368687 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-13783951299862030445170, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5855818779169248648263, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-376761335529562165501307, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8968212574128471609971, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2509946881500475149145553435186927541848474030630005254471400894557509488600369641180015283388293972155697883157510563561472, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2509946881500475149145553435186927541848474030630005254471400894557509488600369641180015283388293972155697883157510563561472 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5327646637344489240875053660676055933286811632130189316084346063110719279220775791317875401400614323790301568005585207356584944429538689822009201829475963163586210160250371082889407163212768431195807980716294444857072380194491092517932728263736487230104730510451676 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5327646637344489240875053660676055933286811632130189316084346063110719279220775791317875401400614323790301568005585207356584944429538689822009201829475963163586210160250371082889407163212768431195807980716294444857072380194491092517932728263736487230104730510451676 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-14729827559273459320077, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4909942519757819773356, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-402615286620141221415418, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12785765183833310858266, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3573833831272281488083792134052168434072312817275645341757632549452256308871308213367429168939710758707289990010282530832384, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3573833831272281488083792134052168434072312817275645341757632549452256308871308213367429168939710758707289990010282530832384 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=122877702200285199704804969383603032026945443162828888733326386448993113977509112369046962841577975594709140798575729188567963852843283113607091721325680591664062100592395917504774111787475321492854360101550916492149416494877569116332690880087072854122879951681607772 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=122877702200285199704804969383603032026945443162828888733326386448993113977509112369046962841577975594709140798575729188567963852843283113607091721325680591664062100592395917504774111787475321492854360101550916492149416494877569116332690880087072854122879951681607772 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-15564149549024977642476, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4075620530006301450957, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-425420087673349388894344, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4816715980767090960543, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1342769936605192466621077969441566174651447012271196226671942865401136763448757421207415583705671672346669649425828696555520, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1342769936605192466621077969441566174651447012271196226671942865401136763448757421207415583705671672346669649425828696555520 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1906100053096701430844566306164744716292941873594529002001606851808645131774010519986653427012225164447727262731495493958368124598360538594447956018150756930887714316987962151188896573385558193233041158710255712075185384704727484325920639389528120801766551391229951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1906100053096701430844566306164744716292941873594529002001606851808645131774010519986653427012225164447727262731495493958368124598360538594447956018150756930887714316987962151188896573385558193233041158710255712075185384704727484325920639389528120801766551391229951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=449, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-16310476000665549703550, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3329294078365729389883, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-445819677351525025230353, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14088630002875349786940, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-16985610398541884322642, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2654159680489394770791, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-464273350893478171485528, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10470708311064151112968, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2923106861994380523490500502707409441741226957482681016524306391604013108123064232320758539913116025185442390673150162501632, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2923106861994380523490500502707409441741226957482681016524306391604013108123064232320758539913116025185442390673150162501632 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=103008964210452264876323299538623232269790007079632780765807351907312782543242621038653380002226271810412122328895894337411001141108609385361460849423537932912141749437108961768523477034426788398698652854996782468894697768670404476828509051706998130727909067372698791 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=103008964210452264876323299538623232269790007079632780765807351907312782543242621038653380002226271810412122328895894337411001141108609385361460849423537932912141749437108961768523477034426788398698652854996782468894697768670404476828509051706998130727909067372698791 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-17601959814028128367956, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2037810265003150725477, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-481120234916768842057444, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8459576137915428122255, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2365340888327608268124821961554758876886010506231568737752883970591233221767426534280755143604606253595287305527036703932416, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2365340888327608268124821961554758876886010506231568737752883970591233221767426534280755143604606253595287305527036703932416 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4903335424261504793824135172894068624970952038351066560837509010931705013933310416132772794951713795761297115739369821596904352992236266133231805572712492286400217421207410252026811833839541093058590001485595418729459589432186127111886158955868986715648602996514620 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4903335424261504793824135172894068624970952038351066560837509010931705013933310416132772794951713795761297115739369821596904352992236266133231805572712492286400217421207410252026811833839541093058590001485595418729459589432186127111886158955868986715648602996514620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-18168946313901590427960, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1470823765129688665473, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-496617865913310138364220, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7797696991516079396682, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-18693893819619850218528, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=945876259411428874905, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-510966431069609239306432, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8284883685358926035673, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2313695890765870096331703578114698639399416390374984267496270783460420269327089710388162236539003496966569242087581754064896, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2313695890765870096331703578114698639399416390374984267496270783460420269327089710388162236539003496966569242087581754064896 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4749000149015772748415274983732467085530415160372979878017949560710639662860258658722643922045547911417437465286713998032268944577130755803967123641038241430880154560827033235870424163565298238653132485122294891911491716439616412261009386227530293331604200627869087 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4749000149015772748415274983732467085530415160372979878017949560710639662860258658722643922045547911417437465286713998032268944577130755803967123641038241430880154560827033235870424163565298238653132485122294891911491716439616412261009386227530293331604200627869087 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-19182608255420218751430, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=457161823611060342003, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-524324625648152645872400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9762440956957467050908, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2726855871259775470676650645635180539292169317227660029549176280506923888849784301528905493063825549996313749603221353005056, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2726855871259775470676650645635180539292169317227660029549176280506923888849784301528905493063825549996313749603221353005056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=94936204689650800525774224150537880501239672113822390714662574749314310478075643837864413676430676973986705929052002402042903068857183766914814926447714550269670870264903923577542996217049177349803210476652666597452785248954207206938802154900469370210198693464858460 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=94936204689650800525774224150537880501239672113822390714662574749314310478075643837864413676430676973986705929052002402042903068857183766914814926447714550269670870264903923577542996217049177349803210476652666597452785248954207206938802154900469370210198693464858460 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-19639770079031279093436, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697808, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-536820382160188295220564, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12102436295063765283947, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3387911840050024069628565953667951579120574000191941248833825075781329680086095647354094703503540834843904961628244711309312, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3387911840050024069628565953667951579120574000191941248833825075781329680086095647354094703503540834843904961628244711309312 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=118463828834067215150942070359295333935698357559542016396808326831018290945371010948143894680818409362328357715667009112976191501977423020867393307579060195981089839812653225926863316667798088466845070267913771846868513086497306364146038424451664803544087748846784975 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=118463828834067215150942070359295333935698357559542016396808326831018290945371010948143894680818409362328357715667009112976191501977423020867393307579060195981089839812653225926863316667798088466845070267913771846868513086497306364146038424451664803544087748846784975 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-20069207602185148747737, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6117152503189890043507, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-548558341126394065771458, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=364477328857994733053, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=92960995611128709227613090192108427475869408541852046461903736835463314392606283006667232718084961931692514191018909761536, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=92960995611128709227613090192108427475869408541852046461903736835463314392606283006667232718084961931692514191018909761536 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=151964592821161256362817132569602909163692577192404380374686244720866533018675680134507837334600689001346580164602223204197656205422684050331958320654414320551976719155465884678906404925632580588706899859408343546298836410655532897086749966905803890171880591 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=151964592821161256362817132569602909163692577192404380374686244720866533018675680134507837334600689001346580164602223204197656205422684050331958320654414320551976719155465884678906404925632580588706899859408343546298836410655532897086749966905803890171880591 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-20474092068782797415835, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5712268036592241375409, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-559625183213396462699490, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4133387091997545386224, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-20857079919105767989271, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5329280186269270801973, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-570093517788890991706727, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8500804366644963960190, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2375669887839955902483445638242770924383329329402885631804206608017395812255493899059273725017726804921030918214927693905920, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2375669887839955902483445638242770924383329329402885631804206608017395812255493899059273725017726804921030918214927693905920 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4934050192488393180860560550803610462211582033559273686194576876389074099693505243110315297064412857777039168326826849662912502824876974688430168496628969709918724932340751331299259891037613074009685690680417546030833935891760826033858026115911520639846185636027095 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4934050192488393180860560550803610462211582033559273686194576876389074099693505243110315297064412857777039168326826849662912502824876974688430168496628969709918724932340751331299259891037613074009685690680417546030833935891760826033858026115911520639846185636027095 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-21220418520423369476909, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4965941584951669314335, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-580024772891572099035499, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13405301114105804212621, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3749426822982191272180394637748373241526732811188032540630117385697020347168453414602245052962760131244931405704429360381952, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3749426822982191272180394637748373241526732811188032540630117385697020347168453414602245052962760131244931405704429360381952 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125989088853671904381375058455031473958623771202829032444780460030872192612279268925983691258777217420847094778874903157334183039133658452732291804296804374922889048347460592884994005247415607116310231786394111964677366049917473080534781001821143307586693645427888732 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125989088853671904381375058455031473958623771202829032444780460030872192612279268925983691258777217420847094778874903157334183039133658452732291804296804374922889048347460592884994005247415607116310231786394111964677366049917473080534781001821143307586693645427888732 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-21566026074374519266408, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 1242465168465420212469028548916790, -108, 110, 88, 'd') / result: (0, 74056695012177241591753277, -84, 86)

[2]libmpf._normalize. / x: (0, 1249444331078408621166331932414016, -108, 110, 88, 'd') / result: (0, 297890742082216410914977057, -86, 88)

[2]libmpf._normalize. / x: (0, 1256276552980868190913458591191375, -108, 110, 88, 'd') / result: (0, 149759835360153697838003467, -85, 87)

[2]libmpf._normalize. / x: (0, 1262967894241367681582099531949250, -108, 110, 88, 'd') / result: (0, 301115010795919342418217547, -86, 88)

[2]libmpf._normalize. / x: (0, 1269524047600033606980068991320361, -108, 110, 88, 'd') / result: (0, 302678119564064409012810943, -86, 88)

[2]libmpf._normalize. / x: (0, 1275950367568826728951561582987432, -108, 110, 88, 'd') / result: (0, 304210273639876062620058437, -86, 88)

[2]libmpf._normalize. / x: (0, 8554300547260309911022, -73, 73, 73, 'd') / result: (0, 4277150273630154955511, -72, 72)

[2]libmpf._normalize. / x: (1, 1789154373019563225071, -73, 71, 73, 'd') / result: (1, 1789154373019563225071, -73, 71)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -85, 83, 83, 'd') / result: (0, 6703708186976009930559261, -85, 83)

[3]libmpf._normalize1 / x: (1, 274852035666016407152929701, -84, 88, 83, 'd') / result: (1, 8589126114563012723529053, -79, 83)

[2]libmpf._normalize. / x: (0, 2944334205329844511659708927, -91, 92, 77, 'd') / result: (0, 89853949137263321278677, -76, 77)

[2]libmpf._normalize. / x: (1, 11729261744969228952867658998345, -107, 104, 77, 'd') / result: (1, 43694904986654329869403, -79, 76)

[2]libmpf._normalize. / x: (1, 161834784073317495413751770320404, -107, 107, 77, 'd') / result: (1, 75360193882751043612953, -76, 76)

[3]libmpf._normalize1 / x: (1, 3926159770228391618138912856316620752378619831, -155, 152, 73, 'd') / result: (1, 6495286487437150734741, -76, 73)

[3]libmpf._normalize1 / x: (1, 6771411028115014757046500214590179977839903181, -152, 153, 73, 'd') / result: (1, 5601179922084504809599, -72, 73)

[3]libmpf._normalize1 / x: (0, 82053150213351474153877, -76, 77, 73, 'd') / result: (0, 5128321888334467134617, -72, 73)

[2]libmpf._normalize1 / x: (0, 5601179922084504809599, -72, 73, 73, 'd') / result: (0, 5601179922084504809599, -72, 73)

[2]libmpf._normalize. / x: (0, 57672901909932974168341719863332269642277490, -144, 146, 63, 'd') / result: (0, 2981619145598064831, -60, 62)

[3]libmpf._normalize1 / x: (0, 33847831184239689943939757257588167327792045, -145, 145, 63, 'd') / result: (0, 6999567433142714715, -63, 63)

[3]libmpf._normalize1 / x: (1, 57089536005556495595975695030427011567882985, -145, 146, 63, 'd') / result: (1, 737864958803817981, -59, 60)

[3]libmpf._normalize1 / x: (0, 676641735793965893, -61, 60, 53, 'n') / result: (0, 5286263560890359, -54, 53)

[3]libmpf._normalize1 / x: (1, 570629806799238389, -60, 59, 53, 'n') / result: (1, 2229022682809525, -52, 51)

[7]gammazeta.mpc_zeta / s: ((0, 3, -2, 2), (0, 41, -1, 6)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5286263560890359, -54, 53), (1, 2229022682809525, -52, 51))

zeta_ / result: (0.293446575976872 - 0.494942460973374j) / count: 809
zeta / count: 0 / s: Complex { re: 0.75, im: 20.5 }
gamma_ / s: (0.25, -20.5) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.25-20.5j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.25-20.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.25, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-54, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-54, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -54, 53, 53, 'd') / result: (0, 1, -2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -54, 53, 53, 'd') / result: (0, 1, -2, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-20.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5770237022568448, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5770237022568448 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5770237022568448, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5770237022568448, -48, 53, 53, 'd') / result: (1, 41, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5770237022568448, -48, 53, 53, 'd') / result: (1, 41, -1, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -2, 1), (1, 41, -1, 6)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.25', imag='-20.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -2, 1), (1, 41, -1, 6)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -2, 1), prec=70 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=70, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 41, -1, 6), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 41, -1, 6), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 41, -1, 6), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 41, -1, 6), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=378158253511045808128, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=205000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=205000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.25-20.5j) / result: (0.25 - 20.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.25-20.5j) / result: (0.25 - 20.5j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -2, 1), (1, 41, -1, 6)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -2, 1), (1, 41, -1, 6)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -2, 1), (1, 41, -1, 6)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -2, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 41, -1, 6), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=100 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -2, 1), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 41, -1, 6), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=302231454903657293676544, y=-24782979302099898081476608, prec=80 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=80, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 1, -2, 1), (1, 41, -1, 6)), prec=80, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 1, -2, 1), b=(1, 41, -1, 6), prec=80, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -2, 1), t=(0, 1, -2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 41, -1, 6), t=(1, 41, -1, 6), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -4, 1), t=(0, 1681, -2, 11), prec=100, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6725 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=6725, exp=-4, bc=13, prec=100, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 6725, -4, 13, 100, 'd') / result: (0, 6725, -4, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 6725, -4, 13, 100, 'd') / result: (0, 6725, -4, 13)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 6725, -4, 13), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6709 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=6709, exp=-4, bc=13, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 6709, -4, 13, 10, 'd') / result: (0, 419, 0, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 6709, -4, 13, 10, 'd') / result: (0, 419, 0, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 6725, -4, 13), prec=80, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=6725, n=87 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=1040643345524272793587076300800, prec=100 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=292697280730714428732656302328509744765992960, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=104437879646055194852630272110832376421095791667443020662497435147563494372632008861941760 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=115310374135175278040552794220732813119292412715249674343636105427212976148582373951275008 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=121163985098177390550194488215763246488379456201566660688592750197611170263275103976423424 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=124201297467317874571629448864326898226888348684485564535463076312248716649443960402477056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125748387476825075744255993449814129943219432806674712484499870078491830182470135337451520 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126529144186315241080014482870485042996849357472174575103448378876498370757664071791673344 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126921338523693886978345015122269437739782070290247444346351831838944542099555807783813120 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127117891329587383827344203289906794971757979222916166448483190307869322600934058932305920 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7657875351977010142991086621437, exp=-100, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7657875351977010142991086621437 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7657875351977010142991086621437, exp=-100, bc=103, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7657875351977010142991086621437, -100, 103, 80, 'd') / result: (0, 912889880177618282197843, -77, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7657875351977010142991086621437, -100, 103, 80, 'd') / result: (0, 912889880177618282197843, -77, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 912889880177618282197843, -77, 80), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 1, -2, 1), (1, 41, -1, 6)), prec=80, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 41, -1, 6), x=(0, 1, -2, 1), prec=80, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 41, -1, 6), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 41, -1, 6), x=(0, 1, -2, 1), prec=80, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 41, -1, 6), t=(0, 1, -2, 1), prec=84, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=41, exp=1, bc=6, prec=84, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1064 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 41, 1, 6, 84, 'd') / result: (0, 41, 1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 41, 1, 6, 84, 'd') / result: (0, 41, 1, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 41, 1, 6), prec=84, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 41, 1, 6), prec=121, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=265586237596830020264097254580892262599 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=265586237596830020264097254580892262599, exp=-134, bc=128, prec=121, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 265586237596830020264097254580892262599, -134, 128, 121, 'd') / result: (0, 2074892481225234533313259801413220801, -127, 121)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 265586237596830020264097254580892262599, -134, 128, 121, 'd') / result: (0, 2074892481225234533313259801413220801, -127, 121)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2074892481225234533313259801413220801, -127, 121), prec=121 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=32420195019144289583019684397081575, prec=121 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=1, prec=121 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=2787593149816327892691964784081045188247552, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=664600476781160997046295488563773440, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=664600476781160997046295488563773440, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=10328999512347634358623676688012047497318823171316894051322637426162590488067364778518581413120551325743612687890989973504, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10328999512347634358623676688012047497318823171316894051322637426162590488067364778518581413120551325743612687890989973504 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=30029914574708654043708814807348761436030351443454986298718509317477438022062124524872795656503836279259546356635926274197294579195040433668812636961252449125591132385807646598506952315972477104935964297333093795331197630715978954398841659090334092305017532 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=30029914574708654043708814807348761436030351443454986298718509317477438022062124524872795656503836279259546356635926274197294579195040433668812636961252449125591132385807646598506952315972477104935964297333093795331197630715978954398841659090334092305017532 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=436, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=2787593149816327892691964784081045188247552, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=3138487016050771648187139513501314789921024079999965069312, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=3138487016050771648187139513501314789921024079999965069312, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=2787593149816327892691964784081045188247552, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=3138487016050771648187139513500276316217043990175626526738, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=121, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4143474318529168463305864632857069889, exp=-121, prec=84, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4143474318529168463305864632857069889 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4143474318529168463305864632857069889, exp=-121, bc=122, prec=84, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4143474318529168463305864632857069889, -121, 122, 84, 'd') / result: (0, 15073871758537892540719857, -83, 84)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4143474318529168463305864632857069889, -121, 122, 84, 'd') / result: (0, 15073871758537892540719857, -83, 84)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 15073871758537892540719857, -83, 84), prec=80, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15073871758537892540719857, exp=-83, bc=84, prec=80, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15073871758537892540719857, -83, 84, 80, 'd') / result: (0, 942116984908618283794991, -79, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15073871758537892540719857, -83, 84, 80, 'd') / result: (0, 942116984908618283794991, -79, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 942116984908618283794991, -79, 80), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 912889880177618282197843, -78, 80), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 942116984908618283794991, -79, 80), prec=80 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-38730929260661105121452428, exp=-80, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=38730929260661105121452428 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-49598018388454637116063829, exp=-80, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=49598018388454637116063829 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 9682732315165276280363107, -78, 84), (1, 49598018388454637116063829, -80, 86)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 9682732315165276280363107, -78, 84), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1276086597310455508951, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4053604813399053705129, exp=-118, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4053604813399053705129 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4053604813399053705129, exp=-118, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4053604813399053705129, -118, 72, 57, 'n') / result: (0, 30926550395195417, -101, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4053604813399053705129, -118, 72, 57, 'n') / result: (0, 30926550395195417, -101, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 49598018388454637116063829, -80, 86), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=49598018388454637116063829, exp=-80, mag=6, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=92, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=28753437591326152424948862, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=485462977080338814855312804336566232373984689051894020412163959029641752939166144590373326416665912309949796330876528754688, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=485462977080338814855312804336566232373984689051894020412163959029641752939166144590373326416665912309949796330876528754688 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=1049510941243011899708782018769446326008640547608376057086222054194542587981310742242506252110824527398856782242131042044844734127969626397469613842025589740913340731237764973101222827821727366098781345320484738918358701158069352043968625121705685319346942757852 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1049510941243011899708782018769446326008640547608376057086222054194542587981310742242506252110824527398856782242131042044844734127969626397469613842025589740913340731237764973101222827821727366098781345320484738918358701158069352043968625121705685319346942757852 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-152078776201517185380430383, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=152078776201517185380430383 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=152078776201517185380430383, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 152078776201517185380430383, -87, 87, 57, 'n') / result: (1, 141634397396368147, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 152078776201517185380430383, -87, 87, 57, 'n') / result: (1, 141634397396368147, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=28588260791422124915072165, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=28588260791422124915072165 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=28588260791422124915072165, exp=-87, bc=85, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 28588260791422124915072165, -87, 85, 57, 'n') / result: (0, 106499570576183963, -59, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 28588260791422124915072165, -87, 85, 57, 'n') / result: (0, 106499570576183963, -59, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 30926550395195417, -101, 55), t=(1, 141634397396368147, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=4380263328771914057204274139182299, exp=-158, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 4380263328771914057204274139182299, -158, 112, 53, 'n') / result: (1, 7598545627380955, -99, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 4380263328771914057204274139182299, -158, 112, 53, 'n') / result: (1, 7598545627380955, -99, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 30926550395195417, -101, 55), t=(0, 106499570576183963, -59, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3293664336491024345093601526497571, exp=-160, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3293664336491024345093601526497571, -160, 112, 53, 'n') / result: (0, 2856798423249277, -100, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3293664336491024345093601526497571, -160, 112, 53, 'n') / result: (0, 2856798423249277, -100, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 7598545627380955, -99, 53), (0, 2856798423249277, -100, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.19883911639578e-14 + 2.25361659019838e-15j) / count: 164
gamma__ / s: Complex { re: 0.25, im: -20.5 } / result: Complex { re: -1.1988391163957802e-14, im: 2.253616590198384e-15 }
zeta__ / s: Complex { re: 0.75, im: 20.5 } / result: Complex { re: 0.29344657597687224, im: -0.49494246097337435 } / z: Complex { re: -0.0, im: 0.0 }
zeta_ / s: (1.25, 30.1) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(1.25+30.1j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(1.25+30.1j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(1.25+30.1j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=1.25, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -52, 53, 53, 'd') / result: (0, 5, -2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -52, 53, 53, 'd') / result: (0, 5, -2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=30.1, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8472396798990746, exp=-48, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8472396798990746 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8472396798990746, exp=-48, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8472396798990746, -48, 53, 53, 'd') / result: (0, 4236198399495373, -47, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8472396798990746, -48, 53, 53, 'd') / result: (0, 4236198399495373, -47, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, -2, 3), (0, 4236198399495373, -47, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.25', imag='30.100000000000001') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, -2, 3), (0, 4236198399495373, -47, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, -2, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, -2, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -2, 3), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=125000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=125000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 4236198399495373, -47, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 4236198399495373, -47, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 4236198399495373, -47, 52), prec=64 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=555246996618657529856, xbits=64, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=301000000000000014210, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=301000000000000014210, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1.25+30.1j) / result: (1.25 + 30.1j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1.25+30.1j) / result: (1.25 + 30.1j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5, -2, 3), (0, 4236198399495373, -47, 52)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 5, -2, 3), (0, 4236198399495373, -47, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 5, -2, 3), y=(0, 4236198399495373, -47, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -2, 3), t=(0, 5, -2, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 4236198399495373, -47, 52), t=(0, 4236198399495373, -47, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 25, -4, 5), t=(0, 17945376879887159820261048409129, -94, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=17976325380869294327133526514729 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=17976325380869294327133526514729, exp=-94, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 17976325380869294327133526514729, -94, 104, 14, 'd') / result: (0, 14521, -4, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 17976325380869294327133526514729, -94, 104, 14, 'd') / result: (0, 14521, -4, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 14521, -4, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=14869504 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=14869504 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=14869504 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3856, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3856 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3856, exp=-7, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3856, -7, 12, 10, 'd') / result: (0, 241, -3, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3856, -7, 12, 10, 'd') / result: (0, 241, -3, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 241, -3, 8), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 241, -3, 8), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 5, -2, 3), (0, 4236198399495373, -47, 52)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 5, -2, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 5, -2, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=-2, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, -2, 1, 73, 'd') / result: (1, 1, -2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, -2, 1, 73, 'd') / result: (1, 1, -2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 4236198399495373, -47, 52), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 4236198399495373, -47, 52), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 4236198399495373, -47, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=4236198399495373, exp=-47, bc=52, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 4236198399495373, -47, 52, 73, 'd') / result: (1, 4236198399495373, -47, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 4236198399495373, -47, 52, 73, 'd') / result: (1, 4236198399495373, -47, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 1, -2, 1), (1, 4236198399495373, -47, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 1, -2, 1), y=(1, 4236198399495373, -47, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, -2, 1), t=(1, 1, -2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 4236198399495373, -47, 52), t=(1, 4236198399495373, -47, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -4, 1), t=(0, 17945376879887159820261048409129, -94, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=17946614819926445200535947533353 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=17946614819926445200535947533353, exp=-94, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 17946614819926445200535947533353, -94, 104, 14, 'd') / result: (0, 14497, -4, 14)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 17946614819926445200535947533353, -94, 104, 14, 'd') / result: (0, 14497, -4, 14)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 14497, -4, 14), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=14844928 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=14844928 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=14844928 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3852, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3852 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3852, exp=-7, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3852, -7, 12, 10, 'd') / result: (0, 963, -5, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3852, -7, 12, 10, 'd') / result: (0, 963, -5, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 5, -2, 3), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, -2, 3), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 5, -2, 3) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 4236198399495373, -47, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=60 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 60 / result: [1, 7201, 8644801, 4150086081, 1066429774401, 170275781016129, 18501288832203329, 1454363497940580929, 86433475240338061889, 4014356862444488292929, 149512908436880326851137, 4558559925844026949827137, 115711274226999556669635137, 2479673001148805776433674817, 45393708371882758898181929537, 717023025162587937870278752833, 9857139735519966885575225440833, 118821668360956955124881256544833, 1264159935912772409284697983482433, 11938777758102665518324696838240833, 100592847312136162390582533480708673, 759577801023883409756959019557124673, 5160705641986694307072779991048452673, 31661023231242962434678766748859038273, 175956192232317429491200017339703556673, 888362055186193655415967791685358778945, 4085055029979228002514284727851760417345, 17148828975883955369272466029529689684545, 65858043259900153122470827740071683095105, 231817084305017652061377768546951602567745, 749196738817423504685608559152806628358721, 2226642605748672369926669515933143560813121, 6094677965700622524064724937503886779808321, 15385175949137660843001443600409466763147841, 35866686428865846285363252698351443355040321, 77321602878104508994375477489548288730266177, 154360277813113760898838727786177794024602177, 285790938346443132530000022627669375067290177, 491560625118273187343418162130383562650614337, 787024790739362496819095490647101370462566977, 1175803271958504695806394962790301574539180609, 1644070036450094215815186859379521934763948609, 2159620191963209699978624409324854046795692609, 2677568255176386186393984924618769098883398209, 3151406843831700725429144936259127121979308609, 3545148372681859723159235452798231117201078849, 3841442165294855624461143032133677267451574849, 4042631819029783978399386385020340313423542849, 4165375156023330180297674325312159741909072449, 4232311981078510435993100864600271662513846849, 4264739154105242204307774165855401437384604225, 4278588849437956219118933409256932306092751425, 4283755333992616899027950617680430938594409025, 4285419007006444740608715907436928611450288705, 4285874515955540560162328003040040296887810625, 4285978458614817137501667677232710319519758913, 4285997688675654985625902012065652810836802113, 4286000459285258699809924595938494082680027713, 4286000750884650275125844214211167931680619073, 4286000770823070211899582307768273835885787713, 4286000771487684209792040244220177366025960001]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 60 / result: [1, 7201, 8644801, 4150086081, 1066429774401, 170275781016129, 18501288832203329, 1454363497940580929, 86433475240338061889, 4014356862444488292929, 149512908436880326851137, 4558559925844026949827137, 115711274226999556669635137, 2479673001148805776433674817, 45393708371882758898181929537, 717023025162587937870278752833, 9857139735519966885575225440833, 118821668360956955124881256544833, 1264159935912772409284697983482433, 11938777758102665518324696838240833, 100592847312136162390582533480708673, 759577801023883409756959019557124673, 5160705641986694307072779991048452673, 31661023231242962434678766748859038273, 175956192232317429491200017339703556673, 888362055186193655415967791685358778945, 4085055029979228002514284727851760417345, 17148828975883955369272466029529689684545, 65858043259900153122470827740071683095105, 231817084305017652061377768546951602567745, 749196738817423504685608559152806628358721, 2226642605748672369926669515933143560813121, 6094677965700622524064724937503886779808321, 15385175949137660843001443600409466763147841, 35866686428865846285363252698351443355040321, 77321602878104508994375477489548288730266177, 154360277813113760898838727786177794024602177, 285790938346443132530000022627669375067290177, 491560625118273187343418162130383562650614337, 787024790739362496819095490647101370462566977, 1175803271958504695806394962790301574539180609, 1644070036450094215815186859379521934763948609, 2159620191963209699978624409324854046795692609, 2677568255176386186393984924618769098883398209, 3151406843831700725429144936259127121979308609, 3545148372681859723159235452798231117201078849, 3841442165294855624461143032133677267451574849, 4042631819029783978399386385020340313423542849, 4165375156023330180297674325312159741909072449, 4232311981078510435993100864600271662513846849, 4264739154105242204307774165855401437384604225, 4278588849437956219118933409256932306092751425, 4283755333992616899027950617680430938594409025, 4285419007006444740608715907436928611450288705, 4285874515955540560162328003040040296887810625, 4285978458614817137501667677232710319519758913, 4285997688675654985625902012065652810836802113, 4286000459285258699809924595938494082680027713, 4286000750884650275125844214211167931680619073, 4286000770823070211899582307768273835885787713, 4286000771487684209792040244220177366025960001]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -2, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 4236198399495373, -47, 52), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-8183237532929699622264, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4909942519757819773358, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-197052359792947176207376, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10648166109040089929466, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2974751859556118695283618886147469679227821073339265486780919578734826060563401056213351446978718781814160454112605112369152, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2974751859556118695283618886147469679227821073339265486780919578734826060563401056213351446978718781814160454112605112369152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=104999416580049678423331067385973060450400463087339372134050217829537368271451610966236313047615235307629799756716189186812806934125741874958788402227604562176972163162119555381321337698492056273819288382063083876867880334666333487800008477452152720654141992873427895 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=104999416580049678423331067385973060450400463087339372134050217829537368271451610966236313047615235307629799756716189186812806934125741874958788402227604562176972163162119555381321337698492056273819288382063083876867880334666333487800008477452152720654141992873427895 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-12970124624187481368730, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=123055428500038026892, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-312320600950434566104343, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14065939752688280682123, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-16366475065859399244529, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848904, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-394104719585894352414781, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6460580367938232277700, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1807574914660836012759143420402108312030794054980456458981461549578453335411788836240751747296096482005132220380923245363200, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1807574914660836012759143420402108312030794054980456458981461549578453335411788836240751747296096482005132220380923245363200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3215566846911057399858756468438263886871913341842789652460582962327553194671431720226947317993244833172479372344126241939674644183378676405239080540157948388392281517067420970718166157555130420019357149858121004639876370422432519780099951244025780940049065315636992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3215566846911057399858756468438263886871913341842789652460582962327553194671431720226947317993244833172479372344126241939674644183378676405239080540157948388392281517067420970718166157555130420019357149858121004639876370422432519780099951244025780940049065315636992 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-19000889134846216550318, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=638880944185062543115, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-457541410367096916133156, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2366896987303458884137, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=661055968790248598951915308032771039828404682964281219284648795274405791236311345825189210439715284847591212025023358304256, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=661055968790248598951915308032771039828404682964281219284648795274405791236311345825189210439715284847591212025023358304256 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=30838233503796989642676245739147954066765478740038583324579921142117214795209836568725075929412604421075023929567333101128904574026939070325441049701838788137053707243536738829912364848416510090944146949806681363284719811779461333660665236070126769905205489957135 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=30838233503796989642676245739147954066765478740038583324579921142117214795209836568725075929412604421075023929567333101128904574026939070325441049701838788137053707243536738829912364848416510090944146949806681363284719811779461333660665236070126769905205489957135 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=446, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-21153362157117180990994, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5032997948257857800250, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-509372960743381742311719, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9878354011586423030386, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2757842869796818373752521675699216681784125786741610711703144192785411660313986395864461237303187203973544587666894322925568, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2757842869796818373752521675699216681784125786741610711703144192785411660313986395864461237303187203973544587666894322925568 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=96260119996531917438218359178241754216211038288769091113230580389794198936293716201670733891907017426324424909139794030472369227931042412408796656832307496225862886881174009756681727147186445424980514875881758869949252514647308849304309725074089219626397272658055260 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=96260119996531917438218359178241754216211038288769091113230580389794198936293716201670733891907017426324424909139794030472369227931042412408796656832307496225862886881174009756681727147186445424980514875881758869949252514647308849304309725074089219626397272658055260 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-22973252166436717408617, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3213107938938321382627, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-553195912167796181317044, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10562658137597826768670, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2954093860531423426566371532771445584233183426996631698678274303882500879587266326656314284152477679162673228736823132422144, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2954093860531423426566371532771445584233183426996631698678274303882500879587266326656314284152477679162673228736823132422144 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=104210484355601736922773500142536238139439785498329775339050904222349840587096938420066145669422779036381294613746947092310206585607855390871249361176824303584845923307915674799669331759257752649878167795260311888193689524540253973397136441222207709799102825665766000 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=104210484355601736922773500142536238139439785498329775339050904222349840587096938420066145669422779036381294613746947092310206585607855390871249361176824303584845923307915674799669331759257752649878167795260311888193689524540253973397136441222207709799102825665766000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-24549712598789098866794, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1636647506585939924450, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-591157079378841528622186, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2272994626836374625934, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=630068970253205695876044277968734897336448213450330537130680882995918019772109251489633466200353630870360373961350388383744, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=630068970253205695876044277968734897336448213450330537130680882995918019772109251489633466200353630870360373961350388383744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1754288010438212854482852762943837720286188551975871801481647443451496002842057473477619697330025310166731583376565829293950582121953813476518314268833891983990797947000022055441138044624444301508436128763622371949016776197793959946753859565543648321586499748927 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1754288010438212854482852762943837720286188551975871801481647443451496002842057473477619697330025310166731583376565829293950582121953813476518314268833891983990797947000022055441138044624444301508436128763622371949016776197793959946753859565543648321586499748927 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-25940249248374962737460, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=246110857000076053784, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-624641201900869132208686, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13296127655234613783043, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3718439824445148369104523607684337099034776341674081858476149473418532575704251320266689308723398477267700567640756390461440, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3718439824445148369104523607684337099034776341674081858476149473418532575704251320266689308723398477267700567640756390461440 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125517413387155378090326863478834296779009472656397171216970201532526741402657384449535720665030052808801186398782125747979546604134132892683188757840947797535329000983230275523072624503992158586857263708234930456266653802221361896903056148392603185556410193897417152 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125517413387155378090326863478834296779009472656397171216970201532526741402657384449535720665030052808801186398782125747979546604134132892683188757840947797535329000983230275523072624503992158586857263708234930456266653802221361896903056148392603185556410193897417152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-27184126667775916172583, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5548823463942882316472, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-654593770160044092340561, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13015063096343548813574, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-28309350664236473871069, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4423599467482324617986, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-681689163994814322999342, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=755421111715265735996, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-29336599690046880613259, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3396350441671917875796, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-706425320536328918519124, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5690768270484565378620, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1590665924901535691228046209953855314587098768382801683903686163629038935162374175891861537620564904164516353935212455919616, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1590665924901535691228046209953855314587098768382801683903686163629038935162374175891861537620564904164516353935212455919616 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2581806684114904923768884789295404626150013155760272968471183519944525322918289770205889342636843784870837906219389262542546073254353709245686135529363331552429470933299689519019797579795543228109755068261257198251314250039128106142645453888347263493930951689608951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2581806684114904923768884789295404626150013155760272968471183519944525322918289770205889342636843784870837906219389262542546073254353709245686135529363331552429470933299689519019797579795543228109755068261257198251314250039128106142645453888347263493930951689608951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-30281577189835984046599, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2451372941882814442456, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-729180378731250530268266, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12607213775846848791884, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3522188833710543316290673750612108196585718701419060871501019362321443356430971389474836261874108002078571926570827580964864, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3522188833710543316290673750612108196585718701419060871501019362321443356430971389474836261874108002078571926570827580964864 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=121763940494115338849143275951816781760377462832427968620159088752416725612447749812789929389023718932657981673172465046692055697677192004563704384529373869962066963170652420288642938727438721088075548395731386002251684212045895746795974549425081582099109780678776407 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=121763940494115338849143275951816781760377462832427968620159088752416725612447749812789929389023718932657981673172465046692055697677192004563704384529373869962066963170652420288642938727438721088075548395731386002251684212045895746795974549425081582099109780678776407 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-31156489699366417030880, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1576460432352381458175, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-750248271960743357524419, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6375072396495969116934, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1776587916123793109683272390338072169538837585466505776827493637299965563947586741905196003056734828027901382317250275442688, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1776587916123793109683272390338072169538837585466505776827493637299965563947586741905196003056734828027901382317250275442688 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3123284100221080259308630260393937774332061058025330612377931015551206799303376935566048826662441191937665783231694609819301711211204296375684650459233042657421069725857619475543394006184072643364796287151629104029088699390753630516079846937055014037954288571914176 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3123284100221080259308630260393937774332061058025330612377931015551206799303376935566048826662441191937665783231694609819301711211204296375684650459233042657421069725857619475543394006184072643364796287151629104029088699390753630516079846937055014037954288571914176 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-31971013759033697919049, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=761936372685100570006, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-769862011317531482237529, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1597084889849791985027, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=444146979030948277420818097584518042384709396366626444206873409324991390986896685476299000764183707006975345579312568860672, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=444146979030948277420818097584518042384709396366626444206873409324991390986896685476299000764183707006975345579312568860672 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=880085830672703614473355383303181556036810382123974779839640843045098213420313168051513486911863184968760455041816177450211583259190654328741162239672068055225920506247778019963551648031389754744053328339585007895425545180792541837006145303749956292957327693671 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=880085830672703614473355383303181556036810382123974779839640843045098213420313168051513486911863184968760455041816177450211583259190654328741162239672068055225920506247778019963551648031389754744053328339585007895425545180792541837006145303749956292957327693671 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-32732950131718798489059, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697807, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-788209439171788704829591, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12921160735876464555371, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3615149829321672025518286840804216624061588109960912917962923099156906670823577672481503494592192964010264440761846490726400, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3615149829321672025518286840804216624061588109960912917962923099156906670823577672481503494592192964010264440761846490726400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=123704649080917518180226707943087790661496748499508277053665795086170957225321882107591691995406039458001611100267687113238055367754765633457950663481923635466873823346832392978142790347784981106102652930007003602462003906834507435325257803095497360387622825472558247 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=123704649080917518180226707943087790661496748499508277053665795086170957225321882107591691995406039458001611100267687113238055367754765633457950663481923635466873823346832392978142790347784981106102652930007003602462003906834507435325257803095497360387622825472558247 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-33448679336975247912894, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5830860821087310273972, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-805444198434364007769228, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10522153323443109196937, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2943764861019075792207747856083433536735864603825314804626951666456338289099198961877795702739357127836929616048932142448640, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2943764861019075792207747856083433536735864603825314804626951666456338289099198961877795702739357127836929616048932142448640 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=103812369583105115891680657588777516213390154168479379683824801973312410828264486361168362591002132005969319216185217710155056840298375005482476685482180804089479993901293142946675654623428302733014842732335597749794626649604829799805094733189420431958837411997984655 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=103812369583105115891680657588777516213390154168479379683824801973312410828264486361168362591002132005969319216185217710155056840298375005482476685482180804089479993901293142946675654623428302733014842732335597749794626649604829799805094733189420431958837411997984655 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-34123486781304662359725, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5156053376757895827141, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-821693561693816308416092, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9108541914132756131276, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-34761799865176279982118, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4517740292886278204748, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-837064140753444861488981, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8573714704646150639590, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2396327886864651171200692991618795019377966975745519419906851882869720993231628628616310887843967907572518143590709673852928, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2396327886864651171200692991618795019377966975745519419906851882869720993231628628616310887843967907572518143590709673852928 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4995312425839167967126033896485652210355382563056071245574916076387061191708002270209771503781084353892906498463633496619962576534160925242566775670470395982989885889751572713843664953879336893647420678281373658429596997330371089007855294399935984295522236171137151 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4995312425839167967126033896485652210355382563056071245574916076387061191708002270209771503781084353892906498463633496619962576534160925242566775670470395982989885889751572713843664953879336893647420678281373658429596997330371089007855294399935984295522236171137151 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-35367364200705615794848, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3912175957356942392018, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-851646129952991268547966, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8827477355241691161808, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2468630883451084611711058728434879351859198737944737678266110344852859126648100182065940957735811766852723432405946603667456, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2468630883451084611711058728434879351859198737944737678266110344852859126648100182065940957735811766852723432405946603667456 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5207777832378145265158493457695946310787214808139298787211966142934764565411847969068128924444575825321893226787221646055290132599448256541492855572223347931730025296137258712303856841344443798899723047053215408157397090620513727763586489120371650380947669719141647 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5207777832378145265158493457695946310787214808139298787211966142934764565411847969068128924444575825321893226787221646055290132599448256541492855572223347931730025296137258712303856841344443798899723047053215408157397090620513727763586489120371650380947669719141647 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-35943376790624198777347, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3336163367438359409519, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-865516513118230747421387, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9792846040144159869590, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 1282251896705988486230930442438776, -108, 110, 88, 'd') / result: (0, 305712675262925263936741457, -86, 88)

[2]libmpf._normalize. / x: (0, 1288433389387681976710025743103290, -108, 110, 88, 'd') / result: (0, 307186457964821333100801883, -86, 88)

[2]libmpf._normalize. / x: (0, 1294499333357576653431345650430265, -108, 110, 88, 'd') / result: (0, 154316345853516656569402891, -85, 87)

[2]libmpf._normalize. / x: (0, 1300453969299057703421135530143822, -108, 111, 88, 'd') / result: (0, 155026193773634159972803059, -85, 88)

[2]libmpf._normalize. / x: (0, 1306301308643873273329876163195678, -108, 111, 88, 'd') / result: (0, 77861625471345977385632763, -84, 87)

[2]libmpf._normalize. / x: (0, 1312045149804536671036437392274803, -108, 111, 88, 'd') / result: (0, 156407970166747173194460557, -85, 88)

[2]libmpf._normalize. / x: (0, 1317689092994991943168438291805351, -108, 111, 88, 'd') / result: (0, 78540390312373157928492921, -84, 87)

[2]libmpf._normalize. / x: (0, 1323236553784362377064475134718151, -108, 111, 88, 'd') / result: (0, 9858880592766123839203083, -81, 84)

[2]libmpf._normalize. / x: (0, 1328690775511560467287804422500678, -108, 111, 88, 'd') / result: (0, 158392283381409700785613587, -85, 88)

[2]libmpf._normalize. / x: (0, 9873211186270824603357, -73, 74, 73, 'd') / result: (0, 2468302796567706150839, -71, 72)

[2]libmpf._normalize. / x: (1, 739377490985046195417, -73, 70, 73, 'd') / result: (1, 739377490985046195417, -73, 70)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (1, 6703708186976009930559261, -85, 83, 83, 'd') / result: (1, 6703708186976009930559261, -85, 83)

[3]libmpf._normalize1 / x: (1, 28398237892351801954950109590154071799353, -130, 135, 83, 'd') / result: (1, 394104719585894352414797, -74, 79)

[2]libmpf._normalize. / x: (0, 2081958682668237652883223677, -91, 91, 77, 'd') / result: (0, 31768168375675013013965, -75, 75)

[2]libmpf._normalize. / x: (1, 69608122777393490898217997913243, -107, 106, 77, 'd') / result: (1, 129655232238384878073293, -78, 77)

[2]libmpf._normalize. / x: (1, 146570058881569022030668878711938, -107, 107, 77, 'd') / result: (1, 68252002299562572515881, -76, 76)

[3]libmpf._normalize1 / x: (1, 4118909248536257913775781824620807550102536745, -153, 152, 73, 'd') / result: (1, 3407081875254552730031, -73, 72)

[3]libmpf._normalize1 / x: (1, 2168241101029461982314028812338428706637278165, -151, 151, 73, 'd') / result: (1, 224190875264025190903, -68, 68)

[3]libmpf._normalize1 / x: (0, 12851814840993843157423, -73, 74, 73, 'd') / result: (0, 6425907420496921578711, -72, 73)

[2]libmpf._normalize1 / x: (0, 224190875264025190903, -68, 68, 73, 'd') / result: (0, 224190875264025190903, -68, 68)

[3]libmpf._normalize1 / x: (0, 54159242606019724285826602477058224621006225, -144, 146, 63, 'd') / result: (0, 5599934434281928803, -61, 63)

[3]libmpf._normalize1 / x: (0, 15198038509079900802772505325501871902422325, -143, 144, 63, 'd') / result: (0, 6285761401772607901, -62, 63)

[3]libmpf._normalize1 / x: (1, 40166913026135134055515723781024634324494975, -145, 145, 63, 'd') / result: (1, 8306322930330661675, -63, 63)

[3]libmpf._normalize1 / x: (0, 647060209184448181, -60, 60, 53, 'n') / result: (0, 5055157884253501, -53, 53)

[3]libmpf._normalize1 / x: (1, 855058076391135977, -61, 60, 53, 'n') / result: (1, 3340070610902875, -53, 52)

[7]gammazeta.mpc_zeta / s: ((0, 5, -2, 3), (0, 4236198399495373, -47, 52)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5055157884253501, -53, 53), (1, 3340070610902875, -53, 52))

zeta_ / result: (0.561235267621363 - 0.370822329609818j) / count: 935
zeta / count: 0 / s: Complex { re: 1.25, im: 30.1 }
zeta__ / s: Complex { re: 1.25, im: 30.1 } / result: Complex { re: 0.5612352676213629, im: -0.3708223296098184 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (0.25, 40.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.25+40j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.25+40j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.25+40j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.25, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-54, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-54, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -54, 53, 53, 'd') / result: (0, 1, -2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -54, 53, 53, 'd') / result: (0, 1, -2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=40.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -47, 53, 53, 'd') / result: (0, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -47, 53, 53, 'd') / result: (0, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -2, 1), (0, 5, 3, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.25', imag='40.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -2, 1), (0, 5, 3, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -2, 1), prec=70 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=70, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 3, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 3, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 3, 3), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.25+40j) / result: (0.25 + 40.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.25+40j) / result: (0.25 + 40.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -2, 1), (0, 5, 3, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -2, 1), (0, 5, 3, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -2, 1), y=(0, 5, 3, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -2, 1), t=(0, 1, -2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, 3, 3), t=(0, 5, 3, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -4, 1), t=(0, 25, 6, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=25601 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25601, exp=-4, bc=15, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 25601, -4, 15, 14, 'd') / result: (0, 25, 6, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 25601, -4, 15, 14, 'd') / result: (0, 25, 6, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 25, 6, 5), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26214400 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26214400 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26214400 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5120, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5120, exp=-7, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5120, -7, 13, 10, 'd') / result: (0, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5120, -7, 13, 10, 'd') / result: (0, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 5, 3, 3), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, 3, 3), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 5, 3, 3), t=(0, 53, 0, 6), prec=5, rnd='f' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 711 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 5, 3, 3), t=(0, 53, 0, 6), prec=5, rnd='f', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=13 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=13, exp=0, bc=4, prec=5, rnd='f' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 13, 0, 4, 5, 'f') / result: (1, 13, 0, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 13, 0, 4, 5, 'f') / result: (1, 13, 0, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -2, 1), (0, 5, 3, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -2, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -2, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3, exp=-2, bc=2, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 3, -2, 2, 73, 'd') / result: (0, 3, -2, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 3, -2, 2, 73, 'd') / result: (0, 3, -2, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5, 3, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5, 3, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5, 3, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5, exp=3, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5, 3, 3, 73, 'd') / result: (1, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5, 3, 3, 73, 'd') / result: (1, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 3, -2, 2), (1, 5, 3, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 3, -2, 2), y=(1, 5, 3, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3, -2, 2), t=(0, 3, -2, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 3, 3), t=(1, 5, 3, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, -4, 4), t=(0, 25, 6, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=25609 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25609, exp=-4, bc=15, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 25609, -4, 15, 14, 'd') / result: (0, 3201, -1, 12)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 25609, -4, 15, 14, 'd') / result: (0, 3201, -1, 12)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 3201, -1, 12), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26222592 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26222592 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26222592 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5120, exp=-7, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5120, exp=-7, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5120, -7, 13, 10, 'd') / result: (0, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5120, -7, 13, 10, 'd') / result: (0, 5, 3, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -2, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -2, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -2, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 3, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=69 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 69 / result: [1, 9523, 15117763, 9597770787, 3262223997219, 689204954860323, 99132379905395491, 10322077470922509091, 813164031952133163811, 50106610570491302382371, 2478457450574315638623011, 100474503037222153138342691, 3395414006820163935737613091, 97012249015840731383496575779, 2371554610716488592336455076643, 50110800041353074731418089818915, 923276998724286763146233796234019, 14946855341207767213444789081082659, 214037148508147845225302373950425891, 2727162698384998844197171802301139747, 31080374030328958832597749968309193507, 318300709962053951885826371064618421027, 2941539296061529575543220965432601217827, 24621909214414103956959021313474847443747, 187301564346449733003327225343465602812707, 1298835207983297255548716505123892233374499, 8232927440384505933147102721069359117241123, 47821700004128653309791977203441451668736803, 255122909065188915936586956311135318120205091, 1252626730524156447051848458926136536362781475, 5670948741958227319336396583503317073663232803, 23713403830426707105577158412157462028202674979, 91730595632192801537833998639226659277458508579, 328728493779698531042117273164688281767406340899, 1092781419150761778399209620888564557257387412259, 3373866964461472342972557789455499524662258436899, 9685227283881403920696625961640696742771510348579, 25878387970138392381869448039850032811448709810979, 64423792214197132634710298909524466457029804952355, 149575377880226331048744999099141580278137026120483, 324190021904235573366132612146204522544204998642467, 656594050666592221945031886365876886593010094181155, 1243974663740636098951922170127546927482464881478435, 2207246727972050325704124731240392406303639161932579, 3672789178882122545297862379077699634269814451735331, 5740283522862623928744708249310105586331959367437091, 8442942158854335245089940117898668742013769443576611, 11713833072694681358900573058835181918302210373061411, 15374935534151068763481597297988682631411026711677731, 19160051775597878716376853580589209141871098979289891, 22769293929058271237117380783392135430633026474871587, 25937803542327130677767480571991404053770560183864099, 28493434895822551287104379579972890321872529120168739, 30382719242323927816630345890635214581885377314949923, 31659245045152133765275097098116300409349925489478435, 32444963179003022831246595339251447482468221196569379, 32883832767280096003230675437903511613399161141070627, 33105277599123053278335202735003217936256722827086627, 33205674776258450999462052891889201732406837750401827, 33246310690051917786776035122562740588910303069211427, 33260880429451256018642112785101152279757483911809827, 33265463945896895278145301016020294936057057670990627, 33266714105116267119184722930564199568249965279054627, 33267005253307800827942348300884646691480669095332643, 33267061992817568223940389465573080284393739327245091, 33267070992644400738749858129739522345046617491639075, 33267072108514671899503472565083777016457661372304163, 33267072209946039831296809754246479999719129843108643, 33267072215956787560588266772863529065393883530267427, 33267072216131012132451787266156776864398948854532899]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 69 / result: [1, 9523, 15117763, 9597770787, 3262223997219, 689204954860323, 99132379905395491, 10322077470922509091, 813164031952133163811, 50106610570491302382371, 2478457450574315638623011, 100474503037222153138342691, 3395414006820163935737613091, 97012249015840731383496575779, 2371554610716488592336455076643, 50110800041353074731418089818915, 923276998724286763146233796234019, 14946855341207767213444789081082659, 214037148508147845225302373950425891, 2727162698384998844197171802301139747, 31080374030328958832597749968309193507, 318300709962053951885826371064618421027, 2941539296061529575543220965432601217827, 24621909214414103956959021313474847443747, 187301564346449733003327225343465602812707, 1298835207983297255548716505123892233374499, 8232927440384505933147102721069359117241123, 47821700004128653309791977203441451668736803, 255122909065188915936586956311135318120205091, 1252626730524156447051848458926136536362781475, 5670948741958227319336396583503317073663232803, 23713403830426707105577158412157462028202674979, 91730595632192801537833998639226659277458508579, 328728493779698531042117273164688281767406340899, 1092781419150761778399209620888564557257387412259, 3373866964461472342972557789455499524662258436899, 9685227283881403920696625961640696742771510348579, 25878387970138392381869448039850032811448709810979, 64423792214197132634710298909524466457029804952355, 149575377880226331048744999099141580278137026120483, 324190021904235573366132612146204522544204998642467, 656594050666592221945031886365876886593010094181155, 1243974663740636098951922170127546927482464881478435, 2207246727972050325704124731240392406303639161932579, 3672789178882122545297862379077699634269814451735331, 5740283522862623928744708249310105586331959367437091, 8442942158854335245089940117898668742013769443576611, 11713833072694681358900573058835181918302210373061411, 15374935534151068763481597297988682631411026711677731, 19160051775597878716376853580589209141871098979289891, 22769293929058271237117380783392135430633026474871587, 25937803542327130677767480571991404053770560183864099, 28493434895822551287104379579972890321872529120168739, 30382719242323927816630345890635214581885377314949923, 31659245045152133765275097098116300409349925489478435, 32444963179003022831246595339251447482468221196569379, 32883832767280096003230675437903511613399161141070627, 33105277599123053278335202735003217936256722827086627, 33205674776258450999462052891889201732406837750401827, 33246310690051917786776035122562740588910303069211427, 33260880429451256018642112785101152279757483911809827, 33265463945896895278145301016020294936057057670990627, 33266714105116267119184722930564199568249965279054627, 33267005253307800827942348300884646691480669095332643, 33267061992817568223940389465573080284393739327245091, 33267070992644400738749858129739522345046617491639075, 33267072108514671899503472565083777016457661372304163, 33267072209946039831296809754246479999719129843108643, 33267072215956787560588266772863529065393883530267427, 33267072216131012132451787266156776864398948854532899]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -2, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 3, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-1636647506585939924453, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4909942519757819773358, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-261863601053750387912440, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5179932248804668549214, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1446059931728668810207314736321686649624635243984365167185169239662762668329431068992601397836877185604105776304738596290560, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1446059931728668810207314736321686649624635243984365167185169239662762668329431068992601397836877185604105776304738596290560 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2179903072080911885684117039988546685066961103631877978608080983661003913045662390990575237086571208228207839007170350017212564642132127321642970134745099747231571356627145311731430231245862861190746072481382513030117319061798233754799194002342347824084233834256295 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2179903072080911885684117039988546685066961103631877978608080983661003913045662390990575237086571208228207839007170350017212564642132127321642970134745099747231571356627145311731430231245862861190746072481382513030117319061798233754799194002342347824084233834256295 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-2594024924837496273746, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3952565101506263424065, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-415043987973999403799360, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=357063829975128474324, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-3273295013171879848906, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848905, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-523727202107500775824920, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10359864497609337098388, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2892119863457337620414629472643373299249270487968730334370338479325525336658862137985202795673754371208211552609477192581120, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2892119863457337620414629472643373299249270487968730334370338479325525336658862137985202795673754371208211552609477192581120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=101786285428711556364796266260398890728169015415543836698438131307860059409926717867272821166177076936180960152977606799651777606996856413318757830360739563036549007729436879005191084828565626441347681127564623491314105482681641063169529294467945621087579894778091807 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=101786285428711556364796266260398890728169015415543836698438131307860059409926717867272821166177076936180960152977606799651777606996856413318757830360739563036549007729436879005191084828565626441347681127564623491314105482681641063169529294467945621087579894778091807 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-3800177826969243310064, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2746412199374516387747, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-608028452315078929610160, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=237373540740921219163, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-4230672431423436198199, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2315917594920323499612, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-676907589027749791711800, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5536996078779797023538, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1549349926852145153793551503201807124597823475697534107698395613924388573210104716777787211968082698861541903183648496025600, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1549349926852145153793551503201807124597823475697534107698395613924388573210104716777787211968082698861541903183648496025600 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2464995905698815492080257517578025082211511420338333957400243519430891631612603411529895275168637335120254196446827673710691235939878718458194408287971984867359475791182172863632273025390261142487719224625766384497675123546699130424350547812816372618666613580373687 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2464995905698815492080257517578025082211511420338333957400243519430891631612603411529895275168637335120254196446827673710691235939878718458194408287971984867359475791182172863632273025390261142487719224625766384497675123546699130424350547812816372618666613580373687 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-4594650433287343481724, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1951939593056416216087, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-735144069325974957075720, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6643523181122421984430, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1859219912222574184552261803842168549517388170837040929238074736709266287852125660133344654361699238633850283820378195230720, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1859219912222574184552261803842168549517388170837040929238074736709266287852125660133344654361699238633850283820378195230720 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3370341108608321263518825110743845980163044729350249719949547958058596941269921756915064179088752516523325009951795567398786745870671666142993633946633481055321827102779415353127108115981804556025886743013873983386275469388384851698899179429690824469037764674078015 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3370341108608321263518825110743845980163044729350249719949547958058596941269921756915064179088752516523325009951795567398786745870671666142993633946633481055321827102779415353127108115981804556025886743013873983386275469388384851698899179429690824469037764674078015 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-4909942519757819773359, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1636647506585939924452, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-785590803161251163737400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=704044896272058066359, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=196250990734605052813849857072228902449057640255020986975130111097089219273279930791853046849290475189128641069928809496576, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=196250990734605052813849857072228902449057640255020986975130111097089219273279930791853046849290475189128641069928809496576 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=10820963578124274489569824335364898086715439858362007077141486226269770864244212009433709964644459561450451344507044621514904573938673392037636816031185251844342251177318587508076317217357906850281343234697802865942499444684233793992260826534058595778416865775 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=10820963578124274489569824335364898086715439858362007077141486226269770864244212009433709964644459561450451344507044621514904573938673392037636816031185251844342251177318587508076317217357906850281343234697802865942499444684233793992260826534058595778416865775 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=441, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-5188049849674992547492, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1358540176668767150319, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-830087975947998807598720, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=714127659950256948648, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-5436825333555183234517, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1109764692788576463294, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-869892053368829317522640, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5417305789545589768337, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1508033928802754616359056796449758934608548183012266531493105064219738211257835257663712886315600493558567452432084536131584, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1508033928802754616359056796449758934608548183012266531493105064219738211257835257663712886315600493558567452432084536131584 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2349713881285313240563063445515056032024544871336657651186040530154498810736901508472199736791780648267829076900526271745125734225240786883212134275271974118245959237017815564452295127834143055468859347083633434314906701384747282141222217782387363484545341652174076 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2349713881285313240563063445515056032024544871336657651186040530154498810736901508472199736791780648267829076900526271745125734225240786883212134275271974118245959237017815564452295127834143055468859347083633434314906701384747282141222217782387363484545341652174076 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-5661870132847294774214, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=884719893496464923597, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-905899221255567163874200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13917393453233586160386, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3894032816155058153201126111380541906489196335586469057348634309663296614001396521501505192746447849805341983334903220011008, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3894032816155058153201126111380541906489196335586469057348634309663296614001396521501505192746447849805341983334903220011008 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=127739890277349941217073847882063538468186934530939793312517317558435135651143450629261216048725088924131729213875113941965202558428971947819056397037940893351226692317948116645749304298948492180049097399684615788299540586849090357791643331427137311019731107955888287 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=127739890277349941217073847882063538468186934530939793312517317558435135651143450629261216048725088924131729213875113941965202558428971947819056397037940893351226692317948116645749304298948492180049097399684615788299540586849090357791643331427137311019731107955888287 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-5867319938009376122652, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=679270088334383575159, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-938771190081500179624280, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10716928327584465572712, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2995409858580813964000866239523493774222458719681899274883564853587151241539535785770388609804959884465647679488387092316160, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2995409858580813964000866239523493774222458719681899274883564853587151241539535785770388609804959884465647679488387092316160 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=105778458786457081043780612795497558406816031522581720473319957079705218851735529447128878423280085019000547087296665931408318606906844215757878678748307056745775334300653727741690961274980320121989475731194876163148278527598340665203382974278854890882937647178792927 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=105778458786457081043780612795497558406816031522581720473319957079705218851735529447128878423280085019000547087296665931408318606906844215757878678748307056745775334300653727741690961274980320121989475731194876163148278527598340665203382974278854890882937647178792927 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-6056315437967196809320, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=490274588376562888491, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-969010470074751489491160, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10149152034617050868238, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2840474865895599448621511089203313061762676372112145864113725292194712384218525314092609888608151614579493489170022242713600, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2840474865895599448621511089203313061762676372112145864113725292194712384218525314092609888608151614579493489170022242713600 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=99703297489257808329017240030160681039101785066841099288922703247065512638217720440823224334885870007036929897251457268003476838068398548318388665996993630105038169864042532281617934941318581764132942542140029059818468566022851140441506798211220212962198387161324992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=99703297489257808329017240030160681039101785066841099288922703247065512638217720440823224334885870007036929897251457268003476838068398548318388665996993630105038169864042532281617934941318581764132942542140029059818468566022851140441506798211220212962198387161324992 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-6231297939873283406176, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=315292086470476291635, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-997007670379725344988160, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11823455429927090533644, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-6394202751806739583810, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=152387274537020114001, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1023072440289078333409560, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=594437370716049693447, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=165263992197562149737978827008192759957101170741070304821162198818601447809077836456297302609928821211897803006255839576064, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=165263992197562149737978827008192759957101170741070304821162198818601447809077836456297302609928821211897803006255839576064 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=7677692422356538138128414501066773000661572439030251759087409225436324342704994445731251665624319581555868238818666137002491715578489858744815859939677046872041980619377957368080779973185262499834222188566635706849137079834948832940162789099498990276157585372 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7677692422356538138128414501066773000661572439030251759087409225436324342704994445731251665624319581555868238818666137002491715578489858744815859939677046872041980619377957368080779973185262499834222188566635706849137079834948832940162789099498990276157585372 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=440, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-6546590026343759697812, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697810, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1047454404215001551649880, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5883977145076726615533, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1642310922463273863021164593393915552073692884239386154160299350759851887602710999784454444686167660793234417374667405787136, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1642310922463273863021164593393915552073692884239386154160299350759851887602710999784454444686167660793234417374667405787136 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2729796065331479329239046209421871667470854267480199694238183669290562587427779466795750692971111908478708287119599859008038990880142059291428850949598487367956051194073877708680956762867570003368247824191218527085247228257450157369426537297097534081664704400313247 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2729796065331479329239046209421871667470854267480199694238183669290562587427779466795750692971111908478708287119599859008038990880142059291428850949598487367956051194073877708680956762867570003368247824191218527085247228257450157369426537297097534081664704400313247 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-6689735867395049582579, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6403444185292469813043, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1070357738783207933212600, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12652146277154240215219, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3532517833222890950649297427300120244083037524590377765552341999747605946919038754253354843287228553404315539258718570938368, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3532517833222890950649297427300120244083037524590377765552341999747605946919038754253354843287228553404315539258718570938368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=121993739819488010621504856972494914760068900307617932251424948962893821366869510160938846041425545669265279581983505676788350788261440913757017951691121393656447049738356033862630722737837914961785551429383809209833422823326245850402221984433300740442300363173319047 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=121993739819488010621504856972494914760068900307617932251424948962893821366869510160938846041425545669265279581983505676788350788261440913757017951691121393656447049738356033862630722737837914961785551429383809209833422823326245850402221984433300740442300363173319047 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-6824697356260932471945, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6268482696426586923677, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1091951577001749195511200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5894059908754925497822, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-6952359973035255996424, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6140820079652263399198, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1112377595685640959427760, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=303793075005109162465, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=82631996098781074868989413504096379978550585370535152410581099409300723904538918228148651304964410605948901503127919788032, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=82631996098781074868989413504096379978550585370535152410581099409300723904538918228148651304964410605948901503127919788032 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=120081172701730746092896413144227018867976327457729029430899963621940730359508344543165148824051912340863044293334325245042446606830289981585040087213953849835475175942178721427253004097683481614914435020887570808601409085167552235519264353720751592683477775 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=120081172701730746092896413144227018867976327457729029430899963621940730359508344543165148824051912340863044293334325245042446606830289981585040087213953849835475175942178721427253004097683481614914435020887570808601409085167552235519264353720751592683477775 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=437, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-7073472840141123158970, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6019707212546396236652, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1131755654422579705435120, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10597238038350258317511, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2964422860043771060924995209459457631730502250167948592729596941308663470075333691434832865565598230488416841424714122395648, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2964422860043771060924995209459457631730502250167948592729596941308663470075333691434832865565598230488416841424714122395648 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=104606174738217088212724373898153549101930770523173494221954724361369897437024110391277924994095335592448264752966221544753165349207029445549572500623654076393904948138421690991410314097543996563279497800822799441152319963519672142142352419548340134251962176147208220 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=104606174738217088212724373898153549101930770523173494221954724361369897437024110391277924994095335592448264752966221544753165349207029445549572500623654076393904948138421690991410314097543996563279497800822799441152319963519672142142352419548340134251962176147208220 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-7188675358124839755470, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5904504694562679640152, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1150188057299974360875080, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7000587011097550458754, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 1334054840673750730269481487234902, -108, 111, 88, 'd') / result: (0, 159031729778498498233494935, -85, 88)

[2]libmpf._normalize. / x: (0, 1339331681388793535432985124952757, -108, 111, 88, 'd') / result: (0, 159660778211211387566683903, -85, 88)

[2]libmpf._normalize. / x: (0, 1344524089020581735847763222434568, -108, 111, 88, 'd') / result: (0, 80139880718027456751332475, -84, 87)

[2]libmpf._normalize. / x: (0, 1349634723046378865077652794442106, -108, 111, 88, 'd') / result: (0, 80444498243712119166711139, -84, 87)

[2]libmpf._normalize. / x: (0, 1354666119236680762605276273748079, -108, 111, 88, 'd') / result: (0, 10093049103294914682248803, -81, 84)

[2]libmpf._normalize. / x: (0, 1359620697210584563728870961324139, -108, 111, 88, 'd') / result: (0, 162079417373011656252011175, -85, 88)

[2]libmpf._normalize. / x: (0, 1364500767423018045471131657860044, -108, 111, 88, 'd') / result: (0, 10166322942249611358874527, -81, 84)

[2]libmpf._normalize. / x: (0, 1369308537634337403115755786238163, -108, 111, 88, 'd') / result: (0, 163234297947208571805448029, -85, 88)

[2]libmpf._normalize. / x: (0, 1374046118907639349151109811406411, -108, 111, 88, 'd') / result: (0, 163799061644987982410324789, -85, 88)

[2]libmpf._normalize. / x: (0, 29856708544943111239643, -73, 75, 73, 'd') / result: (0, 3732088568117888904955, -70, 72)

[2]libmpf._normalize. / x: (1, 29927514497050659072947, -73, 75, 73, 'd') / result: (1, 1870469656065666192059, -69, 71)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (0, 20111124560928029791677783, -85, 85, 83, 'd') / result: (0, 5027781140232007447919445, -83, 83)

[3]libmpf._normalize1 / x: (1, 33518540934880049652796305, -80, 85, 83, 'd') / result: (1, 2094908808430003103299769, -76, 81)

[2]libmpf._normalize. / x: (0, 4163917365336475305766446764, -91, 92, 77, 'd') / result: (0, 31768168375675013013965, -74, 75)

[2]libmpf._normalize. / x: (1, 138461585585848576977346659393056, -107, 107, 77, 'd') / result: (1, 128952400373153925852241, -77, 77)

[2]libmpf._normalize. / x: (1, 84595875988088368838235150550161, -107, 107, 77, 'd') / result: (1, 78786049027078197187031, -77, 77)

[3]libmpf._normalize1 / x: (1, 4096581567501811294700161481240768328659545565, -151, 152, 73, 'd') / result: (1, 3388612850379590557055, -71, 72)

[3]libmpf._normalize1 / x: (1, 2502888471146406710941214484125581380119887915, -151, 151, 73, 'd') / result: (1, 8281363274859182545671, -73, 73)

[2]libmpf._normalize1 / x: (0, 5749796091814413163903, -71, 73, 73, 'd') / result: (0, 5749796091814413163903, -71, 73)

[2]libmpf._normalize1 / x: (0, 8281363274859182545671, -73, 73, 73, 'd') / result: (0, 8281363274859182545671, -73, 73)

[3]libmpf._normalize1 / x: (0, 597543459249295197182702964146645615875934785, -146, 149, 63, 'd') / result: (0, 965383524704857679, -57, 60)

[3]libmpf._normalize1 / x: (0, 27427457810058279607259580789365150782652141, -142, 145, 63, 'd') / result: (0, 5671865338024082675, -60, 63)

[3]libmpf._normalize1 / x: (1, 116945334152963814004473089741049461418070021, -143, 147, 63, 'd') / result: (1, 6045932071241694719, -59, 63)

[3]libmpf._normalize1 / x: (0, 423356064720582991, -59, 59, 53, 'n') / result: (0, 6614938511259109, -53, 53)

[3]libmpf._normalize1 / x: (1, 451276935665142785, -58, 59, 53, 'n') / result: (1, 440700132485491, -48, 49)

[7]gammazeta.mpc_zeta / s: ((0, 1, -2, 1), (0, 5, 3, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 6614938511259109, -53, 53), (1, 440700132485491, -48, 49))

zeta_ / result: (0.734405704167952 - 1.5656813889304j) / count: 977
zeta / count: 0 / s: Complex { re: 0.25, im: 40.0 }
gamma_ / s: (0.75, -40.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.75-40j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.75-40j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.75, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -53, 53, 53, 'd') / result: (0, 3, -2, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -53, 53, 53, 'd') / result: (0, 3, -2, 2)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-40.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -47, 53, 53, 'd') / result: (1, 5, 3, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -47, 53, 53, 'd') / result: (1, 5, 3, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, -2, 2), (1, 5, 3, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.75', imag='-40.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, -2, 2), (1, 5, 3, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3, -2, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, -2, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -2, 2), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=750000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=750000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 3, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, 3, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 3, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 3, 3), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.75-40j) / result: (0.75 - 40.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.75-40j) / result: (0.75 - 40.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 3, -2, 2), (1, 5, 3, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 3, -2, 2), (1, 5, 3, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 3, -2, 2), (1, 5, 3, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 3, -2, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5, 3, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=240 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -2, 2), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 5, 3, 3), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1813388729421943762059264, y=-96714065569170333976494080, prec=81 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=81, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 3, -2, 2), (1, 5, 3, 3)), prec=81, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 3, -2, 2), b=(1, 5, 3, 3), prec=81, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3, -2, 2), t=(0, 3, -2, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, 3, 3), t=(1, 5, 3, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, -4, 4), t=(0, 25, 6, 5), prec=101, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=25609 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25609, exp=-4, bc=15, prec=101, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25609, -4, 15, 101, 'd') / result: (0, 25609, -4, 15)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25609, -4, 15, 101, 'd') / result: (0, 25609, -4, 15)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 25609, -4, 15), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=25593 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25593, exp=-4, bc=15, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 25593, -4, 15, 10, 'd') / result: (0, 799, 1, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 25593, -4, 15, 10, 'd') / result: (0, 799, 1, 10)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 25609, -4, 15), prec=81, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=25609, n=86 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=1981400404128706466243229515776, prec=101 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=18705732176896668984622532573391, exp=-101, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18705732176896668984622532573391 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=18705732176896668984622532573391, exp=-101, bc=104, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 18705732176896668984622532573391, -101, 104, 81, 'd') / result: (0, 557474260833760171670393, -76, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 18705732176896668984622532573391, -101, 104, 81, 'd') / result: (0, 557474260833760171670393, -76, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 557474260833760171670393, -76, 79), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 3, -2, 2), (1, 5, 3, 3)), prec=81, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 5, 3, 3), x=(0, 3, -2, 2), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, 3, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5, 3, 3), x=(0, 3, -2, 2), prec=81, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5, 3, 3), t=(0, 3, -2, 2), prec=85, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2063233398808967124831873707 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2063233398808967124831873707, exp=-85, bc=91, prec=85, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2063233398808967124831873707, -85, 91, 85, 'd') / result: (0, 16119010928195055662749013, -78, 84)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2063233398808967124831873707, -85, 91, 85, 'd') / result: (0, 16119010928195055662749013, -78, 84)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 16119010928195055662749013, -78, 84), prec=85, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 16119010928195055662749013, -78, 84), prec=121, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=204169420152563078078024768681185577533 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=204169420152563078078024768681185577533, exp=-133, bc=128, prec=121, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 204169420152563078078024768681185577533, -133, 128, 121, 'd') / result: (0, 398768398735474761871142126330440581, -124, 119)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 204169420152563078078024768681185577533, -133, 128, 121, 'd') / result: (0, 398768398735474761871142126330440581, -124, 119)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 398768398735474761871142126330440581, -124, 119), prec=121 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=49846049841934345233892765791305072, prec=121 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=2, prec=121 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=5575186299632655785383929568162090376495104, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=1329119838776543333605051485592223744, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=1329119838776543333605051485592223744, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=30986998537042903075871030064036142491956469513950682153967912278487771464202094335555744239361653977230838063672969920512, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=30986998537042903075871030064036142491956469513950682153967912278487771464202094335555744239361653977230838063672969920512 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=16891139628563275610607505878559393308687008204201577160831661849766742873585357798496436296548995546274570192384073302136873581841969249367942053716476363552824851946163761770613689948251847223781526980558258162507130766825012611163181366327727872362511516 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=16891139628563275610607505878559393308687008204201577160831661849766742873585357798496436296548995546274570192384073302136873581841969249367942053716476363552824851946163761770613689948251847223781526980558258162507130766825012611163181366327727872362511516 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=436, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=5575186299632655785383929568162090376495104, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=6276590978355562654495739995582376278076606877684463566848, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=6276590978355562654495739995582376278076606877684463566848, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=5575186299632655785383929568162090376495104, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=6276590978355562654495739995581924089204578495522598220903, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=121, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4126052696763960811541481630963537421, exp=-121, prec=85, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4126052696763960811541481630963537421 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4126052696763960811541481630963537421, exp=-121, bc=122, prec=85, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4126052696763960811541481630963537421, -121, 122, 85, 'd') / result: (0, 30020984535541798770584003, -84, 85)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4126052696763960811541481630963537421, -121, 122, 85, 'd') / result: (0, 30020984535541798770584003, -84, 85)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 30020984535541798770584003, -84, 85), prec=81, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=30020984535541798770584003, exp=-84, bc=85, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 30020984535541798770584003, -84, 85, 81, 'd') / result: (0, 469077883367840605790375, -78, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 30020984535541798770584003, -84, 85, 81, 'd') / result: (0, 469077883367840605790375, -78, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 469077883367840605790375, -78, 79), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 557474260833760171670393, -77, 79), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 469077883367840605790375, -78, 79), prec=81 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-147466462904901062055077021, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=147466462904901062055077021 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-261002581605782907919550580, exp=-81, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=261002581605782907919550580 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 147466462904901062055077021, -81, 87), (1, 65250645401445726979887645, -79, 86)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 147466462904901062055077021, -81, 87), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=14762898995269938697, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2375992388029902353424, exp=-159, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2375992388029902353424 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2375992388029902353424, exp=-159, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2375992388029902353424, -159, 72, 57, 'n') / result: (0, 18127383331526965, -142, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2375992388029902353424, -159, 72, 57, 'n') / result: (0, 18127383331526965, -142, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 65250645401445726979887645, -79, 86), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=65250645401445726979887645, exp=-79, mag=7, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=93, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=175476057504760603261889235, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=65463837335043267417535252, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=65463837335043267417535252 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=65463837335043267417535252, exp=-87, bc=86, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 65463837335043267417535252, -87, 86, 57, 'n') / result: (0, 121935899062162763, -58, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 65463837335043267417535252, -87, 86, 57, 'n') / result: (0, 121935899062162763, -58, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-140213154972707566585005617, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=140213154972707566585005617 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=140213154972707566585005617, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 140213154972707566585005617, -87, 87, 57, 'n') / result: (1, 130583676484141095, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 140213154972707566585005617, -87, 87, 57, 'n') / result: (1, 130583676484141095, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 18127383331526965, -142, 55), t=(0, 121935899062162763, -58, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2210378784174203753864396153404295, exp=-200, bc=111, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2210378784174203753864396153404295, -200, 111, 53, 'n') / result: (0, 7668791935416127, -142, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2210378784174203753864396153404295, -200, 111, 53, 'n') / result: (0, 7668791935416127, -142, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 18127383331526965, -142, 55), t=(1, 130583676484141095, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=2367140360468128998433552857126675, exp=-199, bc=111, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 2367140360468128998433552857126675, -199, 111, 53, 'n') / result: (1, 4106333954236265, -140, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 2367140360468128998433552857126675, -199, 111, 53, 'n') / result: (1, 4106333954236265, -140, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 7668791935416127, -142, 53), (1, 4106333954236265, -140, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (1.37552209437762e-27 - 2.94615012560698e-27j) / count: 151
gamma__ / s: Complex { re: 0.75, im: -40.0 } / result: Complex { re: 1.3755220943776205e-27, im: -2.9461501256069795e-27 }
zeta__ / s: Complex { re: 0.25, im: 40.0 } / result: Complex { re: 0.7344057041679518, im: -1.5656813889303969 } / z: Complex { re: -0.0, im: 0.0 }
zeta_ / s: (1.0, 50.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(1+50j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(1+50j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(1+50j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=1.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -52, 53, 53, 'd') / result: (0, 1, 0, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=50.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7036874417766400, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7036874417766400, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7036874417766400, -47, 53, 53, 'd') / result: (0, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7036874417766400, -47, 53, 53, 'd') / result: (0, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 0, 1), (0, 25, 1, 5)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.0', imag='50.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 0, 1), (0, 25, 1, 5)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 0, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 0, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=100000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=100000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 25, 1, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 1, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 1, 5), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1+50j) / result: (1.0 + 50.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1+50j) / result: (1.0 + 50.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 0, 1), (0, 25, 1, 5)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, 0, 1), (0, 25, 1, 5)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, 0, 1), y=(0, 25, 1, 5), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 25, 1, 5), t=(0, 25, 1, 5), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 625, 2, 10), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2501 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2501, exp=0, bc=12, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 2501, 0, 12, 14, 'd') / result: (0, 2501, 0, 12)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 2501, 0, 12, 14, 'd') / result: (0, 2501, 0, 12)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 2501, 0, 12), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=10244096 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=10244096 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=10244096 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3200, exp=-6, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3200, exp=-6, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3200, -6, 12, 10, 'd') / result: (0, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3200, -6, 12, 10, 'd') / result: (0, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 25, 1, 5), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 25, 1, 5), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 25, 1, 5), t=(0, 53, 0, 6), prec=5, rnd='f' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 711 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 25, 1, 5), t=(0, 53, 0, 6), prec=5, rnd='f', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3, exp=0, bc=2, prec=5, rnd='f' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 3, 0, 2, 5, 'f') / result: (1, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 3, 0, 2, 5, 'f') / result: (1, 3, 0, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, 0, 1), (0, 25, 1, 5)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, 0, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=0, bc=0, prec=73, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, 0, 0, 73, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, 0, 0, 73, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 25, 1, 5), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 25, 1, 5), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 25, 1, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=25, exp=1, bc=5, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 25, 1, 5, 73, 'd') / result: (1, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 25, 1, 5, 73, 'd') / result: (1, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 0, 0, 0), (1, 25, 1, 5)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 0, 0, 0), y=(1, 25, 1, 5), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(1, 25, 1, 5), prec=10, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1490 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=1, bc=5, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 780 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 1, 5, 10, 'd') / result: (0, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 1, 5, 10, 'd') / result: (0, 25, 1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, 0, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, 0, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 25, 1, 5), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=78 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 78 / result: [1, 12169, 24684817, 20025978129, 8699158611729, 2349364795086609, 432109761504216849, 57557184031763990289, 5803387571048726202129, 457958929137612288493329, 29029429624127939282536209, 1509303720869341071164376849, 65472170378080978066899273489, 2403560957724770970403301033745, 75577080413574883693524022789905, 2056476770326427590423339239802641, 48855231944517572786915223741728529, 1021201560483505074409570135959996177, 18909287191859481493150158124229396241, 312039794266470076576921955599141898001, 4613542081415178885972886050339973302033, 61407360897102196011656184341877454604049, 738970827233089167766901115122312987346705, 8071058578888213886277764134195625032484625, 80286922870455975963100182699713795973515025, 729699135960995132729039580999916384615466769, 6076820208753232322450401836385747352030873361, 46492237066419785393048762531181797487296448273, 327563090667464449929482816454081600700734310161, 2129953319446093272728152490732809921367667967761, 12807842550504116908811118707956959735217083975441, 71352715923116273999719735175529664796026573752081, 368897742002374290643295967480465148949327184987921, 1772699916325027497371963319893494099826437761074961, 7928970206704002710374328047991017901082949901158161, 33053690696134718941989775981791926632008077707642641, 128578743010801268370330512687847181345282878968760081, 467248828521814551349149799876734674545697353932277521, 1587830900931939203450997476435053643275489809688758033, 5050701907247609124032131821576978395127795500471355153, 15051385705866850799735749553781157282913916302396032785, 42057146713399931000792673318432490094014768862366074641, 110276518897087912713502733752029632014426159465663891217, 271539275577543223793616255543077321807135985679752300305, 628356294669355262677775484793383991750775543682189297425, 1367470899010347191412603191624980529541645399659272275729, 2800851777663040090951382772145501478845582688436615710481, 5403302167273603085858670521175667174035709964514629322513, 9826326404002081860098030182356321590203141190305112983313, 16861475410875067244749736270832178393532781431621346199313, 27330345629991513778758719512794433184103716788699199506193, 41898557963640647685917793843678813370244750498567973046033, 60845937933058098544257993953637848541390837284032102336273, 83861982603904813333544562281279012558811780081828600809233, 109953206659641397250094756560623011228612260408164195305233, 137528518689190520802265237120076485052107813927373924534033, 164669084808363869884018615508547584288296005116325842716433, 189513173899909602873619286053249587253140839031876302210833, 210632512003217594785318806591249640747993943724705553385233, 227275884345966468608242954313503775328900924679216798697233, 239411093928088406580531905719954058890273717795349227702033, 247579055072104364830949398009243451754777177516382408476433, 252640920318186113938144922341682695221554433042425263490833, 255520559213734842319127265073025909282654382852796309899025, 257019190184228336542989877001370126246046704173892462249745, 257729811142926265348485135800069781183011268225493929363217, 258035396237124611323367320881444441957431144369821277816593, 258153912911521366310371341938702979454501629383264810108689, 258195096810358582912609122676464933116337669382489741264657, 258207818378601963054208014007710559340029749864636869052177, 258211277912987572905664403161099657694386301247551699486481, 258212096230580732842558692394465493765020235287581898114833, 258212262024141273987504446798195207638693738240913579771665, 258212290217661252642289742776155858084854560660941640894225, 258212294131268089171865565255170436332115347740758001649425, 258212294557124546730699050725817570752577908554096408332049, 258212294591190094660204901166916740271398458469279804753681, 258212294592971299780701939098477481161271428399485472540433, 258212294593016971706868529814671346312293812243849720432401]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 78 / result: [1, 12169, 24684817, 20025978129, 8699158611729, 2349364795086609, 432109761504216849, 57557184031763990289, 5803387571048726202129, 457958929137612288493329, 29029429624127939282536209, 1509303720869341071164376849, 65472170378080978066899273489, 2403560957724770970403301033745, 75577080413574883693524022789905, 2056476770326427590423339239802641, 48855231944517572786915223741728529, 1021201560483505074409570135959996177, 18909287191859481493150158124229396241, 312039794266470076576921955599141898001, 4613542081415178885972886050339973302033, 61407360897102196011656184341877454604049, 738970827233089167766901115122312987346705, 8071058578888213886277764134195625032484625, 80286922870455975963100182699713795973515025, 729699135960995132729039580999916384615466769, 6076820208753232322450401836385747352030873361, 46492237066419785393048762531181797487296448273, 327563090667464449929482816454081600700734310161, 2129953319446093272728152490732809921367667967761, 12807842550504116908811118707956959735217083975441, 71352715923116273999719735175529664796026573752081, 368897742002374290643295967480465148949327184987921, 1772699916325027497371963319893494099826437761074961, 7928970206704002710374328047991017901082949901158161, 33053690696134718941989775981791926632008077707642641, 128578743010801268370330512687847181345282878968760081, 467248828521814551349149799876734674545697353932277521, 1587830900931939203450997476435053643275489809688758033, 5050701907247609124032131821576978395127795500471355153, 15051385705866850799735749553781157282913916302396032785, 42057146713399931000792673318432490094014768862366074641, 110276518897087912713502733752029632014426159465663891217, 271539275577543223793616255543077321807135985679752300305, 628356294669355262677775484793383991750775543682189297425, 1367470899010347191412603191624980529541645399659272275729, 2800851777663040090951382772145501478845582688436615710481, 5403302167273603085858670521175667174035709964514629322513, 9826326404002081860098030182356321590203141190305112983313, 16861475410875067244749736270832178393532781431621346199313, 27330345629991513778758719512794433184103716788699199506193, 41898557963640647685917793843678813370244750498567973046033, 60845937933058098544257993953637848541390837284032102336273, 83861982603904813333544562281279012558811780081828600809233, 109953206659641397250094756560623011228612260408164195305233, 137528518689190520802265237120076485052107813927373924534033, 164669084808363869884018615508547584288296005116325842716433, 189513173899909602873619286053249587253140839031876302210833, 210632512003217594785318806591249640747993943724705553385233, 227275884345966468608242954313503775328900924679216798697233, 239411093928088406580531905719954058890273717795349227702033, 247579055072104364830949398009243451754777177516382408476433, 252640920318186113938144922341682695221554433042425263490833, 255520559213734842319127265073025909282654382852796309899025, 257019190184228336542989877001370126246046704173892462249745, 257729811142926265348485135800069781183011268225493929363217, 258035396237124611323367320881444441957431144369821277816593, 258153912911521366310371341938702979454501629383264810108689, 258195096810358582912609122676464933116337669382489741264657, 258207818378601963054208014007710559340029749864636869052177, 258211277912987572905664403161099657694386301247551699486481, 258212096230580732842558692394465493765020235287581898114833, 258212262024141273987504446798195207638693738240913579771665, 258212290217661252642289742776155858084854560660941640894225, 258212294131268089171865565255170436332115347740758001649425, 258212294557124546730699050725817570752577908554096408332049, 258212294591190094660204901166916740271398458469279804753681, 258212294592971299780701939098477481161271428399485472540433, 258212294593016971706868529814671346312293812243849720432401]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 0, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 1, 5), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-6546590026343759697811, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-327329501317187984890550, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13892791236076809477119, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3883703816642710518842502434692529858991877512415152163297311672237134023513329156722986611333327298479598370647012230037504, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3883703816642710518842502434692529858991877512415152163297311672237134023513329156722986611333327298479598370647012230037504 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=127639704725696134072074264582703777429425561139313195056509084410587858860248275968408389313641222491285556779240334682756008596727176744975154560176517248966615800476744404029091681471183779186329916018039817071738370767325459512772968410208812064247652955014763760 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=127639704725696134072074264582703777429425561139313195056509084410587858860248275968408389313641222491285556779240334682756008596727176744975154560176517248966615800476744404029091681471183779186329916018039817071738370767325459512772968410208812064247652955014763760 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-10376099699349985094984, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2717080353337534300638, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-518804984967499254749200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=446329787468910592905, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-13093180052687519395623, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697810, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-654659002634375969781150, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12949830622011671372985, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-15200711307876973240254, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4439058771154305853179, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-760035565393848662012700, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11423530813532612209856, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-16922689725693744792795, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2717080353337534300638, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-846134486284687239639750, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14339121023545720070024, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4007651810790882131145986554948674428959703390470954891913183321351085109370137534065209588290773914388521722901704109719552, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4007651810790882131145986554948674428959703390470954891913183321351085109370137534065209588290773914388521722901704109719552 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128585961762639639178533948869796845548392477695087378572914211698137004665938730903710768937797264405471586841690456270613003495559621546049791723529223989055702877072079097806868998595912198566336317567464246534200588680865529282807922013158294840992682831458862727 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128585961762639639178533948869796845548392477695087378572914211698137004665938730903710768937797264405471586841690456270613003495559621546049791723529223989055702877072079097806868998595912198566336317567464246534200588680865529282807922013158294840992682831458862727 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-18378601733149373926893, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1261168345881905166540, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-918930086657468696344650, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=886528051332053689936, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=247895988296343224606968240512289139935651756111605457231743298227902171713616754684445953914893231817846704509383759364096, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=247895988296343224606968240512289139935651756111605457231743298227902171713616754684445953914893231817846704509383759364096 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=17246702383335606251482879396313995097189390389628902377464841979748723333788581861602242251588426260595798721165701937597212488836172612895061948594289273511784367242297426223757642414934185716421368919646366778756686407219926274814140521500069718643782621007 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=17246702383335606251482879396313995097189390389628902377464841979748723333788581861602242251588426260595798721165701937597212488836172612895061948594289273511784367242297426223757642414934185716421368919646366778756686407219926274814140521500069718643782621007 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=441, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-19639770079031279093435, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697809, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-981988503951563954671750, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12006870007946533268851, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3356924841512981166552694923603915436628617530677990566679857163502841908621893553018538959264179180866674123564571741388800, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3356924841512981166552694923603915436628617530677990566679857163502841908621893553018538959264179180866674123564571741388800 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=117621910333391098270299074369221384336895507619091677275580982975117504806972039035966609800478361067300468420845874743256102125132271957119274498273368683123025931390314172135717792297736260718571183181330123890824337692842878562767184678835809498930317596174901660 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=117621910333391098270299074369221384336895507619091677275580982975117504806972039035966609800478361067300468420845874743256102125132271957119274498273368683123025931390314172135717792297736260718571183181330123890824337692842878562767184678835809498930317596174901660 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-20752199398699970189968, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5434160706675068601276, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1037609969934998509498400, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=892659574937821185810, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-21747301334220732938066, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4439058771154305853178, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1087365066711036646903300, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10480570199467474105722, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-22647480531389179096855, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3538879573985859694389, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1132374026569458954842750, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9978865891471008909881, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2788829868333861276828392705763252824276082256255561393857112105063899431778188490200016981542548857950775425730567292846080, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2788829868333861276828392705763252824276082256255561393857112105063899431778188490200016981542548857950775425730567292846080 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=97566583747970360905697999061729824033013786081296983987276199456216330200262707500304867076703152323039071318501833300615469795754111027597970263373289074482708181478603997551154964552830410822815812055899720464498687782745560454084853012218212302552314165283976935 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=97566583747970360905697999061729824033013786081296983987276199456216330200262707500304867076703152323039071318501833300615469795754111027597970263373289074482708181478603997551154964552830410822815812055899720464498687782745560454084853012218212302552314165283976935 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-23469279752037504490607, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2717080353337534300637, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1173463987601875224530350, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13396160409480581965890, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-24225261751868787237279, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1961098353506251553965, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1211263087593439361863950, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5268564118200339794696, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1466717930753364078924562089697710744619272890326998955287814514515087849305565798549638560663118288255593001680520576237568, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1466717930753364078924562089697710744619272890326998955287814514515087849305565798549638560663118288255593001680520576237568 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2236073181814870558024382605134965785943237573232649559843398047994830413232370939044728986337937687437411555330209882962841579632549092494064462672743527137889830179947885250249773905808190558870220431074194403046671578454133908254362493135526064712873668750968576 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2236073181814870558024382605134965785943237573232649559843398047994830413232370939044728986337937687437411555330209882962841579632549092494064462672743527137889830179947885250249773905808190558870220431074194403046671578454133908254362493135526064712873668750968576 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-24925191759493133624704, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1261168345881905166540, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1246259587974656681235200, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14779319287408863167055, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-25576811007226958335239, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=609549098148080456005, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1278840550361347916761950, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11869860601001522802711, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3315608843463590629118200216851867246639342237992722990474566613798191546669624093904464633611696975563699672813007781494784, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3315608843463590629118200216851867246639342237992722990474566613798191546669624093904464633611696975563699672813007781494784 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=116454035066204927635563955407649652218324268303629100279619700885633805329808556946554010953231137604781845900121414512265147004906941323529286715147812408944782576591958171892514577901019810908548746062321023375575757987752448799030075545358758714895063170375424316 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=116454035066204927635563955407649652218324268303629100279619700885633805329808556946554010953231137604781845900121414512265147004906941323529286715147812408944782576591958171892514577901019810908548746062321023375575757987752448799030075545358758714895063170375424316 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-26186360105375038791247, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697808, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1309318005268751939562350, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11063909393881395164717, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-26758943469580198330315, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5974006662138600158740, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1337947173479009916515750, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12106244883907313373723, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-27298789425043729887780, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5434160706675068601275, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1364939471252186494389000, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14785450811014630662879, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-27809439892141023985694, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4923510239577774503361, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1390471994607051199284700, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4088679306291873348382, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1136189946358239779448604435681325224705070548844858345645490116877884953687410125637043955443260645831797395668008897085440, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1136189946358239779448604435681325224705070548844858345645490116877884953687410125637043955443260645831797395668008897085440 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=87435352603021505874049389481895737501588992871041067858076406753177887979874849560714310887221447170618664798926702177266610300206817902360999829445090249378416250607919056307561016518478241297142561338693380324713793113706661141277987468284781229569010267395911 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=87435352603021505874049389481895737501588992871041067858076406753177887979874849560714310887221447170618664798926702177266610300206817902360999829445090249378416250607919056307561016518478241297142561338693380324713793113706661141277987468284781229569010267395911 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-28293891360564492635878, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4439058771154305853177, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1414694568028224631793900, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9537609585402336001588, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2664881874185689664524908585507108254308256378199758665241240455949948345921380112857794004585102242041852073475875413164032, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2664881874185689664524908585507108254308256378199758665241240455949948345921380112857794004585102242041852073475875413164032 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=92238937456528038556476385330924934194160525388450375935851700086795493953899719787294438849109205048569688387078873173347273784774233864026802055700044212042778698868844140060080780629497504271069520981498606792012694149132575114514273130789100283735136476151633791 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=92238937456528038556476385330924934194160525388450375935851700086795493953899719787294438849109205048569688387078873173347273784774233864026802055700044212042778698868844140060080780629497504271069520981498606792012694149132575114514273130789100283735136476151633791 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-28754701432499359021877, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3978248699219439467178, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1437735071624967951093850, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1332857838800964282841, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=371843982444514836910452360768433709903477634167408185847614947341853257570425132026668930872339847726770056764075639046144, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=371843982444514836910452360768433709903477634167408185847614947341853257570425132026668930872339847726770056764075639046144 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=618609548779102830397947016513883224188892252749636703983171586690312983947688127256795370591460285922354236164742790972942446235978123002825350656199699118586726461929525490427432553646116009416609750593284064676123555764453475968009774637829754671902231760732 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=618609548779102830397947016513883224188892252749636703983171586690312983947688127256795370591460285922354236164742790972942446235978123002825350656199699118586726461929525490427432553646116009416609750593284064676123555764453475968009774637829754671902231760732 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-29194070557732938794666, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3538879573985859694389, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1459703527886646939733300, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9035905277405870805797, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2520275881012822783504177111874939589345792853801322148522723531983672079088437005958533864801414523481441495845401553534976, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2520275881012822783504177111874939589345792853801322148522723531983672079088437005958533864801414523481441495845401553534976 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5357420482066937733272467823576923305377601012415964755183450745096336422356812244168484986551563634322374245148537240836454769938693280018311850067721909172965304893882552203373939483739943253381321367538703873552539638369999905994456710375024137893316051615084887 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5357420482066937733272467823576923305377601012415964755183450745096336422356812244168484986551563634322374245148537240836454769938693280018311850067721909172965304893882552203373939483739943253381321367538703873552539638369999905994456710375024137893316051615084887 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-29613905585070909048161, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3119044546647889440894, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1480695279253545452408050, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2879905760649305712250, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=805661961963115479972646781664939704790868207362717736003165719240682058069254452724449350223403003408001789655497217933312, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=805661961963115479972646781664939704790868207362717736003165719240682058069254452724449350223403003408001789655497217933312 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=45342397079933526679894068620837852596430270173956918066204950452459823722820060192036880507396866597344968040975187592234020838195936669534346732494016104840221953523576808560389809387882344434389193323804271521298320881313875693034028880013591786809517464377072 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=45342397079933526679894068620837852596430270173956918066204950452459823722820060192036880507396866597344968040975187592234020838195936669534346732494016104840221953523576808560389809387882344434389193323804271521298320881313875693034028880013591786809517464377072 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-30015869778381264188419, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2717080353337534300636, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-1500793488919063209420950, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12453199795415443861756, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-30401422615753946480509, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2331527515964852008546, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 1378715531174565549704221994504981, -108, 111, 88, 'd') / result: (0, 164355698963947957718875645, -85, 88)

[2]libmpf._normalize. / x: (0, 1383318708406327960511159210263844, -108, 111, 88, 'd') / result: (0, 41226110112855671659444547, -83, 86)

[2]libmpf._normalize. / x: (0, 1387857503423087327595539853680995, -108, 111, 88, 'd') / result: (0, 82722753490393598532410851, -84, 87)

[2]libmpf._normalize. / x: (0, 1392333692371617713722231363803599, -108, 111, 88, 'd') / result: (0, 165979110285236562934187813, -85, 88)

[2]libmpf._normalize. / x: (0, 1396748978898338793244841679077465, -108, 111, 88, 'd') / result: (0, 83252726727625059678843121, -84, 87)

[2]libmpf._normalize. / x: (0, 1401104998042252743662150253809981, -108, 111, 88, 'd') / result: (0, 83512365701332851866611853, -84, 87)

[2]libmpf._normalize. / x: (0, 1405403319870047345200631595525534, -108, 111, 88, 'd') / result: (0, 167537131294017713689879369, -85, 88)

[2]libmpf._normalize. / x: (0, 1409645452873589646145288533328442, -108, 111, 88, 'd') / result: (0, 84021416477774956592636617, -84, 87)

[2]libmpf._normalize. / x: (0, 1413832847148207622913011704928396, -108, 111, 88, 'd') / result: (0, 42135502313024032798797241, -83, 86)

[2]libmpf._normalize. / x: (0, 8575322782081393459091, -73, 73, 73, 'd') / result: (0, 8575322782081393459091, -73, 73)

[2]libmpf._normalize. / x: (0, 4890506824440877808423, -73, 73, 73, 'd') / result: (0, 4890506824440877808423, -73, 73)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (1, 167592704674400248263981525, -82, 88, 83, 'd') / result: (1, 2618636010537503879124711, -76, 82)

[2]libmpf._normalize. / x: (1, 10090703041811601280503961042783, -103, 103, 73, 'd') / result: (1, 9397699536580221057407, -73, 73)

[2]libmpf._normalize. / x: (0, 1010814995213998066708267760123, -103, 100, 73, 'd') / result: (0, 1882789647605266546287, -74, 71)

[3]libmpf._normalize1 / x: (0, 18842432502319511484799, -73, 74, 73, 'd') / result: (0, 9421216251159755742399, -72, 73)

[2]libmpf._normalize1 / x: (1, 1882789647605266546287, -74, 71, 73, 'd') / result: (1, 1882789647605266546287, -74, 71)

[3]libmpf._normalize1 / x: (0, 1423693947274996472487184830565871483453889585, -148, 150, 63, 'd') / result: (0, 9200406495273198967, -61, 63)

[3]libmpf._normalize1 / x: (0, 313952085793342659398989608229762250514821835, -147, 148, 63, 'd') / result: (0, 1014433900932960463, -59, 60)

[3]libmpf._normalize1 / x: (0, 200443618442296794903180528877348803634152225, -147, 148, 63, 'd') / result: (0, 2590673048210069027, -61, 62)

[3]libmpf._normalize1 / x: (0, 508483037130455687, -60, 59, 53, 'n') / result: (0, 3972523727581685, -53, 52)

[3]libmpf._normalize1 / x: (0, 324642467723711963, -60, 59, 53, 'n') / result: (0, 5072538558182999, -54, 53)

[7]gammazeta.mpc_zeta / s: ((0, 1, 0, 1), (0, 25, 1, 5)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 3972523727581685, -53, 52), (0, 5072538558182999, -54, 53))

zeta_ / result: (0.441038730823094 + 0.281582455029683j) / count: 1009
zeta / count: 0 / s: Complex { re: 1.0, im: 50.0 }
gamma_ / s: (0.0, -50.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=-50j, kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=-50j, strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-50.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7036874417766400, exp=-47, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7036874417766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7036874417766400, exp=-47, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7036874417766400, -47, 53, 53, 'd') / result: (1, 25, 1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7036874417766400, -47, 53, 53, 'd') / result: (1, 25, 1, 5)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 0, 0, 0), (1, 25, 1, 5)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.0', imag='-50.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 0, 0, 0), (1, 25, 1, 5)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 25, 1, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 25, 1, 5), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 25, 1, 5), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 25, 1, 5), prec=63 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=461168601842738790400, xbits=63, base=10, bdigits=19 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: -50j / result: (0.0 - 50.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: -50j / result: (0.0 - 50.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 0, 0, 0), (1, 25, 1, 5)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 0, 0, 0), (1, 25, 1, 5)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 0, 0, 0), (1, 25, 1, 5)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 0, 0, 0), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 25, 1, 5), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=300 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 25, 1, 5), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=0, y=-241785163922925834941235200, prec=82 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=82, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 0, 0, 0), (1, 25, 1, 5)), prec=82, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 0, 0, 0), b=(1, 25, 1, 5), prec=82, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_abs / f_locals: s=(1, 25, 1, 5), prec=None, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 760 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 25, 1, 5), prec=82, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 760 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=25, n=97 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=3961408125713216879677197516800, prec=102 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=102, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=19836313243750525109063577989374, exp=-102, prec=82, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=19836313243750525109063577989374 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=19836313243750525109063577989374, exp=-102, bc=104, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 19836313243750525109063577989374, -102, 104, 82, 'd') / result: (0, 2364672809094253195412585, -79, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 19836313243750525109063577989374, -102, 104, 82, 'd') / result: (0, 2364672809094253195412585, -79, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 0, 0, 0), (1, 25, 1, 5)), prec=82, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 25, 1, 5), x=(0, 0, 0, 0), prec=82, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 25, 1, 5), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 25, 1, 5), x=(0, 0, 0, 0), prec=82, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: f / f_locals: prec=82, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 905 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=102, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=15929767251982789454753404455808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=15929767251982789454753404455808, exp=-102, bc=104, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 15929767251982789454753404455808, -102, 104, 82, 'd') / result: (0, 3797952473636338580787993, -80, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 15929767251982789454753404455808, -102, 104, 82, 'd') / result: (0, 3797952473636338580787993, -80, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 3797952473636338580787993, -80, 82), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 905 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 3797952473636338580787993, -81, 82), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 2364672809094253195412585, -79, 81), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 3797952473636338580787993, -81, 82), prec=82 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-384810224522291174375437430, exp=-82, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=384810224522291174375437430 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-700277947628202649422931010, exp=-82, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=700277947628202649422931010 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 192405112261145587187718715, -81, 88), (1, 350138973814101324711465505, -81, 89)), prec=53, rnd='n' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2214 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 192405112261145587187718715, -81, 88), prec=57, rnd='n' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=78, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=318845814858103824081, prec=71 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2702559594807206989632, exp=-186, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2702559594807206989632 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2702559594807206989632, exp=-186, bc=72, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2702559594807206989632, -186, 72, 57, 'n') / result: (0, 20618893392999321, -169, 55)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2702559594807206989632, -186, 72, 57, 'n') / result: (0, 20618893392999321, -169, 55)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 350138973814101324711465505, -81, 89), prec=57, rnd='n', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=350138973814101324711465505, exp=-81, mag=8, wp=67 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=94, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=46550159331723217854086358, prec=87 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=147793459659196548337262097, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=147793459659196548337262097 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=147793459659196548337262097, exp=-87, bc=87, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 147793459659196548337262097, -87, 87, 57, 'n') / result: (0, 137643385361131791, -57, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 147793459659196548337262097, -87, 87, 57, 'n') / result: (0, 137643385361131791, -57, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-45851238892694665094495265, exp=-87, prec=57, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=45851238892694665094495265 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=45851238892694665094495265, exp=-87, bc=86, prec=57, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 45851238892694665094495265, -87, 86, 57, 'n') / result: (1, 85404587709707515, -58, 57)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 45851238892694665094495265, -87, 86, 57, 'n') / result: (1, 85404587709707515, -58, 57)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 20618893392999321, -169, 55), t=(0, 137643385361131791, -57, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2838054289012699744593496654513911, exp=-226, bc=112, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2838054289012699744593496654513911, -226, 112, 53, 'n') / result: (0, 1230809850311749, -165, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2838054289012699744593496654513911, -226, 112, 53, 'n') / result: (0, 1230809850311749, -165, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 20618893392999321, -169, 55), t=(1, 85404587709707515, -58, 57), prec=53, rnd='n' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1760948089259519293280893503597315, exp=-227, bc=111, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 1760948089259519293280893503597315, -227, 111, 53, 'n') / result: (1, 1527378995207495, -167, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 1760948089259519293280893503597315, -227, 111, 53, 'n') / result: (1, 1527378995207495, -167, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1230809850311749, -165, 51), (1, 1527378995207495, -167, 51)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (2.63173210619768e-35 - 8.16464935465334e-36j) / count: 99
gamma__ / s: Complex { re: 0.0, im: -50.0 } / result: Complex { re: 2.6317321061976804e-35, im: -8.164649354653339e-36 }
zeta__ / s: Complex { re: 1.0, im: 50.0 } / result: Complex { re: 0.44103873082309397, im: 0.281582455029683 } / z: Complex { re: 0.0, im: 0.0 }

test_reflection_formula_for_specific_value¶

In [ ]:
inl test_reflection_formula_for_specific_value log = run_test log (3u8, 2u8) fun zeta, gamma =>
    ;[
        .^(3, 4)
        .^(2.5, -3.5)
        .^(1.5, 2.5)
        .^(0.5, 14.134725)
    ]
    |> fun x => a x : _ i32 _
    |> am.iter fun s =>
        inl lhs = zeta s
        inl reflection_coefficient =
            (.^(2, 0) .** s)
            .* (.^(pi, 0) .** (s .- .^(1, 0)))
            .* (.^(pi, 0) .* s ./ .^(2, 0) |> complex_sin)
            .* gamma (.^(1, 0) .- s)

        inl one_minus_s = .^(1 - re s, -(im s))
        inl rhs = reflection_coefficient .* zeta one_minus_s

        re lhs - re rhs |> abs |> _assert_lt 0.0001
        im lhs - im rhs |> abs |> _assert_lt 0.0001
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_reflection_formula_for_specific_value true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (3.0, 4.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(3+4j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(3+4j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(3+4j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=3.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=4.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -50, 53, 53, 'd') / result: (0, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -50, 53, 53, 'd') / result: (0, 1, 2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, 0, 2), (0, 1, 2, 1)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='3.0', imag='4.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, 0, 2), (0, 1, 2, 1)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3, 0, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, 0, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 0, 2), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (3+4j) / result: (3.0 + 4.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (3+4j) / result: (3.0 + 4.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 3, 0, 2), (0, 1, 2, 1)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 3, 0, 2), (0, 1, 2, 1)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 3, 0, 2), y=(0, 1, 2, 1), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3, 0, 2), t=(0, 3, 0, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 2, 1), t=(0, 1, 2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, 0, 4), t=(0, 1, 4, 1), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=25 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=0, bc=5, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 0, 5, 14, 'd') / result: (0, 25, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 0, 5, 14, 'd') / result: (0, 25, 0, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 25, 0, 5), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26214400 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26214400 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26214400 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5120, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5120, exp=-10, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5120, -10, 13, 10, 'd') / result: (0, 5, 0, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5120, -10, 13, 10, 'd') / result: (0, 5, 0, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 5, 0, 3), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, 0, 3), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 3, 0, 2), (0, 1, 2, 1)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 3, 0, 2), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 3, 0, 2), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=2, exp=0, bc=2, prec=73, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 2, 0, 2, 73, 'd') / result: (1, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 2, 0, 2, 73, 'd') / result: (1, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 1, 2, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 1, 2, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 1, 2, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=2, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, 2, 1, 73, 'd') / result: (1, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, 2, 1, 73, 'd') / result: (1, 1, 2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 1, 1, 1), (1, 1, 2, 1)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 1, 1, 1), y=(1, 1, 2, 1), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 1, 1), t=(1, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 2, 1), t=(1, 1, 2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 2, 1), t=(0, 1, 4, 1), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=2, bc=3, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 2, 3, 14, 'd') / result: (0, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 2, 3, 14, 'd') / result: (0, 5, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 5, 2, 3), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=20971520 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=20971520 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=20971520 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4579, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4579 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4579, exp=-10, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4579, -10, 13, 10, 'd') / result: (0, 143, -5, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4579, -10, 13, 10, 'd') / result: (0, 143, -5, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 3, 0, 2), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 3, 0, 2), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 3, 0, 2) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 2, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=36 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 36 / result: [1, 2593, 1121473, 193867201, 17912706625, 1025917793857, 39849386456641, 1114960826349121, 23459360252114497, 383306420285355585, 4985560924921017921, 52641806704524932673, 458410566059848119873, 3334998940074200806977, 20487988874011637200449, 107238742562890625857089, 481876069985428516386369, 1870905733156335490184769, 6311391037324917466740289, 18590627781711437185693249, 48029310745817580614465089, 109300065532900285636949569, 220053755475724202749474369, 393835390709681730663233089, 630166089689194893623965249, 907975237877357305594132033, 1189136532649992265521706561, 1432770359007831084746159681, 1612173449325876033447802433, 1723310027962099885517059649, 1780448042967164125846451777, 1804378930267011232319682113, 1812332151740670736951162433, 1814349192524666434163062337, 1814715766222899190372775489, 1814758267521245017179698753, 1814760628704486452002305601]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 36 / result: [1, 2593, 1121473, 193867201, 17912706625, 1025917793857, 39849386456641, 1114960826349121, 23459360252114497, 383306420285355585, 4985560924921017921, 52641806704524932673, 458410566059848119873, 3334998940074200806977, 20487988874011637200449, 107238742562890625857089, 481876069985428516386369, 1870905733156335490184769, 6311391037324917466740289, 18590627781711437185693249, 48029310745817580614465089, 109300065532900285636949569, 220053755475724202749474369, 393835390709681730663233089, 630166089689194893623965249, 907975237877357305594132033, 1189136532649992265521706561, 1432770359007831084746159681, 1612173449325876033447802433, 1723310027962099885517059649, 1780448042967164125846451777, 1804378930267011232319682113, 1812332151740670736951162433, 1814349192524666434163062337, 1814715766222899190372775489, 1814758267521245017179698753, 1814760628704486452002305601]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 0, 2), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=86 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=86, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: pi_fixed / f_locals: prec=85, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=958288617897701126742203875414927711381592807340433735680 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 0, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=0, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=0 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=0 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 1, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=108, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 689 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=123 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=123, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 224939120507729810846275465740351, -108, 108, 88, 'd') / result: (0, 214518661983232317777896371, -88, 88)

[2]libmpf._normalize. / x: (0, 356520070949948947528356728229971, -108, 109, 88, 'd') / result: (0, 85001008737075077898110563, -86, 87)

[2]libmpf._normalize. / x: (0, 449878241015459621692550931480702, -108, 109, 88, 'd') / result: (0, 214518661983232317777896371, -87, 88)

[2]libmpf._normalize. / x: (0, 522292463546151898066896762790005, -108, 109, 88, 'd') / result: (0, 124524227034128164784168425, -86, 87)

[2]libmpf._normalize. / x: (0, 581459191457678758374632193970322, -108, 109, 88, 'd') / result: (0, 8664417139555197333911541, -82, 83)

[2]libmpf._normalize. / x: (0, 631483947120683840791049765974625, -108, 109, 88, 'd') / result: (0, 301115010795919342418217547, -87, 88)

[2]libmpf._normalize. / x: (0, 674817361523189432538826397221053, -108, 110, 88, 'd') / result: (0, 80444498243712119166711139, -85, 87)

[2]libmpf._normalize. / x: (0, 713040141899897895056713456459942, -108, 110, 88, 'd') / result: (0, 85001008737075077898110563, -85, 87)

[2]libmpf._normalize. / x: (0, 747231584053881708913172228530356, -108, 110, 88, 'd') / result: (0, 89076946264968122114321259, -85, 87)

[2]libmpf._normalize. / x: (0, 778161505752905805354238767353817, -108, 110, 88, 'd') / result: (0, 92764080256570077580718847, -85, 87)

[2]libmpf._normalize. / x: (0, 806398311965408569220907659710673, -108, 110, 88, 'd') / result: (0, 192260339728691236787058749, -86, 88)

[2]libmpf._normalize. / x: (0, 832373655690528864538379510958074, -108, 110, 88, 'd') / result: (0, 198453344271309105047793271, -86, 88)

[2]libmpf._normalize. / x: (0, 856423067628413651637325231714976, -108, 110, 88, 'd') / result: (0, 102093585446883875326791433, -85, 87)

[2]libmpf._normalize. / x: (0, 878812534496100845595253491019976, -108, 110, 88, 'd') / result: (0, 52381308942800810670569747, -84, 86)

[2]libmpf._normalize. / x: (0, 899756482030919243385101862961404, -108, 110, 88, 'd') / result: (0, 214518661983232317777896371, -86, 88)

[2]libmpf._normalize. / x: (0, 919430296618877781423204854757461, -108, 110, 88, 'd') / result: (0, 219209264902800984721947873, -86, 88)

[2]libmpf._normalize. / x: (0, 937979262407627705902988922200293, -108, 110, 88, 'd') / result: (0, 223631682969958235240695219, -86, 88)

[2]libmpf._normalize. / x: (0, 955525078854587723508080664044832, -108, 110, 88, 'd') / result: (0, 28476866449552408561351319, -83, 85)

[2]libmpf._normalize. / x: (0, 972170704561611519759447694270707, -108, 110, 88, 'd') / result: (0, 231783558025744323673116611, -86, 88)

[2]libmpf._normalize. / x: (0, 988004018070632788319406494204596, -108, 110, 88, 'd') / result: (0, 235558514135034749107219337, -86, 88)

[2]libmpf._normalize. / x: (0, 1003100626260635616200514233094168, -108, 110, 88, 'd') / result: (0, 239157826008948234605911787, -86, 88)

[2]libmpf._normalize. / x: (0, 1017526047957690401622753083176439, -108, 110, 88, 'd') / result: (0, 242597114552900886922539015, -86, 88)

[2]libmpf._normalize. / x: (0, 1031337432473138380067183125451024, -108, 110, 88, 'd') / result: (0, 122945002612249658115766421, -85, 87)

[2]libmpf._normalize. / x: (0, 1044584927092303796133793525580010, -108, 110, 88, 'd') / result: (0, 124524227034128164784168425, -85, 87)

[2]libmpf._normalize. / x: (0, 1057312776198258675384654976698425, -108, 110, 88, 'd') / result: (0, 63020752441779296123066841, -84, 86)

[2]libmpf._normalize. / x: (0, 1069560212849846842585070184689914, -108, 110, 88, 'd') / result: (0, 255003026211225233694331689, -86, 88)

[2]libmpf._normalize. / x: (0, 1081362188136143462483600697455327, -108, 110, 88, 'd') / result: (0, 257816836389575830098056959, -86, 88)

[2]libmpf._normalize. / x: (0, 1092749972487262132322162826065000, -108, 110, 88, 'd') / result: (0, 260531895753684552269497591, -86, 88)

[2]libmpf._normalize. / x: (0, 1103751655003830656441528956760327, -108, 110, 88, 'd') / result: (0, 263154901267011322126753081, -86, 88)

[2]libmpf._normalize. / x: (0, 1114392560881063724586709659212406, -108, 110, 88, 'd') / result: (0, 265691890926614695688893713, -86, 88)

[2]libmpf._normalize. / x: (0, 1124695602538649054231377328701755, -108, 110, 88, 'd') / result: (0, 8379635233720012413199077, -81, 83)

[2]libmpf._normalize. / x: (0, 1134681576702854752882595495583788, -108, 110, 88, 'd') / result: (0, 270529169250215233059548257, -86, 88)

[2]libmpf._normalize. / x: (0, 1144369417126607592269480320497812, -108, 110, 88, 'd') / result: (0, 136419465199304532083210983, -85, 87)

[2]libmpf._normalize. / x: (0, 1153776410666835738857946528764630, -108, 110, 88, 'd') / result: (0, 137540866216043917996638599, -85, 87)

[2]libmpf._normalize. / x: (0, 1162918382915357516749264387940644, -108, 110, 88, 'd') / result: (0, 8664417139555197333911541, -81, 83)

[2]libmpf._normalize. / x: (0, 10379151319367859586310, -73, 74, 73, 'd') / result: (0, 5189575659683929793155, -72, 73)

[2]libmpf._normalize. / x: (0, 664378174424104646235, -73, 70, 73, 'd') / result: (0, 664378174424104646235, -73, 70)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (1, 6703708186976009930559261, -82, 83, 83, 'd') / result: (1, 6703708186976009930559261, -82, 83)

[2]libmpf._normalize1 / x: (1, 6703708186976009930559261, -81, 83, 83, 'd') / result: (1, 6703708186976009930559261, -81, 83)

[2]libmpf._normalize. / x: (0, 618970019642690137449562189, -91, 90, 77, 'd') / result: (0, 1, -2, 1)

[2]libmpf._normalize. / x: (1, 151337130595373862044703061964680, -107, 107, 77, 'd') / result: (1, 140943686101002490189581, -77, 77)

[2]libmpf._normalize. / x: (1, 58524745367220976934078390384951, -107, 106, 77, 'd') / result: (1, 109010833068231077741977, -78, 77)

[3]libmpf._normalize1 / x: (1, 140943686101002490189581, -79, 77, 73, 'd') / result: (1, 550561273832040977303, -71, 69)

[3]libmpf._normalize1 / x: (1, 109010833068231077741977, -80, 77, 73, 'd') / result: (1, 6813177066764442358873, -76, 73)

[2]libmpf._normalize1 / x: (0, 2911744515266863584151, -71, 72, 73, 'd') / result: (0, 2911744515266863584151, -71, 72)

[2]libmpf._normalize1 / x: (0, 6813177066764442358873, -76, 73, 73, 'd') / result: (0, 6813177066764442358873, -76, 73)

[3]libmpf._normalize1 / x: (0, 8728153650862227207650280955475015203514010353, -152, 153, 63, 'd') / result: (0, 7050546370485509715, -62, 63)

[3]libmpf._normalize1 / x: (0, 971612507815059406408485615240140586020623075, -149, 150, 63, 'd') / result: (0, 1569724666755164509, -60, 61)

[3]libmpf._normalize1 / x: (1, 4405505783719129481207794843946107043770555, -148, 142, 63, 'd') / result: (1, 7288297945565391561, -69, 63)

[3]libmpf._normalize1 / x: (0, 513369951636591445, -59, 59, 53, 'n') / result: (0, 8021405494321741, -53, 53)

[3]libmpf._normalize1 / x: (1, 595899593583242603, -66, 60, 53, 'n') / result: (1, 4655465574869083, -59, 53)

[7]gammazeta.mpc_zeta / s: ((0, 3, 0, 2), (0, 1, 2, 1)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 8021405494321741, -53, 53), (1, 4655465574869083, -59, 53))

zeta_ / result: (0.890554906965073 - 0.00807594542432726j) / count: 1480
zeta / count: 0 / s: Complex { re: 3.0, im: 4.0 }
zeta__ / s: Complex { re: 3.0, im: 4.0 } / result: Complex { re: 0.8905549069650732, im: -0.00807594542432726 } / z: Complex { re: NaN, im: NaN }
gamma_ / s: (-2.0, -4.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(-2-4j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(-2-4j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=-2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -51, 53, 53, 'd') / result: (1, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -51, 53, 53, 'd') / result: (1, 1, 1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-4.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -50, 53, 53, 'd') / result: (1, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -50, 53, 53, 'd') / result: (1, 1, 2, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, 1, 1), (1, 1, 2, 1)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-2.0', imag='-4.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, 1, 1), (1, 1, 2, 1)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(1, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 2, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-2-4j) / result: (-2.0 - 4.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-2-4j) / result: (-2.0 - 4.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((1, 1, 1, 1), (1, 1, 2, 1)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((1, 1, 1, 1), (1, 1, 2, 1)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((1, 1, 1, 1), (1, 1, 2, 1)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 1, 1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 1, 2, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=12 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_neg / f_locals: z=((1, 1, 1, 1), (1, 1, 2, 1)), prec=None, rnd='d' / f_lineno: 109 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2055 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 111 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 2, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 111 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=77 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=77 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=11590639159697877173212547121152000, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=11590639159697877173212547121152000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7105408312048919930651862368256000, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7105408312048919930651862368256000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2115620184325601055735808, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2115620184325601055735808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=2115620184325601055735808, y=604462909807314587353088, prec=77 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: ln_sqrt2pi_fixed / f_locals: prec=90 / f_lineno: 298 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: f / f_locals: prec=100, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=120, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4175892906503776358826876457663557747 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4175892906503776358826876457663557747, exp=-120, bc=122, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4175892906503776358826876457663557747, -120, 122, 100, 'd') / result: (0, 124451306656115542615260972311, -95, 97)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4175892906503776358826876457663557747, -120, 122, 100, 'd') / result: (0, 124451306656115542615260972311, -95, 97)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 124451306656115542615260972311, -95, 97), n=1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 124451306656115542615260972311, -94, 97), prec=100, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=124451306656115542615260972311, n=23 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=1043973226625944089706719114415833088, prec=120 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=280153111556540953215542460800145041418878976, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=99961970518367115073231831877510988860191686310266891205533259355525058899519208482144256 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=112812380252346714256619501890993673050670816217087917444950810085789266016207277765165056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=119844398375027416975362124250156558253081446922452215126903700549285702590021345940078592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123523112981967131966433631211306545068774826918748702154819251296018532790592798371872768 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125404601453928029720323931284714870129867852460400437921184426881038853667772148177960960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126356065534944591108671811195750949899937575479834920054591589616121392668525122285469696 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126834501251325580293361066030583655283751847122811260937259636407222732982902106993197056 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127074398013868139835428851315650043196027587579164016306760379080409009090078308965548032 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=120, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2442957649482355028246220439648934393, exp=-120, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2442957649482355028246220439648934393 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=2442957649482355028246220439648934393, exp=-120, bc=121, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2442957649482355028246220439648934393, -120, 121, 100, 'd') / result: (0, 291223245797438028841760210949, -97, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2442957649482355028246220439648934393, -120, 121, 100, 'd') / result: (0, 291223245797438028841760210949, -97, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 291223245797438028841760210949, -97, 98), prec=89 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 7, 1, 3), (0, 1, 2, 1)), prec=77, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 7, 1, 3), b=(0, 1, 2, 1), prec=77, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 7, 1, 3), t=(0, 7, 1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 2, 1), t=(0, 1, 2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 49, 2, 6), t=(0, 1, 4, 1), prec=97, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=53 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=53, exp=2, bc=6, prec=97, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 53, 2, 6, 97, 'd') / result: (0, 53, 2, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 53, 2, 6, 97, 'd') / result: (0, 53, 2, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 53, 2, 6), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=211 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=211, exp=0, bc=8, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 211, 0, 8, 10, 'd') / result: (0, 211, 0, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 211, 0, 8, 10, 'd') / result: (0, 211, 0, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 53, 2, 6), prec=77, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=53, n=91 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=131221644164250309139307167744, prec=97 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=295484873880530756625348267112590789954240512, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=105432526118874768136941036607126018101296703969037716097378363101349813366657075613007872 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=115858169969788187020470110900544180968854539440608494245220574262986219231774510178893824 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=121451446157696676244709143963167600351815274117873980468483908959474670173925413432066048 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=124348543719126169573602472453157441791488914531345009513951331044569464552816508063973376 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125822905595687769137898955511139071783949695032923330982698013381488930716022015021547520 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126566629030264556208091515506419568719721165256443951963701221556169108521228882535251968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126940137648132611385176453572586150508532636472054815867603018317716586123215931984314368 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127127305099577709791594771739573251677748479774490827189410280734549569720589326309392384 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=97, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=848784975782783983595008141886, exp=-97, prec=77, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=848784975782783983595008141886 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=848784975782783983595008141886, exp=-97, bc=100, prec=77, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 848784975782783983595008141886, -97, 100, 77, 'd') / result: (0, 50591526972221373533905, -73, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 848784975782783983595008141886, -97, 100, 77, 'd') / result: (0, 50591526972221373533905, -73, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 50591526972221373533905, -73, 76), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 7, 1, 3), (0, 1, 2, 1)), prec=77, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 1, 2, 1), x=(0, 7, 1, 3), prec=77, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 1, 2, 1), t=(0, 7, 1, 3), prec=81, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=88424288520384305349937445 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=88424288520384305349937445, exp=-88, bc=87, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 88424288520384305349937445, -88, 87, 81, 'd') / result: (0, 345407377032751192773193, -80, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 88424288520384305349937445, -88, 87, 81, 'd') / result: (0, 345407377032751192773193, -80, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 345407377032751192773193, -80, 79), prec=81, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 345407377032751192773193, -80, 79), prec=112 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=1483513388152807893865855480496128, prec=112 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=36, prec=112 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=111 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=100353353393387804136910732226917626776911872, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=23323587299919510499679356626097143808, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: pi_fixed / f_locals: prec=141, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=4, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=2, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=4, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=4, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=4975718980279915354764599392708942505205063788727463912991842088816060767610396422208225280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=23323587299919510499679356626097143808, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=100353353393387804136910732226917626776911872, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=110142526925424205467961107326929919321034426523552432783360, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: pi_fixed / f_locals: prec=216, verbose=False, verbose_base=None / f_lineno: 233 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=6, level=0, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 245 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=3, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=0, b=1, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=3, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=1, b=2, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=2, b=3, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=6, level=1, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=3, b=4, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=6, level=2, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=4, b=5, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 226 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: bs_chudnovsky / f_locals: a=5, b=6, level=3, verbose=False / f_lineno: 211 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 227 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=7101583434157760683541000681561997427937677552418571477652645940236617263256392795779825646866410618589286160811223740454114930951454720 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 246 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=110142526925424205467961107326929919321034426523552432783360, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=100353353393387804136910732226917626776911872, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=110142526925424205467961107326906799614141590807931638479358, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1445014445183553422088253083001917, exp=-112, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1445014445183553422088253083001917 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=1445014445183553422088253083001917, exp=-112, bc=111, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1445014445183553422088253083001917, -112, 111, 81, 'd') / result: (0, 336443643361226055325999, -80, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1445014445183553422088253083001917, -112, 111, 81, 'd') / result: (0, 336443643361226055325999, -80, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 336443643361226055325999, -80, 79), prec=77, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=336443643361226055325999, exp=-80, bc=79, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 336443643361226055325999, -80, 79, 77, 'd') / result: (0, 84110910840306513831499, -78, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 336443643361226055325999, -80, 79, 77, 'd') / result: (0, 84110910840306513831499, -78, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 50591526972221373533905, -74, 76), prec=77 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 84110910840306513831499, -78, 77), prec=77 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3319740492380150167114529, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3319740492380150167114529 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1581977098749908995173575, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1581977098749908995173575 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_sin_pi / f_locals: z=((1, 1, 1, 1), (1, 1, 2, 1)), prec=77, rnd='d' / f_lineno: 518 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: f / f_locals: prec=82, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 522 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=102, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=15929767251982789454753404455808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=15929767251982789454753404455808, exp=-102, bc=104, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 15929767251982789454753404455808, -102, 104, 82, 'd') / result: (0, 3797952473636338580787993, -80, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 15929767251982789454753404455808, -102, 104, 82, 'd') / result: (0, 3797952473636338580787993, -80, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 2, 1), t=(0, 3797952473636338580787993, -80, 82), prec=82, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 522 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3797952473636338580787993, exp=-78, bc=82, prec=82, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 3797952473636338580787993, -78, 82, 82, 'd') / result: (1, 3797952473636338580787993, -78, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 3797952473636338580787993, -78, 82, 82, 'd') / result: (1, 3797952473636338580787993, -78, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin_pi / f_locals: x=(1, 1, 1, 1), prec=83, rnd='d' / f_lineno: 1381 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 526 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 1, 1, 1), prec=83, rnd='d', which=0, pi=1 / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1381 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_cosh_sinh / f_locals: x=(1, 3797952473636338580787993, -78, 82), prec=83, rnd='d', tanh=0 / f_lineno: 1196 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 527 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1237 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_expneg_basecase / f_locals: x=14216917660379641203082313376, prec=97 / f_lineno: 1111 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1248 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=14216917660379641203082313376, prec=97 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1118 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=173330533131757855235335639959, exp=-80, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1258 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=173330533131757855235335639959 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=173330533131757855235335639959, exp=-80, bc=98, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 173330533131757855235335639959, -80, 98, 83, 'd') / result: (0, 5289628086296321265726795, -65, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 173330533131757855235335639959, -80, 98, 83, 'd') / result: (0, 5289628086296321265726795, -65, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-173330533127541917019078867995, exp=-80, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1259 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=173330533127541917019078867995 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=173330533127541917019078867995, exp=-80, bc=98, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 173330533127541917019078867995, -80, 98, 83, 'd') / result: (1, 2644814043083830520921003, -64, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 173330533127541917019078867995, -80, 98, 83, 'd') / result: (1, 2644814043083830520921003, -64, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(0, 5289628086296321265726795, -65, 83), prec=77, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 528 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(1, 2644814043083830520921003, -64, 82), prec=77, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 529 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=2644814043083830520921003, exp=-64, bc=82, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 2644814043083830520921003, -64, 82, 77, 'd') / result: (1, 82650438846369703778781, -59, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 2644814043083830520921003, -64, 82, 77, 'd') / result: (1, 82650438846369703778781, -59, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((0, 0, 0, 0), (1, 82650438846369703778781, -59, 77)), w=((1, 1, 1, 1), (1, 1, 2, 1)), prec=77, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(1, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 82650438846369703778781, -59, 77), t=(1, 1, 2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(1, 1, 2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 82650438846369703778781, -59, 77), t=(1, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 82650438846369703778781, -57, 77), prec=77, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 82650438846369703778781, -57, 77), prec=77, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 82650438846369703778781, -57, 77), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=82650438846369703778781, exp=-57, bc=77, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 82650438846369703778781, -57, 77, 77, 'd') / result: (1, 82650438846369703778781, -57, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 82650438846369703778781, -57, 77, 77, 'd') / result: (1, 82650438846369703778781, -57, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 82650438846369703778781, -58, 77), prec=77, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=82650438846369703778781, exp=-58, bc=77, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 82650438846369703778781, -58, 77, 77, 'd') / result: (0, 82650438846369703778781, -58, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 82650438846369703778781, -58, 77, 77, 'd') / result: (0, 82650438846369703778781, -58, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: f / f_locals: prec=77, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 2167 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=97, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=497805226624462170461043889244 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=497805226624462170461043889244, exp=-97, bc=99, prec=77, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 497805226624462170461043889244, -97, 99, 77, 'd') / result: (0, 14835751850141947581203, -72, 74)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 497805226624462170461043889244, -97, 99, 77, 'd') / result: (0, 14835751850141947581203, -72, 74)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 14835751850141947581203, -72, 74), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2167 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((0, 3319740492380150167114529, -77, 82), (0, 1581977098749908995173575, -77, 81)), prec=77, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2174 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(0, 3319740492380150167114529, -77, 82), prec=81, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=19040000885036248465378287692, prec=95 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=64060108444003392529439492822, exp=-64, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=64060108444003392529439492822 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=64060108444003392529439492822, exp=-64, bc=96, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 64060108444003392529439492822, -64, 96, 81, 'd') / result: (0, 1954959364135845719282211, -49, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 64060108444003392529439492822, -64, 96, 81, 'd') / result: (0, 1954959364135845719282211, -49, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(0, 1581977098749908995173575, -77, 81), prec=81, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=1581977098749908995173575, exp=-77, mag=4, wp=91 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=114, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=2710037109561721866485676629490391, prec=111 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=2757842869796818373752521675699216681784125786741610711703144192785411660313986395864461237303187203973544587666894322925568, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2757842869796818373752521675699216681784125786741610711703144192785411660313986395864461237303187203973544587666894322925568 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=96260119996531917438218359178241754216211038288769091113230580389794198936293716201670733891907017426324424909139794030472369227931042412408796656832307496225862886881174009756681727147186445424980514875881758869949252514647308849304309725074089219626397272658055260 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=96260119996531917438218359178241754216211038288769091113230580389794198936293716201670733891907017426324424909139794030472369227931042412408796656832307496225862886881174009756681727147186445424980514875881758869949252514647308849304309725074089219626397272658055260 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1305552210197735177673676548218893, exp=-111, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1305552210197735177673676548218893 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=1305552210197735177673676548218893, exp=-111, bc=111, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 1305552210197735177673676548218893, -111, 111, 81, 'd') / result: (1, 1215890245696283111044835, -81, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 1305552210197735177673676548218893, -111, 111, 81, 'd') / result: (1, 1215890245696283111044835, -81, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-2243996455709203800126204385747819, exp=-111, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2243996455709203800126204385747819 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=2243996455709203800126204385747819, exp=-111, bc=111, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 2243996455709203800126204385747819, -111, 111, 81, 'd') / result: (1, 522471139139776071562945, -79, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 2243996455709203800126204385747819, -111, 111, 81, 'd') / result: (1, 522471139139776071562945, -79, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1954959364135845719282211, -49, 81), t=(1, 1215890245696283111044835, -81, 81), prec=77, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=2377016021585382852926987844060576204862438930185, exp=-130, bc=161, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 2377016021585382852926987844060576204862438930185, -130, 161, 77, 'd') / result: (1, 122888848048959865130493, -46, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 2377016021585382852926987844060576204862438930185, -130, 161, 77, 'd') / result: (1, 122888848048959865130493, -46, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1954959364135845719282211, -49, 81), t=(1, 522471139139776071562945, -79, 79), prec=77, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1021409845952027603665752467755219062214305271395, exp=-128, bc=160, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 1021409845952027603665752467755219062214305271395, -128, 160, 77, 'd') / result: (1, 105611302755286478504843, -45, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 1021409845952027603665752467755219062214305271395, -128, 160, 77, 'd') / result: (1, 105611302755286478504843, -45, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((1, 82650438846369703778781, -57, 77), (0, 82650438846369703778781, -58, 77)), w=((1, 122888848048959865130493, -46, 77), (1, 105611302755286478504843, -45, 77)), prec=77, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2174 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 82650438846369703778781, -57, 77), t=(1, 122888848048959865130493, -46, 77), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 82650438846369703778781, -58, 77), t=(1, 105611302755286478504843, -45, 77), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 82650438846369703778781, -57, 77), t=(1, 105611302755286478504843, -45, 77), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 82650438846369703778781, -58, 77), t=(1, 122888848048959865130493, -46, 77), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 10156817220571376218369964087766429379769469033, -103, 153), t=(1, 8728820519861241292585833534358612988109136383, -103, 153), prec=77, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 10156817220571376218369964087766429379769469033, -103, 153), t=(1, 8728820519861241292585833534358612988109136383, -103, 153), prec=77, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18885637740432617510955797622125042367878605416 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=18885637740432617510955797622125042367878605416, exp=-103, bc=154, prec=77, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 18885637740432617510955797622125042367878605416, -103, 154, 77, 'd') / result: (0, 31243666789171260051059, -24, 75)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 18885637740432617510955797622125042367878605416, -103, 154, 77, 'd') / result: (0, 31243666789171260051059, -24, 75)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 8728820519861241292585833534358612988109136383, -102, 153), t=(1, 10156817220571376218369964087766429379769469033, -104, 153), prec=77, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=24758464858873588951973370049668022572667076499 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=24758464858873588951973370049668022572667076499, exp=-104, bc=155, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 24758464858873588951973370049668022572667076499, -104, 155, 77, 'd') / result: (0, 10239861063917832597109, -23, 74)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 24758464858873588951973370049668022572667076499, -104, 155, 77, 'd') / result: (0, 10239861063917832597109, -23, 74)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((1, 14835751850141947581203, -72, 74), (0, 0, 0, 0)), w=((0, 37451375, 11, 26), (0, 45917625, 10, 26)), prec=77, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2176 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14835751850141947581203, -72, 74), t=(0, 37451375, 11, 26), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(0, 45917625, 10, 26), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14835751850141947581203, -72, 74), t=(0, 45917625, 10, 26), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(0, 37451375, 11, 26), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 555619305946609882093976504125, -61, 99), t=(0, 0, 0, 0), prec=77, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 555619305946609882093976504125, -61, 99), t=(0, 0, 0, 0), prec=77, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=555619305946609882093976504125, exp=-61, bc=99, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 555619305946609882093976504125, -61, 99, 77, 'd') / result: (1, 132469965445187063716405, -39, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 555619305946609882093976504125, -61, 99, 77, 'd') / result: (1, 132469965445187063716405, -39, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 681222490047874145803336402875, -62, 100), t=(0, 0, 0, 0), prec=77, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=681222490047874145803336402875, exp=-62, bc=100, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 681222490047874145803336402875, -62, 100, 77, 'd') / result: (1, 40604024532310613739689, -38, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 681222490047874145803336402875, -62, 100, 77, 'd') / result: (1, 40604024532310613739689, -38, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((1, 132469965445187063716405, -39, 77), (1, 40604024532310613739689, -38, 76)), w=((0, 31243666789171260051059, -24, 75), (0, 10239861063917832597109, -23, 74)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2177 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 31243666789171260051059, -24, 75), t=(0, 31243666789171260051059, -24, 75), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 10239861063917832597109, -23, 74), t=(0, 10239861063917832597109, -23, 74), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 976166714432763154460138375164190731287021481, -48, 150), t=(0, 104854754608340446516819647610049851915157881, -46, 147), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1395585732866124940527416965604390138947653005 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1395585732866124940527416965604390138947653005, -48, 150, 63, 'd') / result: (0, 2254690354262631397, 41, 61)

[3]libmpf._normalize1 / x: (1, 5801965739329543220951566149262588781555759299, -63, 153, 63, 'd') / result: (1, 4686790599873331693, 27, 63)

[2]libmpf._normalize. / x: (0, 87855428513863499678878459120745097524092494, -62, 146, 63, 'd') / result: (0, 4542019198387896469, 22, 62)

[3]libmpf._normalize1 / x: (1, 299570052932519913, -71, 59, 53, 'n') / result: (1, 146274439908457, -60, 48)

[3]libmpf._normalize1 / x: (0, 580633123109173137, -77, 60, 53, 'n') / result: (0, 4536196274290415, -70, 53)

gamma_ / result: (-0.00012687285242228 + 3.84230769953619e-6j) / count: 328
gamma__ / s: Complex { re: -2.0, im: -4.0 } / result: Complex { re: -0.00012687285242227956, im: 3.842307699536187e-6 }
zeta_ / s: (-2.0, -4.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-2-4j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-2-4j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-2-4j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -51, 53, 53, 'd') / result: (1, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -51, 53, 53, 'd') / result: (1, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=-4.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -50, 53, 53, 'd') / result: (1, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -50, 53, 53, 'd') / result: (1, 1, 2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, 1, 1), (1, 1, 2, 1)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-2.0', imag='-4.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, 1, 1), (1, 1, 2, 1)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 2, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-2-4j) / result: (-2.0 - 4.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-2-4j) / result: (-2.0 - 4.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 1, 1, 1), (1, 1, 2, 1)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 1, 1, 1), (1, 1, 2, 1)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 1, 1, 1), y=(1, 1, 2, 1), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 1, 1), t=(1, 1, 1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 2, 1), t=(1, 1, 2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 2, 1), t=(0, 1, 4, 1), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=2, bc=3, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, 2, 3, 14, 'd') / result: (0, 5, 2, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, 2, 3, 14, 'd') / result: (0, 5, 2, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 5, 2, 3), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=20971520 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=20971520 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=20971520 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4579, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4579 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4579, exp=-10, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4579, -10, 13, 10, 'd') / result: (0, 143, -5, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4579, -10, 13, 10, 'd') / result: (0, 143, -5, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 143, -5, 8), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 143, -5, 8), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((1, 1, 1, 1), (1, 1, 2, 1)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(1, 1, 1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(1, 1, 1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3, exp=0, bc=2, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 3, 0, 2, 73, 'd') / result: (0, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 3, 0, 2, 73, 'd') / result: (0, 3, 0, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(1, 1, 2, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(1, 1, 2, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 2, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=2, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 2, 1, 73, 'd') / result: (0, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 2, 1, 73, 'd') / result: (0, 1, 2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 3, 0, 2), (0, 1, 2, 1)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 3, 0, 2), y=(0, 1, 2, 1), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3, 0, 2), t=(0, 3, 0, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 2, 1), t=(0, 1, 2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, 0, 4), t=(0, 1, 4, 1), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=25 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=25, exp=0, bc=5, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 25, 0, 5, 14, 'd') / result: (0, 25, 0, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 25, 0, 5, 14, 'd') / result: (0, 25, 0, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 25, 0, 5), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=26214400 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=26214400 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=26214400 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5120, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5120, exp=-10, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5120, -10, 13, 10, 'd') / result: (0, 5, 0, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5120, -10, 13, 10, 'd') / result: (0, 5, 0, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(1, 1, 1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(1, 1, 1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(1, 1, 1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((1, 1, 1, 1), (1, 1, 2, 1)), prec=730, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1165 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(1, 1, 1, 1), prec=730, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(1, 1, 1, 1), prec=730, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3, exp=0, bc=2, prec=730, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 3, 0, 2, 730, 'd') / result: (0, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 3, 0, 2, 730, 'd') / result: (0, 3, 0, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(1, 1, 2, 1), prec=730, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(1, 1, 2, 1), prec=730, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, 2, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=2, bc=1, prec=730, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, 2, 1, 730, 'd') / result: (0, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, 2, 1, 730, 'd') / result: (0, 1, 2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 3, 0, 2), (0, 1, 2, 1)), prec=73, rnd='d', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 3, 0, 2), (0, 1, 2, 1)) / prec: 73 / rnd: d / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 3, 0, 2), (0, 1, 2, 1)) / prec: 73 / rnd: d / type: 0call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 3, 0, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 2, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=12 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 0, 2), prec=97 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=97 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=186163294263968771824641720861780797816832000, exp=-97, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=186163294263968771824641720861780797816832000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=91717414333936815730982475528033057898496000, exp=-97, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=91717414333936815730982475528033057898496000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=2852213850513516153367582212096, exp=-97, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2852213850513516153367582212096 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: complex_stirling_series / f_locals: x=2852213850513516153367582212096, y=633825300114114700748351602688, prec=97 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=97, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln_sqrt2pi_fixed / f_locals: prec=111 / f_lineno: 298 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: f / f_locals: prec=121, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=141, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8757482160660207598466501616942045456798849 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8757482160660207598466501616942045456798849, exp=-141, bc=143, prec=121, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8757482160660207598466501616942045456798849, -141, 143, 121, 'd') / result: (0, 2087946453251888179413438228831778873, -119, 121)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8757482160660207598466501616942045456798849, -141, 143, 121, 'd') / result: (0, 2087946453251888179413438228831778873, -119, 121)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_shift / f_locals: s=(0, 2087946453251888179413438228831778873, -119, 121), n=1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 2087946453251888179413438228831778873, -118, 121), prec=121, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 302 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: lshift / f_locals: x=2087946453251888179413438228831778873, n=20 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_taylor_cached / f_locals: x=2189370540165051899616625404235511363534848, prec=141 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_taylor / f_locals: x=95331163900725474427444297673712719783965765295283213811429271083378847980040749056, prec=276, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=11574805410600735653694953472574494126499956745967171113641623937215735727551603992756827877208090397275316518877922558972990226907575734239881107857329893566490607616 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=13062781201253778074224167274891951323416407869440482378853947519196835179782055764564018070582483691866206916164762505012535604249806337218113868568623795079573667840 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=13877033271233646709039541383158494031411546991277518678206742456363471695132516453616526674976728515714651668426635666139412987767888240253690391161580652517872631808 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=14302999321279028759488378048260945099970264096360657478205131200555257327264615266074758703183254306431207697424186807718074665311817006780288047750880414248778858496 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=14520860802323306722625812139686009411185750553865241273673935579903719929879735931311558184650603913719066589974591333930717990854733799722840817611432087306362683392 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=14631032816098477445168388071969218379773831553793824349200500566396329997783292960858643361803691151893392523163875136562640017258606850299717568552387589761828651008 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=14686431887263984246716250716445286346125889807748105557975361314128471090619964122685980700905516138395414612061599241992251101418398297703284501252094471252763213824 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=14714210034600055554480195018301600392723660331874252109262060235364310300378881245452633958973609166604005214254775735116088252280200683706658232099449404676670226432 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=141, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=158 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=158, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=168, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=38, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=38, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=38, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=33, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=30, b=33, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=30, b=31, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=31, b=33, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=31, b=32, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=32, b=33, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=33, b=38, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=33, b=35, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=33, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=34, b=35, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=35, b=38, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=35, b=36, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=36, b=38, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=36, b=37, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=37, b=38, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=168, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=168, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 5123253520527219812196617687450792532642082, -141, 142, 121, 'd') / result: (0, 2442957649482355028246220439649006143, -120, 121)

[1]gammazeta.bernoulli_size / n: 22 / result: 12

[3]libmpf._normalize1 / x: (0, 2143861251406875, 19, 51, 49, 'd') / result: (0, 267982656425859, 22, 48)

[2]gammazeta.borwein_coefficients / n: 32 / result: [1, 2049, 700417, 95678465, 6981586945, 315470286849, 9654264565761, 212439511764993, 3507699778752513, 44859985482125313, 455335831990341633, 3739142604056072193, 25226660829964439553, 141589836453345136641, 667994678559114956801, 2671963456782459375617, 9128298351139121434625, 26805536136757361938433, 68052424303199923113985, 150194164606214980931585, 289835123121340579221505, 492241529888909390680065, 741719194044284902477825, 1002043713162937610440705, 1230520019836223231791105, 1397634118431540714835969, 1498205046545464810967041, 1547120047221419507617793, 1565860209818051501789185, 1571301999319795819515905, 1572427250708292102164481, 1572574824660881778577409, 1572584048032918633353217]

[2]libmpf._normalize. / x: (0, 348449226814914483347506831352345702853749, -138, 139, 49, 'd') / result: (0, 281475043828505, -48, 49)

[7]gammazeta.mpf_zeta_int / s: 22 / prec: 49 / rnd: d / result: (0, 281475043828505, -48, 49)

[3]libmpf._normalize1 / x: (0, 75430429962747859099043310795, -26, 96, 49, 'd') / result: (0, 267982720326457, 22, 48)

[2]libmpf._normalize. / x: (0, 29671503700283895162406, -73, 75, 53, 'd') / result: (0, 884279719003555, -48, 50)

[2]libmpf._normalize. / x: (0, 190338666125823205614058, -41, 78, 54, 'u') / result: (0, 11345068581451369, -17, 54)

[3]libmpf._normalize1 / x: (0, 28604371258627617, -91, 55, 49, 'd') / result: (0, 55867912614507, -82, 46)

[3]libmpf._normalize1 / x: (0, 14971635201396368467434111699, -81, 94, 39, 'd') / result: (0, 415546352921, -26, 39)

[10]gammazeta.mpf_bernoulli / n: 22 / prec: 39 / result: (0, 415546352921, -26, 39)

[1]gammazeta.bernoulli_size / n: 24 / result: 16

[3]libmpf._normalize1 / x: (0, 147926426347074375, 22, 58, 57, 'd') / result: (0, 73963213173537187, 23, 57)

[2]gammazeta.borwein_coefficients / n: 35 / result: [1, 2451, 1002051, 163736931, 14298423651, 773802256739, 28392123459939, 750110451165539, 14895789674195299, 229577274353117539, 2814794310907717987, 27995479731894085987, 229440963099785029987, 1569518301688647248227, 9056934542693083769187, 44480158965652004137315, 187315741316292812073315, 680747753073051966761315, 2146945730864564883548515, 5905251215900562431273315, 14231343367364926229309795, 30187269093167713995581795, 56634300317331319933757795, 94503382707872831045232995, 141235441828115546884925795, 190752350185727828648126819, 235564031957322653773195619, 269947838096533777454066019, 292096367765428215565379939, 303914276517978060946008419, 309042047095355620975569251, 310804633491598568632478051, 311266263262043150161668451, 311352778491748847958747491, 311363108668430125307652451, 311363698964240484013304163]

[2]libmpf._normalize. / x: (0, 22835964444505762733584607801113554572950052448, -154, 155, 57, 'd') / result: (0, 72057598333150623, -56, 57)

[7]gammazeta.mpf_zeta_int / s: 24 / prec: 57 / rnd: d / result: (0, 72057598333150623, -56, 57)

[3]libmpf._normalize1 / x: (0, 5329611506287937406742546962717501, -33, 113, 57, 'd') / result: (0, 73963217582350379, 23, 57)

[2]libmpf._normalize. / x: (0, 7595904947272677161575987, -81, 83, 61, 'd') / result: (0, 905502432259640355, -58, 60)

[2]libmpf._normalize. / x: (0, 60114154780572938445047378, -46, 86, 62, 'u') / result: (0, 3583082841668900159, -22, 62)

[3]libmpf._normalize1 / x: (0, 5935572486694942309, -102, 63, 57, 'd') / result: (0, 92743320104608473, -96, 57)

[3]libmpf._normalize1 / x: (1, 6859594364206726801174704898161267, -96, 113, 47, 'd') / result: (1, 5810302431283, -26, 43)

[10]gammazeta.mpf_bernoulli / n: 24 / prec: 47 / result: (1, 5810302431283, -26, 43)

[1]gammazeta.bernoulli_size / n: 26 / result: 20

[3]libmpf._normalize1 / x: (0, 48076088562799171875, 23, 66, 52, 'd') / result: (0, 2934331577319285, 37, 52)

[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]

[2]libmpf._normalize. / x: (0, 22300745530846400430838233181335679846068308, -144, 145, 52, 'd') / result: (0, 1125899923620283, -50, 51)

[7]gammazeta.mpf_zeta_int / s: 26 / prec: 52 / rnd: d / result: (0, 1125899923620283, -50, 51)

[3]libmpf._normalize1 / x: (0, 3303763698780367521689393057655, -13, 102, 52, 'd') / result: (0, 2934331621045387, 37, 52)

[2]libmpf._normalize. / x: (0, 237372029602271161299249, -76, 78, 56, 'd') / result: (0, 28296951008113761, -53, 55)

[2]libmpf._normalize. / x: (0, 2317589556992615347361916, -38, 81, 57, 'u') / result: (0, 34534775569924941, -12, 55)

[3]libmpf._normalize1 / x: (0, 150349807486706443, -100, 58, 52, 'd') / result: (0, 587303935494947, -92, 50)

[3]libmpf._normalize1 / x: (0, 1723344509087223231539396159489, -80, 101, 42, 'd') / result: (0, 2989526177109, -21, 42)

[10]gammazeta.mpf_bernoulli / n: 26 / prec: 42 / result: (0, 2989526177109, -21, 42)

[1]gammazeta.bernoulli_size / n: 28 / result: 24

[3]libmpf._normalize1 / x: (0, 9086380738369043484375, 25, 73, 63, 'd') / result: (0, 8873418689813519027, 35, 63)

[2]gammazeta.borwein_coefficients / n: 37 / result: [1, 2739, 1251267, 228483363, 22302458403, 1349684157475, 55410320628771, 1639208747359267, 36482774135430179, 630873007226051619, 8689553220075740195, 97230377376839851043, 897947395838010940451, 6934121842699146845219, 45259038965626993859619, 251949281656175796378659, 1205391368906126724127779, 4988567993181333079153699, 17959459276410612010671139, 56521568496821981807074339, 156189789251115983742393379, 380530104955903179736177699, 820673472765718228112989219, 1573382420614387441279130659, 2694438300389001163015937059, 4145862484325766357035998243, 5774609984852091099646745635, 7352139010519097454125079587, 8663331966917648190314863651, 9591399576709725843879320611, 10145094150687372172785572899, 10419745398911080399392693283, 10530913761287343253019384867, 10566674213520266968172026915, 10575465193876033992090147875, 10577015900969846311837195299, 10577190628529712488710102051, 10577200073262678228000529443]

[2]libmpf._normalize. / x: (0, 93536105137631020482338387007139451204022495593313, -166, 167, 63, 'd') / result: (0, 1152921508901864685, -60, 61)

[7]gammazeta.mpf_zeta_int / s: 28 / prec: 63 / rnd: d / result: (0, 1152921508901864685, -60, 61)

[3]libmpf._normalize1 / x: (0, 10230355264977809546957314762026861495, -25, 123, 63, 'd') / result: (0, 2218354680717491897, 37, 61)

[2]libmpf._normalize. / x: (0, 486137916625451338340863173, -87, 89, 67, 'd') / result: (0, 57952155664616982739, -64, 66)

[2]libmpf._normalize. / x: (0, 2927832587726471107062302262, -45, 92, 68, 'u') / result: (0, 87256210676624509903, -20, 67)

[3]libmpf._normalize1 / x: (0, 499175275067824943059, -115, 69, 63, 'd') / result: (0, 7799613672934764735, -109, 63)

[3]libmpf._normalize1 / x: (1, 17302309499142984294647311706963852295, -99, 124, 53, 'd') / result: (1, 7327813104682579, -28, 53)

[10]gammazeta.mpf_bernoulli / n: 28 / prec: 53 / result: (1, 7327813104682579, -28, 53)

[2]libmpf._normalize1 / x: (0, 85, 2, 7, 117, 'd') / result: (0, 85, 2, 7)

[2]libmpf._normalize1 / x: (0, 339, 0, 9, 10, 'd') / result: (0, 339, 0, 9)

[2]libmpf._normalize. / x: (0, 968499712604410522205518105102423174, -117, 120, 97, 'd') / result: (0, 115454162669707598949136508119, -94, 97)

[3]libmpf._normalize1 / x: (0, 144230468292634100792513786922781, -109, 107, 101, 'd') / result: (0, 563400266768101956220756980167, -101, 99)

[2]libmpf._normalize. / x: (0, 2381093967170929651542304471817863886316, -133, 131, 101, 'd') / result: (0, 2217566563907013881525308333167, -103, 101)

[3]libmpf._normalize1 / x: (0, 2217566563907013881525308333167, -103, 101, 97, 'd') / result: (0, 69298955122094183797665885411, -98, 96)

[2]libmpf._normalize. / x: (0, 66729592943111005863068476734986190, -68, 116, 101, 'd') / result: (0, 254553195736354850246690661373, -50, 98)

[2]libmpf._normalize. / x: (0, 1276463394705443709832774537271956822318, -131, 130, 101, 'd') / result: (0, 2377598350318975206153047340497, -102, 101)

[2]libmpf._normalize. / x: (1, 2404440665345121617137845688038983808492, -131, 131, 101, 'd') / result: (1, 1119654935479686417215431895125, -100, 100)

[3]libmpf._normalize1 / x: (0, 605225258251180485047949609109852228487051627936583656522381, -152, 199, 97, 'd') / result: (0, 119359636271661720440034391667, -50, 97)

[3]libmpf._normalize1 / x: (1, 285011741948336377443403778547707930464504813480225024506625, -150, 198, 97, 'd') / result: (1, 28104327593997757200746075769, -47, 95)

[2]libmpf._normalize1 / x: (0, 102240810500221555703125, 24, 77, 83, 'd') / result: (0, 102240810500221555703125, 24, 77)

[3]libmpf._normalize1 / x: (0, 2463854538255042304292873775793812499125, -38, 131, 83, 'd') / result: (0, 8753369720633380894600157, 10, 83)

[3]libmpf._normalize1 / x: (1, 40678191033441941782344065743588371257125, -37, 135, 83, 'd') / result: (1, 9032372857085566982236827, 15, 83)

[3]libmpf._normalize1 / x: (0, 808612912566758876135071, -87, 80, 73, 'd') / result: (0, 6317288379427803719805, -80, 73)

[3]libmpf._normalize1 / x: (1, 834386477031889061659283, -82, 80, 73, 'd') / result: (1, 6518644351811633294213, -75, 73)

[2]libmpf._normalize1 / x: (0, 25, 0, 5, 14, 'd') / result: (0, 25, 0, 5)

[2]libmpf._normalize. / x: (0, 5120, -10, 13, 10, 'd') / result: (0, 5, 0, 3)

[2]libmpf._normalize. / x: (1, 2, 0, 2, 93, 'd') / result: (1, 1, 1, 1)

[2]libmpf._normalize1 / x: (1, 1, 2, 1, 93, 'd') / result: (1, 1, 2, 1)

[2]libmpf._normalize1 / x: (0, 5, 2, 3, 14, 'd') / result: (0, 5, 2, 3)

[2]libmpf._normalize. / x: (0, 4579, -10, 13, 10, 'd') / result: (0, 143, -5, 8)

[2]gammazeta.borwein_coefficients / n: 44 / result: [1, 3873, 2501313, 645841857, 89197072449, 7645568749633, 445228183146561, 18717908784336961, 593393713691775041, 14656048704367906881, 289247890890728165441, 4654188343307675652161, 62062644293574050205761, 695145432372819239129153, 6613967054256556005412929, 53964540029326450135683137, 380645307611361082623152193, 2337236001150819844045426753, 12567410198799989939481890881, 59483600260280678968908861505, 248952829354721923126210089025, 924968476019209149666546176065, 3061635266216689918541392793665, 9056688752915708423674295767105, 24012433887287196077436697333825, 57220292471361029888239744077889, 122884700621769470500551650988097, 238520136358337793591415386427457, 419782436272672814332548540551233, 672431159202272262479899288948801, 985030426555844461035095977644097, 1327550617965998662730689599524929, 1658857350728796625680296525451329, 1940583915092126921447235002323009, 2150085583235885271328356064579649, 2285415853341170168145974638956609, 2360705228963124441727607507800129, 2396384755359311583595245446385729, 2410581451125373414780474015633473, 2415233315472294774049959500861505, 2416455165917846903225172460589121, 2416702405755067930266949970055233, 2416738576815590799971857178841153, 2416741981150698834767613151432769, 2416742135893203745440147513823297]

[2]libmpf._normalize. / x: (0, 235865763225513294137944142764154484399, -128, 128, 108, 'd') / result: (0, 224939120507729810846275465740351, -108, 108)

[2]libmpf._normalize. / x: (0, 373838389916413667603494184660470824117, -128, 129, 108, 'd') / result: (0, 178260035474974473764178364114985, -107, 108)

[2]libmpf._normalize. / x: (0, 471731526451026588275888285528308968798, -128, 129, 108, 'd') / result: (0, 224939120507729810846275465740351, -107, 108)

[2]libmpf._normalize. / x: (0, 547663342255369772667394339939292885491, -128, 129, 108, 'd') / result: (0, 130573115886537974516724190697501, -106, 107)

[2]libmpf._normalize. / x: (0, 609704153141926961741438327424625308516, -128, 129, 108, 'd') / result: (0, 290729595728839379187316096985161, -107, 108)

[2]libmpf._normalize. / x: (0, 662158911336018179041315799406609162309, -128, 129, 108, 'd') / result: (0, 19733873347521370024720305186707, -103, 104)

[2]libmpf._normalize. / x: (0, 707597289676539882413832428292463453197, -128, 130, 108, 'd') / result: (0, 168704340380797358134706599305263, -106, 108)

[2]libmpf._normalize. / x: (0, 747676779832827335206988369320941648234, -128, 130, 108, 'd') / result: (0, 178260035474974473764178364114985, -106, 108)

[2]libmpf._normalize. / x: (0, 783529105480883066805338482703447369890, -128, 130, 108, 'd') / result: (0, 186807896013470427228293057132589, -106, 108)

[2]libmpf._normalize. / x: (0, 815961479056358957755126269716797453412, -128, 130, 108, 'd') / result: (0, 97270188219113225669279845919227, -105, 107)

[2]libmpf._normalize. / x: (0, 845569916367440255879382470188779792915, -128, 130, 108, 'd') / result: (0, 50399894497838035576306728731917, -104, 106)

[2]libmpf._normalize. / x: (0, 872807038389351994662195834082374467842, -128, 130, 108, 'd') / result: (0, 104046706961316108067297438869759, -105, 107)

[2]libmpf._normalize. / x: (0, 898024674561531473179259942170763646708, -128, 130, 108, 'd') / result: (0, 26763220863387926613666413491093, -103, 105)

[2]libmpf._normalize. / x: (0, 921501732171783440270888524599763709609, -128, 130, 108, 'd') / result: (0, 109851566812012605699406686377497, -105, 107)

[2]libmpf._normalize. / x: (0, 943463052902053176551776571056617937596, -128, 130, 108, 'd') / result: (0, 224939120507729810846275465740351, -106, 108)

[2]libmpf._normalize. / x: (0, 964092542707436388533618453782160823124, -128, 130, 108, 'd') / result: (0, 229857574154719445355801213689365, -106, 108)

[2]libmpf._normalize. / x: (0, 983542543058340629344932512085096132633, -128, 130, 108, 'd') / result: (0, 234494815601906926475747230550073, -106, 108)

[2]libmpf._normalize. / x: (0, 1001940665085028176765209190381475025080, -128, 130, 108, 'd') / result: (0, 29860158714205866359627520751401, -103, 105)

[2]libmpf._normalize. / x: (0, 1019394868706396360943282625467601854289, -128, 130, 108, 'd') / result: (0, 60760669035100719984965480891919, -104, 106)

[2]libmpf._normalize. / x: (0, 1035997301252431846644809984067079986426, -128, 130, 108, 'd') / result: (0, 247001004517658197079851623551149, -106, 108)

[2]libmpf._normalize. / x: (0, 1051827242281872251893070412480951937811, -128, 130, 108, 'd') / result: (0, 125387578282579452025064279136771, -105, 107)

[2]libmpf._normalize. / x: (0, 1066953393263283170571979936944819388518, -128, 130, 108, 'd') / result: (0, 127190755994711300202844135397055, -105, 107)

[2]libmpf._normalize. / x: (0, 1081435679592953550017326612952934277314, -128, 130, 108, 'd') / result: (0, 64458589529571148754198945340689, -104, 106)

[2]libmpf._normalize. / x: (0, 1095326684510739545334788679878585770983, -128, 130, 108, 'd') / result: (0, 130573115886537974516724190697501, -105, 107)

[2]libmpf._normalize. / x: (0, 1108672801614865288800139976846528952241, -128, 130, 108, 'd') / result: (0, 132164097024782334423081872087303, -105, 107)

[2]libmpf._normalize. / x: (0, 1121515169749241002810482553981412472351, -128, 130, 108, 'd') / result: (0, 133695026606230855323133773086239, -105, 107)

[2]libmpf._normalize. / x: (0, 1133890437787044767317204084934918131107, -128, 130, 108, 'd') / result: (0, 33792568379254483202612521795479, -103, 105)

[2]libmpf._normalize. / x: (0, 1145831395150803377661844207503935129811, -128, 130, 108, 'd') / result: (0, 136593746560907766540270353258125, -105, 107)

[2]libmpf._normalize. / x: (0, 1157367495397296734408832667363918194008, -128, 130, 108, 'd') / result: (0, 137968956875478832055191119595041, -105, 107)

[2]libmpf._normalize. / x: (0, 1168525293918422276072233667618309571194, -128, 130, 108, 'd') / result: (0, 278598140220265931146677414803101, -106, 108)

[2]libmpf._normalize. / x: (0, 1179328816127566470689720713820772421995, -128, 130, 108, 'd') / result: (0, 140586950317331131778922166087719, -105, 107)

[2]libmpf._normalize. / x: (0, 1189799868972772625358620454377268277529, -128, 130, 108, 'd') / result: (0, 283670394175713688220648873895947, -106, 108)

[2]libmpf._normalize. / x: (0, 1199958305932949682671562596546315307523, -128, 130, 108, 'd') / result: (0, 286092354281651898067370080124453, -106, 108)

[2]libmpf._normalize. / x: (0, 1209822253591387951708710139345902047801, -128, 130, 108, 'd') / result: (0, 288444102666708934714486632191157, -106, 108)

[2]libmpf._normalize. / x: (0, 1219408306283853923482876654849250617032, -128, 130, 108, 'd') / result: (0, 290729595728839379187316096985161, -106, 108)

[2]libmpf._normalize. / x: (0, 1228731694071791204327558965716178936436, -128, 130, 108, 'd') / result: (0, 146476232298826122799820776667139, -105, 107)

[2]libmpf._normalize. / x: (0, 1237806428310541470903153333145629509479, -128, 130, 108, 'd') / result: (0, 36889506230072422948573629055787, -103, 105)

[2]libmpf._normalize. / x: (0, 1246645428305765662265690018742845291959, -128, 130, 108, 'd') / result: (0, 297223431660119453016684059797011, -106, 108)

[2]libmpf._normalize. / x: (0, 1255260631931909655081226768231756338688, -128, 130, 108, 'd') / result: (0, 74819364066833833162857697500691, -104, 106)

[2]libmpf._normalize. / x: (0, 1263663092589623034963219892289960961404, -128, 130, 108, 'd') / result: (0, 301280758998304136982731793472757, -106, 108)

[2]libmpf._normalize. / x: (0, 1271863064477945140782754126831234470825, -128, 130, 108, 'd') / result: (0, 303235784644590649791420489986237, -106, 108)

[2]libmpf._normalize. / x: (0, 1279870077831513007753128971536171779302, -128, 130, 108, 'd') / result: (0, 19071550336949721094267502002957, -102, 104)

[2]libmpf._normalize. / x: (0, 1287693005507385546031014555245106422210, -128, 130, 108, 'd') / result: (0, 153504968346045678380848712354315, -105, 107)

[2]libmpf._normalize. / x: (0, 10883328973857472733573852600, -93, 94, 93, 'd') / result: (0, 1360416121732184091696731575, -90, 91)

[2]libmpf._normalize. / x: (0, 696651008624929953531278076, -93, 90, 93, 'd') / result: (0, 174162752156232488382819519, -91, 88)

[2]libmpf._normalize. / x: (0, 7370805100797290441810754461379827637, -123, 123, 103, 'd') / result: (0, 7029347515866556588946108304385, -103, 103)

[2]libmpf._normalize1 / x: (1, 7029347515866556588946108304385, -102, 103, 103, 'd') / result: (1, 7029347515866556588946108304385, -102, 103)

[2]libmpf._normalize1 / x: (1, 7029347515866556588946108304385, -101, 103, 103, 'd') / result: (1, 7029347515866556588946108304385, -101, 103)

[2]libmpf._normalize. / x: (0, 649037107316853453566312041152635, -111, 110, 97, 'd') / result: (0, 1, -2, 1)

[2]libmpf._normalize. / x: (1, 158688483051174742767386573443646511275, -127, 127, 97, 'd') / result: (1, 147790166597044787153030348423, -97, 97)

[2]libmpf._normalize. / x: (1, 61367643398179103109628142089433117503, -127, 126, 97, 'd') / result: (1, 57153071647676735287185890683, -97, 96)

[3]libmpf._normalize1 / x: (1, 147790166597044787153030348423, -99, 97, 93, 'd') / result: (1, 1154610676539412399633049597, -92, 90)

[3]libmpf._normalize1 / x: (1, 57153071647676735287185890683, -99, 96, 93, 'd') / result: (1, 7144133955959591910898236335, -96, 93)

[2]libmpf._normalize1 / x: (0, 6106370833680933499229546493, -92, 93, 93, 'd') / result: (0, 6106370833680933499229546493, -92, 93)

[2]libmpf._normalize1 / x: (0, 7144133955959591910898236335, -96, 93, 93, 'd') / result: (0, 7144133955959591910898236335, -96, 93)

[3]libmpf._normalize1 / x: (0, 9596706428138564622996663802768315504479738507464355588769, -192, 193, 83, 'd') / result: (0, 7393033710978213835534547, -82, 83)

[3]libmpf._normalize1 / x: (0, 267074812508814372276571666236306420150848399655028750065, -187, 188, 83, 'd') / result: (0, 3291951224334926760682425, -81, 82)

[3]libmpf._normalize1 / x: (1, 1210976208858400663758791191237675173009682807099602689, -186, 180, 83, 'd') / result: (1, 3821167153284588010783225, -88, 82)

[3]libmpf._normalize1 / x: (0, 538307410407290510246813, -79, 79, 73, 'd') / result: (0, 4205526643806957111303, -72, 72)

[3]libmpf._normalize1 / x: (1, 624846012241142195549177, -86, 80, 73, 'd') / result: (1, 4881609470633923402727, -79, 73)

[7]gammazeta.mpc_zeta / s: ((0, 3, 0, 2), (0, 1, 2, 1)) / prec: 73 / rnd: d / alt: 0 / force: False / result: ((0, 4205526643806957111303, -72, 72), (1, 4881609470633923402727, -79, 73))

[2]libmpf._normalize. / x: (0, 995610453248924340922087778488, -98, 100, 78, 'd') / result: (0, 237372029602271161299249, -76, 78)

[2]libmpf._normalize1 / x: (1, 237372029602271161299249, -75, 78, 78, 'd') / result: (1, 237372029602271161299249, -75, 78)

[2]libmpf._normalize. / x: (0, 10357951138428894265902708163, -85, 94, 79, 'd') / result: (0, 158049791540968235258525, -69, 78)

[2]libmpf._normalize. / x: (1, 10357878895237373835104905647, -85, 94, 79, 'd') / result: (1, 79024344598673811608161, -68, 77)

[3]libmpf._normalize1 / x: (0, 79024344598673811608161, -68, 77, 73, 'd') / result: (0, 2469510768708556612755, -63, 72)

[2]libmpf._normalize. / x: (0, 2350818717208688087749020262268575297768527372502099, -169, 171, 149, 'd') / result: (0, 560478858282253286301856103484290909235126345, -147, 149)

[2]libmpf._normalize. / x: (0, 149106301848288270766981228005913, -106, 107, 86, 'd') / result: (0, 17774856310878785940048841, -83, 84)

[2]libmpf._normalize1 / x: (1, 17774856310878785940048841, -82, 84, 86, 'd') / result: (1, 17774856310878785940048841, -82, 84)

[2]libmpf._normalize1 / x: (1, 17774856310878785940048841, -81, 84, 86, 'd') / result: (1, 17774856310878785940048841, -81, 84)

[2]libmpf._normalize. / x: (0, 32109964815011033618781243090, -100, 95, 80, 'd') / result: (0, 489959179916550195599079, -84, 79)

[2]libmpf._normalize. / x: (0, 625145603377287067022872822259822, -110, 109, 80, 'd') / result: (0, 4548532912866263846975, -73, 72)

[2]libmpf._normalize. / x: (1, 1137624560773440174054392214698167, -110, 110, 80, 'd') / result: (1, 264873858721330802434681, -78, 78)

[3]libmpf._normalize1 / x: (0, 2228595455811391902237675320298394889306936025, -157, 151, 76, 'd') / result: (0, 58990430536670754349477, -82, 76)

[3]libmpf._normalize1 / x: (1, 129777378600435416768426067926828481104561258799, -162, 157, 76, 'd') / result: (1, 53674665763117176723643, -81, 76)

[3]libmpf._normalize1 / x: (0, 4806972730895482234663111, -90, 82, 76, 'd') / result: (0, 75108948920241909916611, -84, 76)

[3]libmpf._normalize1 / x: (1, 4373805248002773604534575, -89, 82, 76, 'd') / result: (1, 17085176750010834392713, -81, 74)

[3]libmpf._normalize1 / x: (0, 42192027969440814615777650460435980734854315, -144, 145, 73, 'd') / result: (0, 2233627362599457885293, -70, 71)

[3]libmpf._normalize1 / x: (0, 185482358184918312138471768912953734668973305, -147, 148, 73, 'd') / result: (0, 1227419285289446527051, -70, 71)

[3]libmpf._normalize1 / x: (0, 1208369942983287953517877745096752766766815789, -149, 150, 73, 'd') / result: (0, 7996321517020666040925, -72, 73)

[3]libmpf._normalize1 / x: (0, 649825200460996701214764696907880887532359973, -149, 149, 73, 'd') / result: (0, 8600364917915540049993, -73, 73)

[3]libmpf._normalize1 / x: (0, 947518592128668062001118988889921410124467769, -152, 150, 53, 'n') / result: (0, 2989841497201439, -54, 52)

[3]libmpf._normalize1 / x: (1, 3281680284545795733827365469279349638050478235, -153, 152, 53, 'n') / result: (1, 323598659989093, -50, 49)

[5]gammazeta.mpc_zeta / s: ((1, 1, 1, 1), (1, 1, 2, 1)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 2989841497201439, -54, 52), (1, 323598659989093, -50, 49))

zeta_ / result: (0.165969543508639 - 0.287413346446191j) / count: 1907
zeta / count: 0 / s: Complex { re: -2.0, im: -4.0 }
gamma_ / s: (3.0, 4.0) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(3+4j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(3+4j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=3.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=4.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -50, 53, 53, 'd') / result: (0, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -50, 53, 53, 'd') / result: (0, 1, 2, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, 0, 2), (0, 1, 2, 1)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='3.0', imag='4.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, 0, 2), (0, 1, 2, 1)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3, 0, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, 0, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 0, 2), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, 2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (3+4j) / result: (3.0 + 4.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (3+4j) / result: (3.0 + 4.0j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 3, 0, 2), (0, 1, 2, 1)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 3, 0, 2), (0, 1, 2, 1)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 3, 0, 2), (0, 1, 2, 1)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 3, 0, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, 2, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=12 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 0, 2), prec=77 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=77 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2580145578379571703451627185766400, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2580145578379571703451627185766400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1607587000734683441577323187404800, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1607587000734683441577323187404800 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=2115620184325601055735808, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2115620184325601055735808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=2115620184325601055735808, y=604462909807314587353088, prec=77 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=77, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 7, 1, 3), (0, 1, 2, 1)), prec=77, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 7, 1, 3), b=(0, 1, 2, 1), prec=77, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 7, 1, 3), t=(0, 7, 1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 2, 1), t=(0, 1, 2, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 49, 2, 6), t=(0, 1, 4, 1), prec=97, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=53 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=53, exp=2, bc=6, prec=97, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 53, 2, 6, 97, 'd') / result: (0, 53, 2, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 53, 2, 6, 97, 'd') / result: (0, 53, 2, 6)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 53, 2, 6), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=211 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=211, exp=0, bc=8, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 211, 0, 8, 10, 'd') / result: (0, 211, 0, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 211, 0, 8, 10, 'd') / result: (0, 211, 0, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 53, 2, 6), prec=77, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=53, n=91 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=131221644164250309139307167744, prec=97 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=97, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=848784975782783983595008141886, exp=-97, prec=77, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=848784975782783983595008141886 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=848784975782783983595008141886, exp=-97, bc=100, prec=77, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 848784975782783983595008141886, -97, 100, 77, 'd') / result: (0, 50591526972221373533905, -73, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 848784975782783983595008141886, -97, 100, 77, 'd') / result: (0, 50591526972221373533905, -73, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 50591526972221373533905, -73, 76), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 7, 1, 3), (0, 1, 2, 1)), prec=77, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 1, 2, 1), x=(0, 7, 1, 3), prec=77, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 1, 2, 1), t=(0, 7, 1, 3), prec=81, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=88424288520384305349937445 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=88424288520384305349937445, exp=-88, bc=87, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 88424288520384305349937445, -88, 87, 81, 'd') / result: (0, 345407377032751192773193, -80, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 88424288520384305349937445, -88, 87, 81, 'd') / result: (0, 345407377032751192773193, -80, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 345407377032751192773193, -80, 79), prec=81, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 345407377032751192773193, -80, 79), prec=112 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=1483513388152807893865855480496128, prec=112 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=36, prec=112 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=111 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1445014445183553422088253083001917, exp=-112, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1445014445183553422088253083001917 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=1445014445183553422088253083001917, exp=-112, bc=111, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1445014445183553422088253083001917, -112, 111, 81, 'd') / result: (0, 336443643361226055325999, -80, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1445014445183553422088253083001917, -112, 111, 81, 'd') / result: (0, 336443643361226055325999, -80, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 336443643361226055325999, -80, 79), prec=77, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=336443643361226055325999, exp=-80, bc=79, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 336443643361226055325999, -80, 79, 77, 'd') / result: (0, 84110910840306513831499, -78, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 336443643361226055325999, -80, 79, 77, 'd') / result: (0, 84110910840306513831499, -78, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 50591526972221373533905, -74, 76), prec=77 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 84110910840306513831499, -78, 77), prec=77 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3319740492380150167114529, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3319740492380150167114529 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1581977098749908995173575, exp=-77, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1581977098749908995173575 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((0, 3319740492380150167114529, -77, 82), (0, 1581977098749908995173575, -77, 81)), prec=77, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(0, 3319740492380150167114529, -77, 82), prec=81, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=19040000885036248465378287692, prec=95 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=64060108444003392529439492822, exp=-64, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=64060108444003392529439492822 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=64060108444003392529439492822, exp=-64, bc=96, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 64060108444003392529439492822, -64, 96, 81, 'd') / result: (0, 1954959364135845719282211, -49, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 64060108444003392529439492822, -64, 96, 81, 'd') / result: (0, 1954959364135845719282211, -49, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(0, 1581977098749908995173575, -77, 81), prec=81, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=1581977098749908995173575, exp=-77, mag=4, wp=91 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=114, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=2710037109561721866485676629490391, prec=111 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1305552210197735177673676548218893, exp=-111, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1305552210197735177673676548218893 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=1305552210197735177673676548218893, exp=-111, bc=111, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 1305552210197735177673676548218893, -111, 111, 81, 'd') / result: (1, 1215890245696283111044835, -81, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 1305552210197735177673676548218893, -111, 111, 81, 'd') / result: (1, 1215890245696283111044835, -81, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-2243996455709203800126204385747819, exp=-111, prec=81, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2243996455709203800126204385747819 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=2243996455709203800126204385747819, exp=-111, bc=111, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 2243996455709203800126204385747819, -111, 111, 81, 'd') / result: (1, 522471139139776071562945, -79, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 2243996455709203800126204385747819, -111, 111, 81, 'd') / result: (1, 522471139139776071562945, -79, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1954959364135845719282211, -49, 81), t=(1, 1215890245696283111044835, -81, 81), prec=77, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=2377016021585382852926987844060576204862438930185, exp=-130, bc=161, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 2377016021585382852926987844060576204862438930185, -130, 161, 77, 'd') / result: (1, 122888848048959865130493, -46, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 2377016021585382852926987844060576204862438930185, -130, 161, 77, 'd') / result: (1, 122888848048959865130493, -46, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1954959364135845719282211, -49, 81), t=(1, 522471139139776071562945, -79, 79), prec=77, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1021409845952027603665752467755219062214305271395, exp=-128, bc=160, prec=77, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 1021409845952027603665752467755219062214305271395, -128, 160, 77, 'd') / result: (1, 105611302755286478504843, -45, 77)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 1021409845952027603665752467755219062214305271395, -128, 160, 77, 'd') / result: (1, 105611302755286478504843, -45, 77)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((1, 122888848048959865130493, -46, 77), (1, 105611302755286478504843, -45, 77)), w=((0, 2084225, 13, 21), (1, 20777575, 9, 25)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 2084225, 13, 21), t=(0, 2084225, 13, 21), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 20777575, 9, 25), t=(1, 20777575, 9, 25), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 4343993850625, 26, 42), t=(0, 431707622880625, 18, 49), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1543770048640625 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1543770048640625, exp=18, bc=51, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1543770048640625, 18, 51, 63, 'd') / result: (0, 1543770048640625, 18, 51)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1543770048640625, 18, 51, 63, 'd') / result: (0, 1543770048640625, 18, 51)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 122888848048959865130493, -46, 77), t=(0, 2084225, 13, 21), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 105611302755286478504843, -45, 77), t=(1, 20777575, 9, 25), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 256128009324843374901601772925, -33, 98), t=(0, 2194346763845671453620263295725, -36, 101), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=145322689246924454407449112325 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=145322689246924454407449112325, exp=-36, bc=97, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 145322689246924454407449112325, -36, 97, 63, 'd') / result: (0, 8458893818718174845, -2, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 145322689246924454407449112325, -36, 97, 63, 'd') / result: (0, 8458893818718174845, -2, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 105611302755286478504843, -45, 77), t=(0, 2084225, 13, 21), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 122888848048959865130493, -46, 77), t=(1, 20777575, 9, 25), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 220117717485136960661756401675, -32, 98), t=(0, 2553332257000867269738703094475, -37, 102), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 220117717485136960661756401675, -32, 98), t=(0, 2553332257000867269738703094475, -37, 102), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9597099216525250010914907948075 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=9597099216525250010914907948075, exp=-37, bc=103, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 9597099216525250010914907948075, -37, 103, 63, 'd') / result: (1, 545531930613677219, 7, 59)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 9597099216525250010914907948075, -37, 103, 63, 'd') / result: (1, 545531930613677219, 7, 59)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 8458893818718174845, -2, 63), t=(0, 1543770048640625, 18, 51), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=771153366629370571 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=771153366629370571, exp=-67, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 771153366629370571, -67, 60, 53, 'n') / result: (0, 3012317838395979, -59, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 771153366629370571, -67, 60, 53, 'n') / result: (0, 3012317838395979, -59, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 545531930613677219, 7, 59), t=(0, 1543770048640625, 18, 51), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=795732953102006017 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=795732953102006017, exp=-62, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 795732953102006017, -62, 60, 53, 'n') / result: (1, 3108331848054711, -54, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 795732953102006017, -62, 60, 53, 'n') / result: (1, 3108331848054711, -54, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 3012317838395979, -59, 52), (1, 3108331848054711, -54, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (0.00522553847136921 - 0.1725470792943j) / count: 164
gamma__ / s: Complex { re: 3.0, im: 4.0 } / result: Complex { re: 0.0052255384713692146, im: -0.1725470792943002 }
zeta / count: 1 / s: Complex { re: 3.0, im: 4.0 }
zeta__ / s: Complex { re: -2.0, im: -4.0 } / result: Complex { re: 0.1659695435086394, im: -0.28741334644619076 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (2.5, -3.5) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(2.5-3.5j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(2.5-3.5j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(2.5-3.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=2.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=-3.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-7881299347898368, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7881299347898368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=7881299347898368, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7881299347898368, -51, 53, 53, 'd') / result: (1, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7881299347898368, -51, 53, 53, 'd') / result: (1, 7, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, -1, 3), (1, 7, -1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.5', imag='-3.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, -1, 3), (1, 7, -1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 7, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 7, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=516508834063867445248, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=350000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=350000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2.5-3.5j) / result: (2.5 - 3.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2.5-3.5j) / result: (2.5 - 3.5j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5, -1, 3), (1, 7, -1, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 5, -1, 3), (1, 7, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 5, -1, 3), y=(1, 7, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 7, -1, 3), t=(1, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 25, -2, 5), t=(0, 49, -2, 6), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=74 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=74, exp=-2, bc=7, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 74, -2, 7, 14, 'd') / result: (0, 37, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 74, -2, 7, 14, 'd') / result: (0, 37, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 37, -1, 6), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=19398656 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=19398656 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=19398656 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4404, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4404 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4404, exp=-10, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4404, -10, 13, 10, 'd') / result: (0, 275, -6, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4404, -10, 13, 10, 'd') / result: (0, 275, -6, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 275, -6, 9), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 275, -6, 9), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 5, -1, 3), (1, 7, -1, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 5, -1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 5, -1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3, exp=-1, bc=2, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 3, -1, 2, 73, 'd') / result: (1, 3, -1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 3, -1, 2, 73, 'd') / result: (1, 3, -1, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(1, 7, -1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(1, 7, -1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=7, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 7, -1, 3, 73, 'd') / result: (0, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 7, -1, 3, 73, 'd') / result: (0, 7, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 3, -1, 2), (0, 7, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 3, -1, 2), y=(0, 7, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3, -1, 2), t=(1, 3, -1, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 7, -1, 3), t=(0, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, -2, 4), t=(0, 49, -2, 6), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=58 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=58, exp=-2, bc=6, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 58, -2, 6, 14, 'd') / result: (0, 29, -1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 58, -2, 6, 14, 'd') / result: (0, 29, -1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 29, -1, 5), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=15204352 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=15204352 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=15204352 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3899, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3899 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3899, exp=-10, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3899, -10, 12, 10, 'd') / result: (0, 487, -7, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3899, -10, 12, 10, 'd') / result: (0, 487, -7, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 5, -1, 3), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 5, -1, 3), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 5, -1, 3) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 7, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=35 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 35 / result: [1, 2451, 1002051, 163736931, 14298423651, 773802256739, 28392123459939, 750110451165539, 14895789674195299, 229577274353117539, 2814794310907717987, 27995479731894085987, 229440963099785029987, 1569518301688647248227, 9056934542693083769187, 44480158965652004137315, 187315741316292812073315, 680747753073051966761315, 2146945730864564883548515, 5905251215900562431273315, 14231343367364926229309795, 30187269093167713995581795, 56634300317331319933757795, 94503382707872831045232995, 141235441828115546884925795, 190752350185727828648126819, 235564031957322653773195619, 269947838096533777454066019, 292096367765428215565379939, 303914276517978060946008419, 309042047095355620975569251, 310804633491598568632478051, 311266263262043150161668451, 311352778491748847958747491, 311363108668430125307652451, 311363698964240484013304163]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 35 / result: [1, 2451, 1002051, 163736931, 14298423651, 773802256739, 28392123459939, 750110451165539, 14895789674195299, 229577274353117539, 2814794310907717987, 27995479731894085987, 229440963099785029987, 1569518301688647248227, 9056934542693083769187, 44480158965652004137315, 187315741316292812073315, 680747753073051966761315, 2146945730864564883548515, 5905251215900562431273315, 14231343367364926229309795, 30187269093167713995581795, 56634300317331319933757795, 94503382707872831045232995, 141235441828115546884925795, 190752350185727828648126819, 235564031957322653773195619, 269947838096533777454066019, 292096367765428215565379939, 303914276517978060946008419, 309042047095355620975569251, 310804633491598568632478051, 311266263262043150161668451, 311352778491748847958747491, 311363108668430125307652451, 311363698964240484013304163]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(1, 7, -1, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-16366475065859399244528, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848905, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=22913065092203158942338, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8077313242061211361135, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-25940249248374962737460, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=246110857000076053784, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=36316348947724947832444, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6644845247441052670038, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1859219912222574184552261803842168549517388170837040929238074736709266287852125660133344654361699238633850283820378195230720, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1859219912222574184552261803842168549517388170837040929238074736709266287852125660133344654361699238633850283820378195230720 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3370341108608321263518825110743845980163044729350249719949547958058596941269921756915064179088752516523325009951795567398786745870671666142993633946633481055321827102779415353127108115981804556025886743013873983386275469388384851698899179429690824469037764674078015 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3370341108608321263518825110743845980163044729350249719949547958058596941269921756915064179088752516523325009951795567398786745870671666142993633946633481055321827102779415353127108115981804556025886743013873983386275469388384851698899179429690824469037764674078015 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-32732950131718798489058, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697808, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=45826130184406317884680, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1318874633980475141071, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=361514982932167202551828684080421662406158810996091291796292309915690667082357767248150349459219296401026444076184649072640, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=361514982932167202551828684080421662406158810996091291796292309915690667082357767248150349459219296401026444076184649072640 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=584931139990927060780622514783356725103887497033586242463174474209292946366151371834663568892121081031030472965419574422167230110365687382583920545972764299794846620167034662356103390445309141665208926707257856315654194819768876114661494154427286119813119933167 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=584931139990927060780622514783356725103887497033586242463174474209292946366151371834663568892121081031030472965419574422167230110365687382583920545972764299794846620167034662356103390445309141665208926707257856315654194819768876114661494154427286119813119933167 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-38001778269692433100635, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1277761888370125086231, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=53202489577569406340889, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8695234027143563597280, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2427314885401694074276564021682831161869923445259470102060819795148208764695830722951866632083329561549748981654382643773440, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2427314885401694074276564021682831161869923445259470102060819795148208764695830722951866632083329561549748981654382643773440 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5086759501408743462018579340916875705420374426665714776721472050106120913889090088788673880866580420205455300634456656030747386395465684470472956236488055699548525193918859588491746138873432978036623725331583721567169979466661796924446365691661798089294927874275776 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5086759501408743462018579340916875705420374426665714776721472050106120913889090088788673880866580420205455300634456656030747386395465684470472956236488055699548525193918859588491746138873432978036623725331583721567169979466661796924446365691661798089294927874275776 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-42306724314234361981988, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3519405870171955902689, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=59229414039928106774782, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14722158489502264031173, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4121270805426706109090846998516806951430210445355440726477732333038873604738878546628913983835099978971701462468504999428096, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4121270805426706109090846998516806951430210445355440726477732333038873604738878546628913983835099978971701462468504999428096 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128958952749668971534133025916060141338470315143641182618824980754738142295599464795804868635928800557344781990609816989310530558224284745689820769193314069799563561557096619498928050492520592212741282671111507673723263193119709963850692869301167765155919147892172647 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128958952749668971534133025916060141338470315143641182618824980754738142295599464795804868635928800557344781990609816989310530558224284745689820769193314069799563561557096619498928050492520592212741282671111507673723263193119709963850692869301167765155919147892172647 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-45946504332873434817233, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6426215877876642765255, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=64325106066022808744125, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4982098665455018419313, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1394414934166930638414196352881626412138041128127780696928556052531949715889094245100008490771274428975387712865283646423040, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1394414934166930638414196352881626412138041128127780696928556052531949715889094245100008490771274428975387712865283646423040 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2041484205495685452533974683005572584892285105224967349637674385540953525490597461379259086743077539231012868857247076058354711742779621034104621576516572568043331233554557108706096004092846596468401455718614086644048172335854882821021658221069114710306359179043135 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2041484205495685452533974683005572584892285105224967349637674385540953525490597461379259086743077539231012868857247076058354711742779621034104621576516572568043331233554557108706096004092846596468401455718614086644048172335854882821021658221069114710306359179043135 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-49099425197578197733588, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848900, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=68739195276609476827022, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9396187876041686502210, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2623565876136299127090413878755060064318981085514491089035949906245297983969110653743719678932620036738877622724311453270016, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2623565876136299127090413878755060064318981085514491089035949906245297983969110653743719678932620036738877622724311453270016 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5650407483382731245966163106993506325096556995592818152860589018050589398960725979215080803501318989586336898555412825072620254887827475194883665351713910772583223275921709101053859902851680097384623869687953970190039779833948232032514752139093298327205795140865087 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5650407483382731245966163106993506325096556995592818152860589018050589398960725979215080803501318989586336898555412825072620254887827475194883665351713910772583223275921709101053859902851680097384623869687953970190039779833948232032514752139093298327205795140865087 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-51880498496749925474920, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=492221714000152107568, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=72632697895449895664888, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13289690494882105340076, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3718439824445148369104523607684337099034776341674081858476149473418532575704251320266689308723398477267700567640756390461440, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3718439824445148369104523607684337099034776341674081858476149473418532575704251320266689308723398477267700567640756390461440 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125517413387155378090326863478834296779009472656397171216970201532526741402657384449535720665030052808801186398782125747979546604134132892683188757840947797535329000983230275523072624503992158586857263708234930456266653802221361896903056148392603185556410193897417152 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=125517413387155378090326863478834296779009472656397171216970201532526741402657384449535720665030052808801186398782125747979546604134132892683188757840947797535329000983230275523072624503992158586857263708234930456266653802221361896903056148392603185556410193897417152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-54368253335551832345165, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4551056901542004935134, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=76115554669772565283231, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1936795419062827377216, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=537107974642076986648431187776626469860578804908478490668777146160454705379502968482966233482268668938667859770331478622208, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=537107974642076986648431187776626469860578804908478490668777146160454705379502968482966233482268668938667859770331478622208 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1281450327576983882164692566435725404722963650120417850200534411982232914483249780716959236033774323010036610290159513663832893999465266031568307512225761517804602858899484648920470406220014556002054967399740698883782844350538761795880947204413904765482062726000 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1281450327576983882164692566435725404722963650120417850200534411982232914483249780716959236033774323010036610290159513663832893999465266031568307512225761517804602858899484648920470406220014556002054967399740698883782844350538761795880947204413904765482062726000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-56618701328472947742138, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2300608908620889538161, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=79266181859862126838992, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5087422609152388932977, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1415072933191625907131443706257650507132678774470414485031201327384274896865228974657045653597515531626874938241065626370048, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1415072933191625907131443706257650507132678774470414485031201327384274896865228974657045653597515531626874938241065626370048 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2096499312427618531023081160551091996580485104538989096168156425098654149099070953950007861266951868909783631901206858330214234325630322953967803892734153772517766787802186439146776158169013401973070596880740726006362935258528404549859528193536172550381032097898655 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2096499312427618531023081160551091996580485104538989096168156425098654149099070953950007861266951868909783631901206858330214234325630322953967803892734153772517766787802186439146776158169013401973070596880740726006362935258528404549859528193536172550381032097898655 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-58673199380093761226518, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=246110857000076053781, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=82142479132131265717124, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7963719881421527811109, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2220734895154741387104090487922590211923546981833132221034367046624956954934483427381495003820918535034876727896562844303360, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2220734895154741387104090487922590211923546981833132221034367046624956954934483427381495003820918535034876727896562844303360 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4468593787234823649013836399452663261648860250864479386239617990213394283599690698278162259132091218152792288876875862782667198581941906471252724973414172418533552124652637385200636116125249150216984928331356572150219966587937922867308088509485610704142406323247255 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4468593787234823649013836399452663261648860250864479386239617990213394283599690698278162259132091218152792288876875862782667198581941906471252724973414172418533552124652637385200636116125249150216984928331356572150219966587937922867308088509485610704142406323247255 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-60563154379671968093198, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4902745883765628884912, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=84788416131540755330476, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10609656880831017424461, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2964422860043771060924995209459457631730502250167948592729596941308663470075333691434832865565598230488416841424714122395648, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2964422860043771060924995209459457631730502250167948592729596941308663470075333691434832865565598230488416841424714122395648 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=104606174738217088212724373898153549101930770523173494221954724361369897437024110391277924994095335592448264752966221544753165349207029445549572500623654076393904948138421690991410314097543996563279497800822799441152319963519672142142352419548340134251962176147208220 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=104606174738217088212724373898153549101930770523173494221954724361369897437024110391277924994095335592448264752966221544753165349207029445549572500623654076393904948138421690991410314097543996563279497800822799441152319963519672142142352419548340134251962176147208220 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-62312979398732834061760, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3152920864704762916350, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=87238171158225967686464, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13059411907516229780449, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3646136827858714928594157870868252766553544579474863600116891011435394442287779766817059238831554617987495278825519460646912, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3646136827858714928594157870868252766553544579474863600116891011435394442287779766817059238831554617987495278825519460646912 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=124286954942139054485356252133394602819485232057599699891840868264716394597826368984189026856991107068065310029563359411886740821803231077603655918176784836973912727715982510030094753858429669597525700150011198794848982149364298830072635820450227012828419224819654172 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=124286954942139054485356252133394602819485232057599699891840868264716394597826368984189026856991107068065310029563359411886740821803231077603655918176784836973912727715982510030094753858429669597525700150011198794848982149364298830072635820450227012828419224819654172 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-63942027518067395838098, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1523872745370201140012, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=89518838525294354173336, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=504327424442668686118, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=134276993660519246662107796944156617465144701227119622667194286540113676344875742120741558370567167234666964942582869655552, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=134276993660519246662107796944156617465144701227119622667194286540113676344875742120741558370567167234666964942582869655552 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=316920027834410827028638536111825295036500546036149365022861314450339470249574037132547234375141151655317960737083459305162993711477159543831231444437443418008020624354908428199688478248118865172810489913514372995729853313169923357477939722209002610797272615 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=316920027834410827028638536111825295036500546036149365022861314450339470249574037132547234375141151655317960737083459305162993711477159543831231444437443418008020624354908428199688478248118865172810489913514372995729853313169923357477939722209002610797272615 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-65465900263437596978118, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697803, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=91652260368812635769364, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2637749267960950282146, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=733358965376682039462281044848855372309636445163499477643907257257543924652782899274819280331559144127796500840260288118784, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=733358965376682039462281044848855372309636445163499477643907257257543924652782899274819280331559144127796500840260288118784 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=37770177989741387721522353566983202763432449027769242671714276937846126129831285945564056572429321940092447217458001513440997972651276235236705484940010771728565006974959037873582530216300034893886456894355606025387803421048452553492554279845138005986840779912695 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=37770177989741387721522353566983202763432449027769242671714276937846126129831285945564056572429321940092447217458001513440997972651276235236705484940010771728565006974959037873582530216300034893886456894355606025387803421048452553492554279845138005986840779912695 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-66897358673950495825788, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5115131615830860850133, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=93656302143530694156102, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4641791042679008668884, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1291124939043454294827959586001505937164852896414611756415329678270323811008420597314822676640068915717951585986373746688000, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1291124939043454294827959586001505937164852896414611756415329678270323811008420597314822676640068915717951585986373746688000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=110872323027481200102188453499621118251037377570596491371954262420714756436417642237385827951033485131319054027876110067431329527014009678486901951130521993866661030706166684451127590901059717737307698999704591180734816881278453045771199216194028315657145247394780 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=110872323027481200102188453499621118251037377570596491371954262420714756436417642237385827951033485131319054027876110067431329527014009678486901951130521993866661030706166684451127590901059717737307698999704591180734816881278453045771199216194028315657145247394780 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-68246973562609324719450, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3765516727172031956471, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=95545762987653054607230, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6531251886801369120012, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1828232913685531281476390773778132407025431701323090247084106824430778516387923565797788910122337584656619445756705225310208, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1828232913685531281476390773778132407025431701323090247084106824430778516387923565797788910122337584656619445756705225310208 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3277340524529908773902204461785111341798775995104956374484690326797875579168457810296274965450528826023962590556871795516239703924000737095849781674551940864240432858655132373902315550475433098901056643236119982003998576913986737748266067655560646963764601683839055 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3277340524529908773902204461785111341798775995104956374484690326797875579168457810296274965450528826023962590556871795516239703924000737095849781674551940864240432858655132373902315550475433098901056643236119982003998576913986737748266067655560646963764601683839055 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-69523599730352559964235, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2488890559428796711686, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=97333039622493583949929, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8318528521641898462711, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2324024890278217730690327254802710686896735213546301161547593420886582859815157075166680817952124048292312854775472744038400, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2324024890278217730690327254802710686896735213546301161547593420886582859815157075166680817952124048292312854775472744038400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4779962453532919121286265820765225344264619522062747686481472314816414085949323897402741706189347487934165135485819216193965686341084041745190837800516796992015240261483205439593812410906481923320909985432444487793425980224052588435616942149798985220254293726065287 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4779962453532919121286265820765225344264619522062747686481472314816414085949323897402741706189347487934165135485819216193965686341084041745190837800516796992015240261483205439593812410906481923320909985432444487793425980224052588435616942149798985220254293726065287 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-70734728401411231589695, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 10270894946487260094768, -73, 74, 73, 'd') / result: (0, 641930934155453755923, -69, 70)

[2]libmpf._normalize. / x: (1, 1281778495995200943912, -73, 71, 73, 'd') / result: (1, 160222311999400117989, -70, 68)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[3]libmpf._normalize1 / x: (1, 20111124560928029791677783, -84, 85, 83, 'd') / result: (1, 5027781140232007447919445, -82, 83)

[3]libmpf._normalize1 / x: (0, 46925957308832069513914827, -84, 86, 83, 'd') / result: (0, 5865744663604008689239353, -81, 83)

[2]libmpf._normalize. / x: (0, 875355796481033436230186752, -91, 90, 77, 'd') / result: (0, 106854955625126151883567, -78, 77)

[2]libmpf._normalize. / x: (1, 122459426073192529994892652480633, -107, 107, 77, 'd') / result: (1, 114049227976419525216233, -77, 77)

[2]libmpf._normalize. / x: (0, 106450748625660638177697220127322, -107, 107, 77, 'd') / result: (0, 99139985279795376749427, -77, 77)

[3]libmpf._normalize1 / x: (1, 12186725194500204438292733259627248645914343111, -155, 154, 73, 'd') / result: (1, 5040311405701047220001, -74, 73)

[3]libmpf._normalize1 / x: (0, 10593598727748194887520029669462153613837966109, -155, 153, 73, 'd') / result: (0, 8762819484759726501881, -75, 73)

[3]libmpf._normalize1 / x: (0, 23929777337179628074785, -74, 75, 73, 'd') / result: (0, 747805541786863377337, -69, 70)

[2]libmpf._normalize1 / x: (1, 8762819484759726501881, -75, 73, 73, 'd') / result: (1, 8762819484759726501881, -75, 73)

[3]libmpf._normalize1 / x: (0, 2367323978950467643583535063199134766283124785, -150, 151, 63, 'd') / result: (0, 3824618162147887927, -61, 62)

[3]libmpf._normalize1 / x: (0, 62849056478232496851981993497091802938219837, -145, 146, 63, 'd') / result: (0, 812305016188190453, -59, 60)

[3]libmpf._normalize1 / x: (0, 1791040647093654673827978388527377058701787, -144, 141, 63, 'd') / result: (0, 1481514099570300339, -64, 61)

[3]libmpf._normalize1 / x: (0, 489734599250781265, -59, 59, 53, 'n') / result: (0, 7652103113293457, -53, 53)

[3]libmpf._normalize1 / x: (0, 446598690995496615, -63, 59, 53, 'n') / result: (0, 6978104546804635, -57, 53)

[7]gammazeta.mpc_zeta / s: ((0, 5, -1, 3), (1, 7, -1, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7652103113293457, -53, 53), (0, 6978104546804635, -57, 53))

zeta_ / result: (0.849554106318424 + 0.04842032710065j) / count: 586
zeta / count: 0 / s: Complex { re: 2.5, im: -3.5 }
zeta__ / s: Complex { re: 2.5, im: -3.5 } / result: Complex { re: 0.8495541063184239, im: 0.048420327100649994 } / z: Complex { re: NaN, im: NaN }
gamma_ / s: (-1.5, 3.5) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(-1.5+3.5j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(-1.5+3.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=-1.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-6755399441055744, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=6755399441055744, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 6755399441055744, -52, 53, 53, 'd') / result: (1, 3, -1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 6755399441055744, -52, 53, 53, 'd') / result: (1, 3, -1, 2)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=3.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7881299347898368, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7881299347898368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7881299347898368, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7881299347898368, -51, 53, 53, 'd') / result: (0, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7881299347898368, -51, 53, 53, 'd') / result: (0, 7, -1, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 3, -1, 2), (0, 7, -1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-1.5', imag='3.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 3, -1, 2), (0, 7, -1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(1, 3, -1, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 3, -1, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3, -1, 2), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -1, 2), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=150000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=150000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 7, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 7, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=516508834063867445248, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=350000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=350000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-1.5+3.5j) / result: (-1.5 + 3.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-1.5+3.5j) / result: (-1.5 + 3.5j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((1, 3, -1, 2), (0, 7, -1, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((1, 3, -1, 2), (0, 7, -1, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((1, 3, -1, 2), (0, 7, -1, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 3, -1, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 7, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_neg / f_locals: z=((1, 3, -1, 2), (0, 7, -1, 3)), prec=None, rnd='d' / f_lineno: 109 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2055 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3, -1, 2), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 111 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 111 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -1, 2), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 7, -1, 3), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=24545459619465760044611392241664000, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=24545459619465760044611392241664000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-19226539068908478474646895093350400, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=19226539068908478474646895093350400 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1095589024025757689577472, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1095589024025757689577472 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1095589024025757689577472, y=-264452523040700131966976, prec=76 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=76, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 29, -1, 5), (1, 7, -1, 3)), prec=76, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 29, -1, 5), b=(1, 7, -1, 3), prec=76, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 29, -1, 5), t=(0, 29, -1, 5), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 7, -1, 3), t=(1, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 841, -2, 10), t=(0, 49, -2, 6), prec=96, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=890 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=890, exp=-2, bc=10, prec=96, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 890, -2, 10, 96, 'd') / result: (0, 445, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 890, -2, 10, 96, 'd') / result: (0, 445, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 445, -1, 9), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=443 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=443, exp=-1, bc=9, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 443, -1, 9, 10, 'd') / result: (0, 443, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 443, -1, 9, 10, 'd') / result: (0, 443, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 445, -1, 9), prec=76, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=445, n=87 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=68860414685249277791263784960, prec=96 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=310119737917066478061981082229016277192540160, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=110654420101177527879572550212667636922351493552409867130503234858727988085288676056104960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=118692626847281605944922407499318154771257989741884075390465851610504638221448906499162112 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=122928116955997174680384225192748404519495962624667242895538388354881211595218631696318464 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125102207400194281731569694224395166684583357944119052715660424725788460958990372750491648 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126203629403301563937963054635238031863408230795270208343647268810807148620762628705222656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126757971504386573478332183677241121209651598967410309725248771465049731780747269330960384 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127036054980863865226268950741857274656318741509697297556464271878419810015048883440189440 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127175325409359941479569760857929424633316158925702822532500542679318825137057804333350912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=428222442783815248483333417548, exp=-96, prec=76, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=428222442783815248483333417548 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=428222442783815248483333417548, exp=-96, bc=99, prec=76, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 428222442783815248483333417548, -96, 99, 76, 'd') / result: (0, 51048093173958688793579, -73, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 428222442783815248483333417548, -96, 99, 76, 'd') / result: (0, 51048093173958688793579, -73, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 51048093173958688793579, -73, 76), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 29, -1, 5), (1, 7, -1, 3)), prec=76, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 7, -1, 3), x=(0, 29, -1, 5), prec=76, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 7, -1, 3), x=(0, 29, -1, 5), prec=76, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 7, -1, 3), t=(0, 29, -1, 5), prec=80, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=74703278232738464864602323 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=74703278232738464864602323, exp=-88, bc=86, prec=80, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 74703278232738464864602323, -88, 86, 80, 'd') / result: (0, 1167238722386538513509411, -82, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 74703278232738464864602323, -88, 86, 80, 'd') / result: (0, 1167238722386538513509411, -82, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 1167238722386538513509411, -82, 80), prec=80, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1167238722386538513509411, -82, 80), prec=112 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=1253313034818751496541843608305664, prec=112 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=30, prec=112 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=111 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=83627794494489836780758943522431355647426560, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=19584916517531435632535042351085649920, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=19584916517531435632535042351085649920, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=599081971716162792800173247904698754844491743936379854976712970717430248307907157154077721960991976893129535897677418463232, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=599081971716162792800173247904698754844491743936379854976712970717430248307907157154077721960991976893129535897677418463232 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=1588871075305525865419379460030217534595740708634698806173178087507923028245377627347005165356232436844840336832296059071392359596852662462463520123748659417175243696221502966350706410211868325177680901428690163675366618298995448127263661563819392567033593527296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1588871075305525865419379460030217534595740708634698806173178087507923028245377627347005165356232436844840336832296059071392359596852662462463520123748659417175243696221502966350706410211868325177680901428690163675366618298995448127263661563819392567033593527296 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=83627794494489836780758943522431355647426560, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=92487153332190796177447630054754112306398539144832628031488, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=92487153332190796177447630054754112306398539144832628031488, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=83627794494489836780758943522431355647426560, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=92487153332190796177447630054717574901121332617056142426213, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1229789077412560341410974248240133, exp=-112, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1229789077412560341410974248240133 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=1229789077412560341410974248240133, exp=-112, bc=110, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1229789077412560341410974248240133, -112, 110, 80, 'd') / result: (0, 286332582452464928247727, -80, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1229789077412560341410974248240133, -112, 110, 80, 'd') / result: (0, 286332582452464928247727, -80, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 286332582452464928247727, -80, 78), prec=76, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=286332582452464928247727, exp=-80, bc=78, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 286332582452464928247727, -80, 78, 76, 'd') / result: (0, 71583145613116232061931, -78, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 286332582452464928247727, -80, 78, 76, 'd') / result: (0, 71583145613116232061931, -78, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 71583145613116232061931, -78, 76), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 51048093173958688793579, -74, 76), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 71583145613116232061931, -78, 76), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1770312258832052663731219, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1770312258832052663731219 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-700662786324144749380822, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=700662786324144749380822 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_sin_pi / f_locals: z=((1, 3, -1, 2), (0, 7, -1, 3)), prec=76, rnd='d' / f_lineno: 518 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: f / f_locals: prec=81, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 522 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7964883625991394727376702227904 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7964883625991394727376702227904, exp=-101, bc=103, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7964883625991394727376702227904, -101, 103, 81, 'd') / result: (0, 474744059204542322598499, -77, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7964883625991394727376702227904, -101, 103, 81, 'd') / result: (0, 474744059204542322598499, -77, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 7, -1, 3), t=(0, 474744059204542322598499, -77, 79), prec=81, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 522 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3323208414431796258189493, exp=-78, bc=82, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3323208414431796258189493, -78, 82, 81, 'd') / result: (0, 830802103607949064547373, -76, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3323208414431796258189493, -78, 82, 81, 'd') / result: (0, 830802103607949064547373, -76, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin_pi / f_locals: x=(1, 3, -1, 2), prec=82, rnd='d' / f_lineno: 1381 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 526 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 3, -1, 2), prec=82, rnd='d', which=0, pi=1 / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1381 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_cosh_sinh / f_locals: x=(0, 830802103607949064547373, -76, 80), prec=82, rnd='d', tanh=0 / f_lineno: 1196 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 527 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1237 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_expneg_basecase / f_locals: x=47407484577196698039704123928, prec=96 / f_lineno: 1111 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1248 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=47407484577196698039704123928, prec=96 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1118 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=144127511223134630724058126051, exp=-82, prec=82, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1258 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=144127511223134630724058126051 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=144127511223134630724058126051, exp=-82, bc=97, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 144127511223134630724058126051, -82, 97, 82, 'd') / result: (0, 4398422583713825400514469, -67, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 144127511223134630724058126051, -82, 97, 82, 'd') / result: (0, 4398422583713825400514469, -67, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=144127511142011929008655675081, exp=-82, prec=82, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1259 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=144127511142011929008655675081 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=144127511142011929008655675081, exp=-82, bc=97, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 144127511142011929008655675081, -82, 97, 82, 'd') / result: (0, 4398422581238157013203603, -67, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 144127511142011929008655675081, -82, 97, 82, 'd') / result: (0, 4398422581238157013203603, -67, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, 0, 1), t=(0, 4398422583713825400514469, -67, 82), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 528 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4398422583713825400514469, exp=-67, bc=82, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4398422583713825400514469, -67, 82, 76, 'd') / result: (0, 34362676435264260941519, -60, 75)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4398422583713825400514469, -67, 82, 76, 'd') / result: (0, 34362676435264260941519, -60, 75)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(0, 4398422581238157013203603, -67, 82), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 529 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((0, 34362676435264260941519, -60, 75), (0, 0, 0, 0)), w=((1, 3, -1, 2), (0, 7, -1, 3)), prec=76, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 34362676435264260941519, -60, 75), t=(1, 3, -1, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(0, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 34362676435264260941519, -60, 75), t=(0, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(1, 3, -1, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 103088029305792782824557, -61, 77), t=(0, 0, 0, 0), prec=76, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 103088029305792782824557, -61, 77), t=(0, 0, 0, 0), prec=76, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=103088029305792782824557, exp=-61, bc=77, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 103088029305792782824557, -61, 77, 76, 'd') / result: (1, 25772007326448195706139, -59, 75)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 103088029305792782824557, -61, 77, 76, 'd') / result: (1, 25772007326448195706139, -59, 75)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 240538735046849826590633, -61, 78), t=(0, 0, 0, 0), prec=76, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=240538735046849826590633, exp=-61, bc=78, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 240538735046849826590633, -61, 78, 76, 'd') / result: (0, 30067341880856228323829, -58, 75)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 240538735046849826590633, -61, 78, 76, 'd') / result: (0, 30067341880856228323829, -58, 75)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: f / f_locals: prec=76, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 2167 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=248902613312231085230521944622 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=248902613312231085230521944622, exp=-96, bc=98, prec=76, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 248902613312231085230521944622, -96, 98, 76, 'd') / result: (0, 14835751850141947581203, -72, 74)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 248902613312231085230521944622, -96, 98, 76, 'd') / result: (0, 14835751850141947581203, -72, 74)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 14835751850141947581203, -72, 74), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2167 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((0, 1770312258832052663731219, -76, 81), (1, 350331393162072374690411, -75, 79)), prec=76, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2174 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(0, 1770312258832052663731219, -76, 81), prec=80, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=11013322670682958334239536730, prec=94 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=34538276128554342416501245685, exp=-61, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=34538276128554342416501245685 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=34538276128554342416501245685, exp=-61, bc=95, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 34538276128554342416501245685, -61, 95, 80, 'd') / result: (0, 527012270027989844001789, -45, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 34538276128554342416501245685, -61, 95, 80, 'd') / result: (0, 527012270027989844001789, -45, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 350331393162072374690411, -75, 79), prec=80, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=350331393162072374690411, exp=-75, mag=4, wp=90 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=113, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=1842243969876765764000808106671578, prec=110 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=3749426822982191272180394637748373241526732811188032540630117385697020347168453414602245052962760131244931405704429360381952, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3749426822982191272180394637748373241526732811188032540630117385697020347168453414602245052962760131244931405704429360381952 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125989088853671904381375058455031473958623771202829032444780460030872192612279268925983691258777217420847094778874903157334183039133658452732291804296804374922889048347460592884994005247415607116310231786394111964677366049917473080534781001821143307586693645427888732 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=125989088853671904381375058455031473958623771202829032444780460030872192612279268925983691258777217420847094778874903157334183039133658452732291804296804374922889048347460592884994005247415607116310231786394111964677366049917473080534781001821143307586693645427888732 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1283189520792365907131673224744776, exp=-110, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1283189520792365907131673224744776 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=1283189520792365907131673224744776, exp=-110, bc=110, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 1283189520792365907131673224744776, -110, 110, 80, 'd') / result: (1, 1195063368223948317702555, -80, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 1283189520792365907131673224744776, -110, 110, 80, 'd') / result: (1, 1195063368223948317702555, -80, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-196013572044318733356810307792283, exp=-110, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=196013572044318733356810307792283 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=196013572044318733356810307792283, exp=-110, bc=108, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 196013572044318733356810307792283, -110, 108, 80, 'd') / result: (1, 365103729151783014380951, -81, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 196013572044318733356810307792283, -110, 108, 80, 'd') / result: (1, 365103729151783014380951, -81, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 527012270027989844001789, -45, 79), t=(1, 1195063368223948317702555, -80, 80), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=629813058514998508523945534192159596391789870895, exp=-125, bc=159, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 629813058514998508523945534192159596391789870895, -125, 159, 76, 'd') / result: (1, 65121143942041541101765, -42, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 629813058514998508523945534192159596391789870895, -125, 159, 76, 'd') / result: (1, 65121143942041541101765, -42, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 527012270027989844001789, -45, 79), t=(1, 365103729151783014380951, -81, 79), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=192414145095965537379777460734595114874371521339, exp=-126, bc=158, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 192414145095965537379777460734595114874371521339, -126, 158, 76, 'd') / result: (1, 9947578150271744950969, -42, 74)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 192414145095965537379777460734595114874371521339, -126, 158, 76, 'd') / result: (1, 9947578150271744950969, -42, 74)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((1, 25772007326448195706139, -59, 75), (0, 30067341880856228323829, -58, 75)), w=((1, 65121143942041541101765, -42, 76), (1, 9947578150271744950969, -42, 74)), prec=76, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2174 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 25772007326448195706139, -59, 75), t=(1, 65121143942041541101765, -42, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 30067341880856228323829, -58, 75), t=(1, 9947578150271744950969, -42, 74), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 25772007326448195706139, -59, 75), t=(1, 9947578150271744950969, -42, 74), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 30067341880856228323829, -58, 75), t=(1, 65121143942041541101765, -42, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1678302598780982133764700462133767356234235335, -101, 151), t=(1, 299097233130755968510713920741947180659340301, -100, 148), prec=76, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1678302598780982133764700462133767356234235335, -101, 151), t=(1, 299097233130755968510713920741947180659340301, -100, 148), prec=76, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2276497065042494070786128303617661717552915937 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2276497065042494070786128303617661717552915937, exp=-101, bc=151, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2276497065042494070786128303617661717552915937, -101, 151, 76, 'd') / result: (0, 7532296946948079720845, -23, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2276497065042494070786128303617661717552915937, -101, 151, 76, 'd') / result: (0, 7532296946948079720845, -23, 73)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 256369056969219401580610510981933258887298691, -101, 148), t=(1, 1958019698577812489392161392680052255863458185, -100, 151), prec=76, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3659670340186405577203712274378171252839617679 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3659670340186405577203712274378171252839617679, exp=-101, bc=152, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 3659670340186405577203712274378171252839617679, -101, 152, 76, 'd') / result: (1, 48435333659800610215371, -25, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 3659670340186405577203712274378171252839617679, -101, 152, 76, 'd') / result: (1, 48435333659800610215371, -25, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((1, 14835751850141947581203, -72, 74), (0, 0, 0, 0)), w=((0, 41581626006375, -7, 46), (1, 32571024106075, -7, 45)), prec=76, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2176 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14835751850141947581203, -72, 74), t=(0, 41581626006375, -7, 46), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(1, 32571024106075, -7, 45), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14835751850141947581203, -72, 74), t=(1, 32571024106075, -7, 45), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(0, 41581626006375, -7, 46), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 616894684955988429277842691908169125, -79, 119), t=(0, 0, 0, 0), prec=76, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 616894684955988429277842691908169125, -79, 119), t=(0, 0, 0, 0), prec=76, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=616894684955988429277842691908169125, exp=-79, bc=119, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 616894684955988429277842691908169125, -79, 119, 76, 'd') / result: (1, 35066402969959451029231, -35, 75)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 616894684955988429277842691908169125, -79, 119, 76, 'd') / result: (1, 35066402969959451029231, -35, 75)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 483215631142720155577911951548108225, -79, 119), t=(0, 0, 0, 0), prec=76, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=483215631142720155577911951548108225, exp=-79, bc=119, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 483215631142720155577911951548108225, -79, 119, 76, 'd') / result: (0, 54935257042270695317019, -36, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 483215631142720155577911951548108225, -79, 119, 76, 'd') / result: (0, 54935257042270695317019, -36, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((1, 35066402969959451029231, -35, 75), (0, 54935257042270695317019, -36, 76)), w=((0, 7532296946948079720845, -23, 73), (1, 48435333659800610215371, -25, 76)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2177 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 7532296946948079720845, -23, 73), t=(0, 7532296946948079720845, -23, 73), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 48435333659800610215371, -25, 76), t=(1, 48435333659800610215371, -25, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 56735497297003362888669507235817533127514025, -46, 146), t=(0, 2345981546736213974106237447661934399004667641, -50, 151), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3253749503488267780324949563435014929044892041 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3253749503488267780324949563435014929044892041, exp=-50, bc=152, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3253749503488267780324949563435014929044892041, -50, 152, 63, 'd') / result: (0, 2628357917372592773, 40, 62)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3253749503488267780324949563435014929044892041, -50, 152, 63, 'd') / result: (0, 2628357917372592773, 40, 62)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 35066402969959451029231, -35, 75), t=(0, 7532296946948079720845, -23, 73), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 54935257042270695317019, -36, 76), t=(1, 48435333659800610215371, -25, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 264130560031076648270110653281288774415020195, -58, 148), t=(1, 2660807504529292322649817632071161502711699049, -61, 151), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4773851984777905508810702858321471698031860609 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=4773851984777905508810702858321471698031860609, exp=-61, bc=152, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 4773851984777905508810702858321471698031860609, -61, 152, 63, 'd') / result: (1, 3856286922857494947, 29, 62)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 4773851984777905508810702858321471698031860609, -61, 152, 63, 'd') / result: (1, 3856286922857494947, 29, 62)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 54935257042270695317019, -36, 76), t=(0, 7532296946948079720845, -23, 73), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 35066402969959451029231, -35, 75), t=(1, 48435333659800610215371, -25, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 413788668899303554402863036705057422297561055, -59, 149), t=(0, 1698452928099009084735339957317878558526509701, -60, 151), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 413788668899303554402863036705057422297561055, -59, 149), t=(0, 1698452928099009084735339957317878558526509701, -60, 151), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=870875590300401975929613883907763713931387591 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=870875590300401975929613883907763713931387591, exp=-60, bc=150, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 870875590300401975929613883907763713931387591, -60, 150, 63, 'd') / result: (1, 2813950797820961223, 28, 62)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 870875590300401975929613883907763713931387591, -60, 150, 63, 'd') / result: (1, 2813950797820961223, 28, 62)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 3856286922857494947, 29, 62), t=(0, 2628357917372592773, 40, 62), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=845774483739444263 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=845774483739444263, exp=-70, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 845774483739444263, -70, 60, 53, 'n') / result: (1, 825951644276801, -60, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 845774483739444263, -70, 60, 53, 'n') / result: (1, 825951644276801, -60, 50)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 2813950797820961223, 28, 62), t=(0, 2628357917372592773, 40, 62), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=617165639099196769 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=617165639099196769, exp=-71, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 617165639099196769, -71, 60, 53, 'n') / result: (1, 4821606555462475, -64, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 617165639099196769, -71, 60, 53, 'n') / result: (1, 4821606555462475, -64, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 825951644276801, -60, 50), (1, 4821606555462475, -64, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-0.000716398853674306 - 0.000261379815115138j) / count: 286
gamma__ / s: Complex { re: -1.5, im: 3.5 } / result: Complex { re: -0.0007163988536743058, im: -0.00026137981511513826 }
zeta_ / s: (-1.5, 3.5) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-1.5+3.5j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-1.5+3.5j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-1.5+3.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-1.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-6755399441055744, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=6755399441055744, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 6755399441055744, -52, 53, 53, 'd') / result: (1, 3, -1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 6755399441055744, -52, 53, 53, 'd') / result: (1, 3, -1, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=3.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7881299347898368, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7881299347898368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7881299347898368, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7881299347898368, -51, 53, 53, 'd') / result: (0, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7881299347898368, -51, 53, 53, 'd') / result: (0, 7, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 3, -1, 2), (0, 7, -1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-1.5', imag='3.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 3, -1, 2), (0, 7, -1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 3, -1, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 3, -1, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3, -1, 2), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -1, 2), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=150000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=150000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 7, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 7, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=516508834063867445248, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=350000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=350000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-1.5+3.5j) / result: (-1.5 + 3.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-1.5+3.5j) / result: (-1.5 + 3.5j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 3, -1, 2), (0, 7, -1, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 3, -1, 2), (0, 7, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 3, -1, 2), y=(0, 7, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3, -1, 2), t=(1, 3, -1, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 7, -1, 3), t=(0, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, -2, 4), t=(0, 49, -2, 6), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=58 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=58, exp=-2, bc=6, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 58, -2, 6, 14, 'd') / result: (0, 29, -1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 58, -2, 6, 14, 'd') / result: (0, 29, -1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 29, -1, 5), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=15204352 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=15204352 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=15204352 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3899, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3899 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3899, exp=-10, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3899, -10, 12, 10, 'd') / result: (0, 487, -7, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3899, -10, 12, 10, 'd') / result: (0, 487, -7, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 487, -7, 9), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 487, -7, 9), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((1, 3, -1, 2), (0, 7, -1, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(1, 3, -1, 2), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(1, 3, -1, 2), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, -1, 3, 73, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, -1, 3, 73, 'd') / result: (0, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 7, -1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 7, -1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=7, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 7, -1, 3, 73, 'd') / result: (1, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 7, -1, 3, 73, 'd') / result: (1, 7, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 5, -1, 3), (1, 7, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 5, -1, 3), y=(1, 7, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 7, -1, 3), t=(1, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 25, -2, 5), t=(0, 49, -2, 6), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=74 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=74, exp=-2, bc=7, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 74, -2, 7, 14, 'd') / result: (0, 37, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 74, -2, 7, 14, 'd') / result: (0, 37, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 37, -1, 6), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=19398656 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=19398656 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=19398656 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4404, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4404 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4404, exp=-10, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4404, -10, 13, 10, 'd') / result: (0, 275, -6, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4404, -10, 13, 10, 'd') / result: (0, 275, -6, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(1, 3, -1, 2), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(1, 3, -1, 2), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(1, 3, -1, 2) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((1, 3, -1, 2), (0, 7, -1, 3)), prec=730, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1165 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(1, 3, -1, 2), prec=730, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(1, 3, -1, 2), prec=730, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=-1, bc=3, prec=730, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, -1, 3, 730, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, -1, 3, 730, 'd') / result: (0, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 7, -1, 3), prec=730, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 7, -1, 3), prec=730, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=7, exp=-1, bc=3, prec=730, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 7, -1, 3, 730, 'd') / result: (1, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 7, -1, 3, 730, 'd') / result: (1, 7, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 5, -1, 3), (1, 7, -1, 3)), prec=73, rnd='d', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 5, -1, 3), (1, 7, -1, 3)) / prec: 73 / rnd: d / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 5, -1, 3), (1, 7, -1, 3)) / prec: 73 / rnd: d / type: 0call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 7, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=96 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(1, 7, -1, 3), prec=96 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=572472808105715869953429016512959526993920000, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=572472808105715869953429016512959526993920000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-218047148734860652564254963352112954605568000, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=218047148734860652564254963352112954605568000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=1465721006513890245480563081216, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1465721006513890245480563081216 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: complex_stirling_series / f_locals: x=1465721006513890245480563081216, y=-277298568799925181577403826176, prec=96 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=208046802084878731488713546 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1749 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=95 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1750 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: stirling_coefficient / f_locals: n=22 / f_lineno: 1648 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1753 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: stirling_coefficient / f_locals: n=24 / f_lineno: 1648 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1753 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: stirling_coefficient / f_locals: n=26 / f_lineno: 1648 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1753 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpc_log / f_locals: z=((0, 37, -1, 6), (1, 7, -1, 3)), prec=96, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 37, -1, 6), b=(1, 7, -1, 3), prec=96, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 37, -1, 6), t=(0, 37, -1, 6), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 7, -1, 3), t=(1, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1369, -2, 11), t=(0, 49, -2, 6), prec=116, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1418 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=1418, exp=-2, bc=11, prec=116, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1418, -2, 11, 116, 'd') / result: (0, 709, -1, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1418, -2, 11, 116, 'd') / result: (0, 709, -1, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 709, -1, 10), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=707 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=707, exp=-1, bc=10, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 707, -1, 10, 10, 'd') / result: (0, 707, -1, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 707, -1, 10, 10, 'd') / result: (0, 707, -1, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 709, -1, 10), prec=96, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: lshift / f_locals: x=709, n=106 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_taylor_cached / f_locals: x=57520913635956137322314404647141376, prec=116 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_taylor / f_locals: x=246701993758745018503238883391172499159908352, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=88026212844532235661502657921987288697780738691130545986962123910089230971218407469350912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=105863285191558799685153906265167065129369636042145565069851049374395028755079735476748288 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=116094605954627345689391337233001129552326995208045551164945083660205914250621239655661568 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=121575308191042579098731106518040757107230078242907731540203312391274728032517091321970688 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=124411935877126170432834116266617940344979361661741394235925668386476082050107601273749504 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125854973398731145003013440715848695602678174124617314502849761844841727232820146545360896 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=126582756678643604416845307983648223426287908798749957699778529125198407845702490354876416 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=126948225011712812434887777939345906497973414137214714890074302431412815482562002148130816 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=116, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=487719368034648888987238606842436201, exp=-116, prec=96, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=487719368034648888987238606842436201 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=487719368034648888987238606842436201, exp=-116, bc=119, prec=96, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 487719368034648888987238606842436201, -116, 119, 96, 'd') / result: (0, 29070339681783252298071301391, -92, 95)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 487719368034648888987238606842436201, -116, 119, 96, 'd') / result: (0, 29070339681783252298071301391, -92, 95)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_shift / f_locals: s=(0, 29070339681783252298071301391, -92, 95), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpc_arg / f_locals: z=((0, 37, -1, 6), (1, 7, -1, 3)), prec=96, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 7, -1, 3), x=(0, 37, -1, 6), prec=96, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 7, -1, 3), x=(0, 37, -1, 6), prec=96, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 7, -1, 3), t=(0, 37, -1, 6), prec=100, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=122790804086972274999032007785611 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=122790804086972274999032007785611, exp=-109, bc=107, prec=100, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 122790804086972274999032007785611, -109, 107, 100, 'd') / result: (0, 959303156929470898429937560825, -102, 100)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 122790804086972274999032007785611, -109, 107, 100, 'd') / result: (0, 959303156929470898429937560825, -102, 100)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_atan / f_locals: x=(0, 959303156929470898429937560825, -102, 100), prec=100, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 959303156929470898429937560825, -102, 100), prec=132 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: atan_taylor / f_locals: x=1030043921490408321835079892766346444800, prec=132 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=24, prec=132 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=131 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: atan_newton / f_locals: x=22765651080770262549837444220588112187215705145142260014669676676627784592248537088, prec=276 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=276, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=985478736382480318316724520226914304, prec=122, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=121, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=985478736382480318316724520226914304, prec=122 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=485462977080338814855312804336566232373984689051894020412163959029641752939166144590373326416665912309949796330876528754688, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=485462977080338814855312804336566232373984689051894020412163959029641752939166144590373326416665912309949796330876528754688 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1049510941243011899708782018769446326008640547608376057086222054194542587981310742242506252110824527398856782242131042044844734127969626397469613842025589740913340731237764973101222827821727366098781345320484738918358701158069352043968625121705685319346942757852 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1049510941243011899708782018769446326008640547608376057086222054194542587981310742242506252110824527398856782242131042044844734127969626397469613842025589740913340731237764973101222827821727366098781345320484738918358701158069352043968625121705685319346942757852 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: rshift / f_locals: x=22765651080770262549837444220588112187215705145142260014669676676627784592248537088, n=154 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=290861984642084834519055898275900942698221171087559884800, prec=190, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=189, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=290861984642084834519055898275900942698221171087559884800, prec=190 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: rshift / f_locals: x=22765651080770262549837444220588112187215705145142260014669676676627784592248537088, n=86 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=25337652372820551649037333432196678192127622316768063238450767813507057187300562472529375422054400, prec=326, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=325, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=25337652372820551649037333432196678192127622316768063238450767813507057187300562472529375422054400, prec=326 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: rshift / f_locals: x=22765651080770262549837444220588112187215705145142260014669676676627784592248537088, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: rshift / f_locals: x=25337652372820551649037333432196678192127622316768063238074763309466158539868391793230058685059122, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=1018011976530497567939885180710864725032, exp=-132, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1018011976530497567939885180710864725032 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=1018011976530497567939885180710864725032, exp=-132, bc=130, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1018011976530497567939885180710864725032, -132, 130, 100, 'd') / result: (0, 474048767485887542338988362211, -101, 99)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1018011976530497567939885180710864725032, -132, 130, 100, 'd') / result: (0, 474048767485887542338988362211, -101, 99)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_pos / f_locals: s=(0, 474048767485887542338988362211, -101, 99), prec=96, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=474048767485887542338988362211, exp=-101, bc=99, prec=96, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 474048767485887542338988362211, -101, 99, 96, 'd') / result: (0, 14814023983933985698093386319, -96, 94)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 474048767485887542338988362211, -101, 99, 96, 'd') / result: (0, 14814023983933985698093386319, -96, 94)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 14814023983933985698093386319, -96, 94), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 29070339681783252298071301391, -93, 95), prec=96 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(1, 14814023983933985698093386319, -96, 94), prec=96 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=2741709158511938289345838326159, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2741709158511938289345838326159 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-803258206149120498851864811415, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=803258206149120498851864811415 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_exp / f_locals: z=((0, 2741709158511938289345838326159, -96, 102), (1, 803258206149120498851864811415, -96, 100)), prec=96, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_exp / f_locals: x=(0, 2741709158511938289345838326159, -96, 102), prec=100, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: g / f_locals: prec=120, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=13313523736712864108355581610883579, prec=114 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=39428675879512422360447913249414699, exp=-65, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=39428675879512422360447913249414699 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=39428675879512422360447913249414699, exp=-65, bc=115, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 39428675879512422360447913249414699, -65, 115, 100, 'd') / result: (0, 601633848259161718146483051291, -49, 99)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 39428675879512422360447913249414699, -65, 115, 100, 'd') / result: (0, 601633848259161718146483051291, -49, 99)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 803258206149120498851864811415, -96, 100), prec=100, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mod_pi2 / f_locals: man=803258206149120498851864811415, exp=-96, mag=4, wp=110 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=133, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=971527893836793592611695176620080535752, prec=130 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1879877911247269453269509157218192644512025817179674717340720011561591468828260389690381817187940341285337509196160175177728, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1879877911247269453269509157218192644512025817179674717340720011561591468828260389690381817187940341285337509196160175177728 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3432546135712098895207285716453527909884196664697710885485006419770008007322034729958489558461318867646892489162510783926203337992541317997103924226641097045551904632913808482729080875860113727522669920082210508212320122677584704786750432720553716415768238492004855 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3432546135712098895207285716453527909884196664697710885485006419770008007322034729958489558461318867646892489162510783926203337992541317997103924226641097045551904632913808482729080875860113727522669920082210508212320122677584704786750432720553716415768238492004855 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-1028880103164346364194158522884750660040, exp=-130, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1028880103164346364194158522884750660040 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=1028880103164346364194158522884750660040, exp=-130, bc=130, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 1028880103164346364194158522884750660040, -130, 130, 100, 'd') / result: (1, 479109633324829099790266958477, -99, 99)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 1028880103164346364194158522884750660040, -130, 130, 100, 'd') / result: (1, 479109633324829099790266958477, -99, 99)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=891111194582125710100625794802342858962, exp=-130, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=891111194582125710100625794802342858962 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=891111194582125710100625794802342858962, exp=-130, bc=130, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 891111194582125710100625794802342858962, -130, 130, 100, 'd') / result: (0, 829911972006899966020719888435, -100, 100)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 891111194582125710100625794802342858962, -130, 130, 100, 'd') / result: (0, 829911972006899966020719888435, -100, 100)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 601633848259161718146483051291, -49, 99), t=(1, 479109633324829099790266958477, -99, 99), prec=96, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=288248572435252841002188505726145898021921015707168958243807, exp=-148, bc=198, prec=96, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 288248572435252841002188505726145898021921015707168958243807, -148, 198, 96, 'd') / result: (1, 14211751861246121716129761175, -44, 94)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 288248572435252841002188505726145898021921015707168958243807, -148, 198, 96, 'd') / result: (1, 14211751861246121716129761175, -44, 94)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 601633848259161718146483051291, -49, 99), t=(0, 829911972006899966020719888435, -100, 100), prec=96, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=499303133434860921683759095219852821692102199916367902719585, exp=-149, bc=199, prec=96, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 499303133434860921683759095219852821692102199916367902719585, -149, 199, 96, 'd') / result: (0, 49235090227639004024594518581, -46, 96)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 499303133434860921683759095219852821692102199916367902719585, -149, 199, 96, 'd') / result: (0, 49235090227639004024594518581, -46, 96)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_div / f_locals: z=((1, 14211751861246121716129761175, -44, 94), (0, 49235090227639004024594518581, -46, 96)), w=((0, 1849759406557960625, -8, 61), (1, 22017135504875875, -3, 55)), prec=73, rnd='d' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1849759406557960625, -8, 61), t=(0, 1849759406557960625, -8, 61), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 22017135504875875, -3, 55), t=(1, 22017135504875875, -3, 55), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 3421609862149658664854097559050390625, -16, 122), t=(0, 484754255840065851135899157015625, -6, 109), prec=83, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3917998220129886096417258295834390625 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3917998220129886096417258295834390625, exp=-16, bc=122, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3917998220129886096417258295834390625, -16, 122, 83, 'd') / result: (0, 7126797245527788793728647, 23, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3917998220129886096417258295834390625, -16, 122, 83, 'd') / result: (0, 7126797245527788793728647, 23, 83)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14211751861246121716129761175, -44, 94), t=(0, 1849759406557960625, -8, 61), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 49235090227639004024594518581, -46, 96), t=(1, 22017135504875875, -3, 55), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(1, 26288321689007618476277687001547696176303734375, -52, 155), t=(1, 1084015653136717942258232176903564523786133375, -49, 150), prec=83, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=34960446914101362014343544416776212366592801375 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=34960446914101362014343544416776212366592801375, exp=-52, bc=155, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 34960446914101362014343544416776212366592801375, -52, 155, 83, 'd') / result: (1, 7403162596744696506989833, 20, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 34960446914101362014343544416776212366592801375, -52, 155, 83, 'd') / result: (1, 7403162596744696506989833, 20, 83)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 49235090227639004024594518581, -46, 96), t=(0, 1849759406557960625, -8, 61), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14211751861246121716129761175, -44, 94), t=(1, 22017135504875875, -3, 55), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 91073071281305170582310417041186795845028873125, -54, 156), t=(0, 312902066490727786279974921095248411769153125, -47, 148), prec=83, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 91073071281305170582310417041186795845028873125, -54, 156), t=(0, 312902066490727786279974921095248411769153125, -47, 148), prec=83, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=51021606770492013938473627140994999138577273125 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=51021606770492013938473627140994999138577273125, exp=-54, bc=156, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 51021606770492013938473627140994999138577273125, -54, 156, 83, 'd') / result: (0, 5402122744557476888477141, 19, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 51021606770492013938473627140994999138577273125, -54, 156, 83, 'd') / result: (0, 5402122744557476888477141, 19, 83)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(1, 7403162596744696506989833, 20, 83), t=(0, 7126797245527788793728647, 23, 83), prec=73, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=627902976728163421066989 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=627902976728163421066989, exp=-82, bc=80, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 627902976728163421066989, -82, 80, 73, 'd') / result: (1, 4905492005688776727085, -75, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 627902976728163421066989, -82, 80, 73, 'd') / result: (1, 4905492005688776727085, -75, 73)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 5402122744557476888477141, 19, 83), t=(0, 7126797245527788793728647, 23, 83), prec=73, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=458183770467243681567843 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=458183770467243681567843, exp=-83, bc=79, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 458183770467243681567843, -83, 79, 73, 'd') / result: (0, 7159121413550682524497, -77, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 458183770467243681567843, -83, 79, 73, 'd') / result: (0, 7159121413550682524497, -77, 73)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5, -1, 3), (1, 7, -1, 3)), prec=73, rnd='d', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1167 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 5, -1, 3), (1, 7, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 5, -1, 3), y=(1, 7, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 7, -1, 3), t=(1, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 25, -2, 5), t=(0, 49, -2, 6), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=74 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=74, exp=-2, bc=7, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 74, -2, 7, 14, 'd') / result: (0, 37, -1, 6)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 74, -2, 7, 14, 'd') / result: (0, 37, -1, 6)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 37, -1, 6), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=19398656 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=19398656 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=19398656 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4404, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4404 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4404, exp=-10, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4404, -10, 13, 10, 'd') / result: (0, 275, -6, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4404, -10, 13, 10, 'd') / result: (0, 275, -6, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=73, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 275, -6, 9), t=(0, 73, 0, 7) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 275, -6, 9), t=(0, 73, 0, 7) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 5, -1, 3), (1, 7, -1, 3)), prec=93, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize1 / x: (1, 3, -1, 2, 93, 'd') / result: (1, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 7, -1, 3, 93, 'd') / result: (0, 7, -1, 3)

[2]libmpf._normalize. / x: (0, 58, -2, 6, 14, 'd') / result: (0, 29, -1, 5)

[2]libmpf._normalize. / x: (0, 3899, -10, 12, 10, 'd') / result: (0, 487, -7, 9)

[2]gammazeta.borwein_coefficients / n: 43 / result: [1, 3699, 2281667, 562661795, 74212621475, 6074229336739, 337711516871331, 13552181897095843, 409986293303831203, 9660115559460989603, 181809889691733158563, 2788649326551854574243, 35430812709843809692323, 377922434669922477238947, 3422292407648399522097827, 26559504202284825063025315, 178070923373613676185873059, 1038526148827898381493168803, 5299828217744355969681681059, 23787696368804378222846634659, 94326024083618001588768303779, 331747712489576050966748555939, 1038491343093358151440736283299, 2902655702077247170082269129379, 7265593563528902320094367279779, 16333381151492913758405225966243, 33073912083118781029132965079715, 60518556084232886282191858133667, 100438038267671584832095702575779, 151876935455042684596944576539299, 210464967505743327040975836375715, 269269877517498916336994520230563, 321074203004045506907296694102691, 360923684147542884269067597081251, 387513329159885295853743528831651, 402773473253925288589296672271011, 410224435628480026826374263433891, 413275440584517620491760348523171, 414303147517077652042206187711139, 414580351185200737475393377102499, 414637897263140213438738565786275, 414646526575640622661787618470563, 414647358316604517526659816319651, 414647397002230745194793406917283]

[2]libmpf._normalize. / x: (0, 10769813939407825241133330735, -93, 94, 93, 'd') / result: (0, 5384906969703912620566665367, -92, 93)

[2]libmpf._normalize. / x: (1, 1344042168216663824961577762, -93, 91, 93, 'd') / result: (1, 672021084108331912480788881, -92, 90)

[2]libmpf._normalize. / x: (0, 7370805100797290441810754461379827637, -123, 123, 103, 'd') / result: (0, 7029347515866556588946108304385, -103, 103)

[3]libmpf._normalize1 / x: (1, 21088042547599669766838324913155, -104, 105, 103, 'd') / result: (1, 20593791550390302506678051673, -94, 95)

[3]libmpf._normalize1 / x: (0, 49205432611065896122622758130695, -104, 106, 103, 'd') / result: (0, 48052180284244039182248787237, -94, 96)

[2]libmpf._normalize. / x: (0, 917877079650896116428504075918941, -111, 110, 97, 'd') / result: (0, 56022770974786139918731938227, -97, 96)

[2]libmpf._normalize. / x: (1, 128408015154123930331924600013672516541, -127, 127, 97, 'd') / result: (1, 14948660409325260009142174387, -94, 94)

[2]libmpf._normalize. / x: (0, 111621700190900729337816991922951570489, -127, 127, 97, 'd') / result: (0, 103955809204746716970407396483, -97, 97)

[3]libmpf._normalize1 / x: (1, 837465378491481874044511484222212176238343407177745591849, -191, 190, 93, 'd') / result: (1, 1321287393136095322440136689, -92, 91)

[3]libmpf._normalize1 / x: (0, 5823892490576090209911465168608279955543129909643453055641, -194, 192, 93, 'd') / result: (0, 4594241102025707488218428469, -94, 92)

[2]libmpf._normalize1 / x: (0, 6273047550277616422036633585, -92, 93, 93, 'd') / result: (0, 6273047550277616422036633585, -92, 93)

[2]libmpf._normalize1 / x: (1, 4594241102025707488218428469, -94, 92, 93, 'd') / result: (1, 4594241102025707488218428469, -94, 92)

[3]libmpf._normalize1 / x: (0, 650725060392246459718331814831977658371927986892868919561, -188, 189, 83, 'd') / result: (0, 8020805627984767462818683, -82, 83)

[3]libmpf._normalize1 / x: (0, 138206536785134341050236280974125618200079695866743255969, -186, 187, 83, 'd') / result: (0, 1703527089309095985032079, -80, 81)

[3]libmpf._normalize1 / x: (0, 7877080069195698455793853964649035437323597435192459583, -186, 183, 83, 'd') / result: (0, 6213920513884108993410327, -86, 83)

[3]libmpf._normalize1 / x: (0, 513523947143987215732929, -79, 79, 73, 'd') / result: (0, 8023811674124800245827, -73, 73)

[3]libmpf._normalize1 / x: (0, 468292669009293859431439, -83, 79, 73, 'd') / result: (0, 457317059579388534601, -73, 69)

[7]gammazeta.mpc_zeta / s: ((0, 5, -1, 3), (1, 7, -1, 3)) / prec: 73 / rnd: d / alt: 0 / force: False / result: ((0, 8023811674124800245827, -73, 73), (0, 457317059579388534601, -73, 69))

[2]libmpf._normalize. / x: (0, 995610453248924340922087778488, -98, 100, 78, 'd') / result: (0, 237372029602271161299249, -76, 78)

[3]libmpf._normalize1 / x: (0, 1661604207215898129094743, -78, 81, 78, 'd') / result: (0, 103850262950993633068421, -74, 77)

[2]libmpf._normalize. / x: (1, 1750711592962066872460373068, -91, 91, 79, 'd') / result: (1, 213709911250252303767135, -78, 78)

[2]libmpf._normalize. / x: (1, 1750711592962066872460373072, -91, 91, 79, 'd') / result: (1, 213709911250252303767135, -78, 78)

[2]libmpf._normalize. / x: (0, 18890590420438312949904134530, -87, 94, 79, 'd') / result: (0, 288247534491551406095949, -71, 78)

[2]libmpf._normalize. / x: (0, 18889956622235259323391338000, -87, 94, 79, 'd') / result: (0, 576475726996925638531229, -72, 79)

[3]libmpf._normalize1 / x: (1, 61601355014293490810397564041114764135962836115, -149, 156, 73, 'd') / result: (1, 398089426365779786005, -62, 69)

[3]libmpf._normalize1 / x: (1, 123198576454437654230941742102591144385041358915, -150, 157, 73, 'd') / result: (1, 3184608560538835975833, -65, 72)

[2]libmpf._normalize. / x: (0, 1175409358604344043874510131134287648884263686251049, -168, 170, 148, 'd') / result: (0, 70059857285281660787732012935536363654390793, -144, 146)

[2]libmpf._normalize. / x: (0, 74553150924144135383490614002952, -105, 106, 85, 'd') / result: (0, 17774856310878785940048841, -83, 84)

[3]libmpf._normalize1 / x: (1, 53324568932636357820146523, -84, 86, 85, 'd') / result: (1, 26662284466318178910073261, -83, 85)

[3]libmpf._normalize1 / x: (0, 124423994176151501580341887, -84, 87, 85, 'd') / result: (0, 31105998544037875395085471, -82, 85)

[2]libmpf._normalize. / x: (0, 10060968212839155052703264190, -97, 94, 79, 'd') / result: (0, 76759095862115135594965, -80, 77)

[2]libmpf._normalize. / x: (0, 641808703773229417466829337419705, -109, 109, 79, 'd') / result: (0, 4669772925068023450635, -72, 72)

[2]libmpf._normalize. / x: (0, 96595830319718242495074885588045, -109, 107, 79, 'd') / result: (0, 359847509561919579264055, -81, 79)

[3]libmpf._normalize1 / x: (0, 358447547609606212002235145015455433032052775, -152, 149, 75, 'd') / result: (0, 9488027583995027754909, -77, 74)

[3]libmpf._normalize1 / x: (0, 27621569482206777866574390293106459449263483075, -161, 155, 75, 'd') / result: (0, 1428001672747988623329, -77, 71)

[3]libmpf._normalize1 / x: (0, 1546308085949503319277173, -86, 81, 75, 'd') / result: (0, 24161063842960989363705, -80, 75)

[3]libmpf._normalize1 / x: (0, 1861824716483276602624243, -89, 81, 75, 'd') / result: (0, 29091011195051196916003, -83, 75)

[3]libmpf._normalize1 / x: (1, 522925415633913527390331013118033028253750101, -148, 149, 73, 'd') / result: (1, 432553765623607186281, -68, 69)

[2]libmpf._normalize. / x: (1, 88524354705057321757208684693975810727279280, -145, 146, 73, 'd') / result: (1, 4686440316850612029327, -71, 72)

[3]libmpf._normalize1 / x: (1, 25622650528782316557163041685176067288951569, -144, 145, 73, 'd') / result: (1, 5425807298465360658049, -72, 73)

[3]libmpf._normalize1 / x: (1, 39185628254074908872972119068453424301439477, -144, 145, 73, 'd') / result: (1, 8297879547515113343261, -72, 73)

[3]libmpf._normalize1 / x: (0, 165870544463798277215386632049081505528593377, -149, 147, 53, 'n') / result: (0, 65424393927607, -48, 46)

[3]libmpf._normalize1 / x: (0, 123976713921772226967715187501477486400970387, -149, 147, 53, 'n') / result: (0, 3129612248660981, -54, 52)

[5]gammazeta.mpc_zeta / s: ((1, 3, -1, 2), (0, 7, -1, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 65424393927607, -48, 46), (0, 3129612248660981, -54, 52))

zeta_ / result: (0.232434139233842 + 0.173728378830617j) / count: 937
zeta / count: 0 / s: Complex { re: -1.5, im: 3.5 }
gamma_ / s: (2.5, -3.5) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(2.5-3.5j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(2.5-3.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=2.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-3.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7881299347898368, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7881299347898368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7881299347898368, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7881299347898368, -51, 53, 53, 'd') / result: (1, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7881299347898368, -51, 53, 53, 'd') / result: (1, 7, -1, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, -1, 3), (1, 7, -1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.5', imag='-3.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, -1, 3), (1, 7, -1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 7, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 7, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=516508834063867445248, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=350000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=350000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2.5-3.5j) / result: (2.5 - 3.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2.5-3.5j) / result: (2.5 - 3.5j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 5, -1, 3), (1, 7, -1, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 5, -1, 3), (1, 7, -1, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 5, -1, 3), (1, 7, -1, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 5, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 7, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 7, -1, 3), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7180074218646780326081463530291200, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7180074218646780326081463530291200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3935813797570168444425484841779200, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3935813797570168444425484841779200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1095589024025757689577472, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1095589024025757689577472 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1095589024025757689577472, y=-264452523040700131966976, prec=76 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=76, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 29, -1, 5), (1, 7, -1, 3)), prec=76, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 29, -1, 5), b=(1, 7, -1, 3), prec=76, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 29, -1, 5), t=(0, 29, -1, 5), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 7, -1, 3), t=(1, 7, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 841, -2, 10), t=(0, 49, -2, 6), prec=96, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=890 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=890, exp=-2, bc=10, prec=96, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 890, -2, 10, 96, 'd') / result: (0, 445, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 890, -2, 10, 96, 'd') / result: (0, 445, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 445, -1, 9), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=443 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=443, exp=-1, bc=9, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 443, -1, 9, 10, 'd') / result: (0, 443, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 443, -1, 9, 10, 'd') / result: (0, 443, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 445, -1, 9), prec=76, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=445, n=87 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=68860414685249277791263784960, prec=96 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=428222442783815248483333417548, exp=-96, prec=76, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=428222442783815248483333417548 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=428222442783815248483333417548, exp=-96, bc=99, prec=76, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 428222442783815248483333417548, -96, 99, 76, 'd') / result: (0, 51048093173958688793579, -73, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 428222442783815248483333417548, -96, 99, 76, 'd') / result: (0, 51048093173958688793579, -73, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 51048093173958688793579, -73, 76), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 29, -1, 5), (1, 7, -1, 3)), prec=76, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 7, -1, 3), x=(0, 29, -1, 5), prec=76, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 7, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 7, -1, 3), x=(0, 29, -1, 5), prec=76, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 7, -1, 3), t=(0, 29, -1, 5), prec=80, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=74703278232738464864602323 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=74703278232738464864602323, exp=-88, bc=86, prec=80, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 74703278232738464864602323, -88, 86, 80, 'd') / result: (0, 1167238722386538513509411, -82, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 74703278232738464864602323, -88, 86, 80, 'd') / result: (0, 1167238722386538513509411, -82, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 1167238722386538513509411, -82, 80), prec=80, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1167238722386538513509411, -82, 80), prec=112 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=1253313034818751496541843608305664, prec=112 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=30, prec=112 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=111 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1229789077412560341410974248240133, exp=-112, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1229789077412560341410974248240133 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=1229789077412560341410974248240133, exp=-112, bc=110, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1229789077412560341410974248240133, -112, 110, 80, 'd') / result: (0, 286332582452464928247727, -80, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1229789077412560341410974248240133, -112, 110, 80, 'd') / result: (0, 286332582452464928247727, -80, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 286332582452464928247727, -80, 78), prec=76, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=286332582452464928247727, exp=-80, bc=78, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 286332582452464928247727, -80, 78, 76, 'd') / result: (0, 71583145613116232061931, -78, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 286332582452464928247727, -80, 78, 76, 'd') / result: (0, 71583145613116232061931, -78, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 71583145613116232061931, -78, 76), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 51048093173958688793579, -74, 76), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 71583145613116232061931, -78, 76), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1770312258832052663731219, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1770312258832052663731219 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-700662786324144749380822, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=700662786324144749380822 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((0, 1770312258832052663731219, -76, 81), (1, 350331393162072374690411, -75, 79)), prec=76, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(0, 1770312258832052663731219, -76, 81), prec=80, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=11013322670682958334239536730, prec=94 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=34538276128554342416501245685, exp=-61, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=34538276128554342416501245685 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=34538276128554342416501245685, exp=-61, bc=95, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 34538276128554342416501245685, -61, 95, 80, 'd') / result: (0, 527012270027989844001789, -45, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 34538276128554342416501245685, -61, 95, 80, 'd') / result: (0, 527012270027989844001789, -45, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 350331393162072374690411, -75, 79), prec=80, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=350331393162072374690411, exp=-75, mag=4, wp=90 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=113, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=1842243969876765764000808106671578, prec=110 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-1283189520792365907131673224744776, exp=-110, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1283189520792365907131673224744776 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=1283189520792365907131673224744776, exp=-110, bc=110, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 1283189520792365907131673224744776, -110, 110, 80, 'd') / result: (1, 1195063368223948317702555, -80, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 1283189520792365907131673224744776, -110, 110, 80, 'd') / result: (1, 1195063368223948317702555, -80, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-196013572044318733356810307792283, exp=-110, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=196013572044318733356810307792283 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=196013572044318733356810307792283, exp=-110, bc=108, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 196013572044318733356810307792283, -110, 108, 80, 'd') / result: (1, 365103729151783014380951, -81, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 196013572044318733356810307792283, -110, 108, 80, 'd') / result: (1, 365103729151783014380951, -81, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 527012270027989844001789, -45, 79), t=(1, 1195063368223948317702555, -80, 80), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=629813058514998508523945534192159596391789870895, exp=-125, bc=159, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 629813058514998508523945534192159596391789870895, -125, 159, 76, 'd') / result: (1, 65121143942041541101765, -42, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 629813058514998508523945534192159596391789870895, -125, 159, 76, 'd') / result: (1, 65121143942041541101765, -42, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 527012270027989844001789, -45, 79), t=(1, 365103729151783014380951, -81, 79), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=192414145095965537379777460734595114874371521339, exp=-126, bc=158, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 192414145095965537379777460734595114874371521339, -126, 158, 76, 'd') / result: (1, 9947578150271744950969, -42, 74)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 192414145095965537379777460734595114874371521339, -126, 158, 76, 'd') / result: (1, 9947578150271744950969, -42, 74)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((1, 65121143942041541101765, -42, 76), (1, 9947578150271744950969, -42, 74)), w=((0, 6081759426925, -6, 43), (0, 104180123775, -1, 37)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 6081759426925, -6, 43), t=(0, 6081759426925, -6, 43), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 104180123775, -1, 37), t=(0, 104180123775, -1, 37), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 36987797726991104414955625, -12, 85), t=(0, 10853498189774320250625, -2, 74), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=48101779873320008351595625 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=48101779873320008351595625, exp=-12, bc=86, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 48101779873320008351595625, -12, 86, 63, 'd') / result: (0, 2867089502413273355, 12, 62)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 48101779873320008351595625, -12, 86, 63, 'd') / result: (0, 2867089502413273355, 12, 62)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 65121143942041541101765, -42, 76), t=(0, 6081759426925, -6, 43), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 9947578150271744950969, -42, 74), t=(0, 104180123775, -1, 37), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 396051131061650998425614139506022625, -48, 119), t=(1, 1036339922956795938877181726187975, -43, 110), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=429214008596268468469683954744037825 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=429214008596268468469683954744037825, exp=-48, bc=119, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 429214008596268468469683954744037825, -48, 119, 63, 'd') / result: (1, 2978270467720231993, 9, 62)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 429214008596268468469683954744037825, -48, 119, 63, 'd') / result: (1, 2978270467720231993, 9, 62)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 9947578150271744950969, -42, 74), t=(0, 6081759426925, -6, 43), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 65121143942041541101765, -42, 76), t=(0, 104180123775, -1, 37), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 60498777190488339106024987663440325, -48, 116), t=(1, 6784328836251479178173627570962875, -43, 113), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 60498777190488339106024987663440325, -48, 116), t=(1, 6784328836251479178173627570962875, -43, 113), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=156599745569558994595531094607371675 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=156599745569558994595531094607371675, exp=-48, bc=117, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 156599745569558994595531094607371675, -48, 117, 63, 'd') / result: (0, 1086629019886035903, 9, 60)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 156599745569558994595531094607371675, -48, 117, 63, 'd') / result: (0, 1086629019886035903, 9, 60)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 2978270467720231993, 9, 62), t=(0, 2867089502413273355, 12, 62), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=598814942100680753 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=598814942100680753, exp=-62, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 598814942100680753, -62, 60, 53, 'n') / result: (1, 146195054223799, -50, 48)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 598814942100680753, -62, 60, 53, 'n') / result: (1, 146195054223799, -50, 48)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 1086629019886035903, 9, 60), t=(0, 2867089502413273355, 12, 62), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=873916188177573551 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=873916188177573551, exp=-64, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 873916188177573551, -64, 60, 53, 'n') / result: (0, 6827470220137293, -57, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 873916188177573551, -64, 60, 53, 'n') / result: (0, 6827470220137293, -57, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 146195054223799, -50, 48), (0, 6827470220137293, -57, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-0.129847292228468 + 0.0473750914896188j) / count: 168
gamma__ / s: Complex { re: 2.5, im: -3.5 } / result: Complex { re: -0.12984729222846791, im: 0.047375091489618805 }
zeta / count: 1 / s: Complex { re: 2.5, im: -3.5 }
zeta__ / s: Complex { re: -1.5, im: 3.5 } / result: Complex { re: 0.23243413923384182, im: 0.1737283788306166 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (1.5, 2.5) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(1.5+2.5j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(1.5+2.5j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(1.5+2.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=1.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=2.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, -1, 2), (0, 5, -1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.5', imag='2.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, -1, 2), (0, 5, -1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3, -1, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, -1, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -1, 2), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=150000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=150000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1.5+2.5j) / result: (1.5 + 2.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1.5+2.5j) / result: (1.5 + 2.5j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 3, -1, 2), (0, 5, -1, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 3, -1, 2), (0, 5, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 3, -1, 2), y=(0, 5, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3, -1, 2), t=(0, 3, -1, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, -2, 4), t=(0, 25, -2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=34 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=34, exp=-2, bc=6, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 34, -2, 6, 14, 'd') / result: (0, 17, -1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 34, -2, 6, 14, 'd') / result: (0, 17, -1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 17, -1, 5), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=8912896 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=8912896 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=8912896 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=2985, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2985 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=2985, exp=-10, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2985, -10, 12, 10, 'd') / result: (0, 373, -7, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2985, -10, 12, 10, 'd') / result: (0, 373, -7, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 373, -7, 9), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 373, -7, 9), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 3, -1, 2), (0, 5, -1, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 3, -1, 2), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 3, -1, 2), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, -1, 1, 73, 'd') / result: (1, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, -1, 1, 73, 'd') / result: (1, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5, -1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 5, -1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 5, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5, -1, 3, 73, 'd') / result: (1, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5, -1, 3, 73, 'd') / result: (1, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 1, -1, 1), (1, 5, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 1, -1, 1), y=(1, 5, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, -1, 1), t=(1, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, -1, 3), t=(1, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 25, -2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=26, exp=-2, bc=5, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 26, -2, 5, 14, 'd') / result: (0, 13, -1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 26, -2, 5, 14, 'd') / result: (0, 13, -1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 13, -1, 4), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=27262976 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=27262976 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=27262976 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5221, exp=-11, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5221 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5221, exp=-11, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5221, -11, 13, 10, 'd') / result: (0, 163, -6, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5221, -11, 13, 10, 'd') / result: (0, 163, -6, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 3, -1, 2), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 3, -1, 2), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 3, -1, 2) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=34 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 34 / result: [1, 2313, 892433, 137614865, 11339088401, 578880414225, 20030069490193, 498828569821713, 9332660900938257, 135431287117660689, 1562336794306888209, 14608330002894111249, 112453279067298284049, 721801515702233809425, 3903953418129119330833, 17949313539185717494289, 70676048509765124309521, 239852738254939691631121, 705491436696420167402001, 1807657573547947211047441, 4054380852514521569247761, 7999846122894847271453201, 13963921531609293100368401, 21708575975389211162264081, 30318324798527524326818321, 38471229806560539241824785, 45000932007564356617191953, 49381445014527085254754833, 51810638591115507499221521, 52903996135569098636476945, 53293157295459359888720401, 53398525097608388847550993, 53418908749809837902086673, 53421417507003862401106449, 53421565080956452077519377]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 34 / result: [1, 2313, 892433, 137614865, 11339088401, 578880414225, 20030069490193, 498828569821713, 9332660900938257, 135431287117660689, 1562336794306888209, 14608330002894111249, 112453279067298284049, 721801515702233809425, 3903953418129119330833, 17949313539185717494289, 70676048509765124309521, 239852738254939691631121, 705491436696420167402001, 1807657573547947211047441, 4054380852514521569247761, 7999846122894847271453201, 13963921531609293100368401, 21708575975389211162264081, 30318324798527524326818321, 38471229806560539241824785, 45000932007564356617191953, 49381445014527085254754833, 51810638591115507499221521, 52903996135569098636476945, 53293157295459359888720401, 53398525097608388847550993, 53418908749809837902086673, 53421417507003862401106449, 53421565080956452077519377]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -1, 2), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-9819885039515639546717, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848905, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-16366475065859399244528, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13305028634424495917878, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-15564149549024977642476, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4075620530006301450957, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-25940249248374962737460, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3731254451908932424946, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1043228950747111070220991345489216797229201140303006299183586380042421639294803842630376722725175683900104881476989987323904, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1043228950747111070220991345489216797229201140303006299183586380042421639294803842630376722725175683900104881476989987323904 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=74436780239670570440734260623785648530336523740547788625376631602485747601289757248847286243403809002579273080792693263076708462117385651861187426077290767690284728736404730625696684458837553991314818081270277672334633009976686764090479249235072508448771611033600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=74436780239670570440734260623785648530336523740547788625376631602485747601289757248847286243403809002579273080792693263076708462117385651861187426077290767690284728736404730625696684458837553991314818081270277672334633009976686764090479249235072508448771611033600 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-19639770079031279093435, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697809, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-32732950131718798489058, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11774305418707044254551, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3294950844438895360400952863475843151644704591650089202371921338945866365693489364347427470785455872912212447437225801547776, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3294950844438895360400952863475843151644704591650089202371921338945866365693489364347427470785455872912212447437225801547776 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=115850995621216904494383503796330975408095255106045614468011929780710440424703847921224130600390810397816897547439198198845956157515122898259982527255253306884970704025534649840715688839477413528532171200018273005278462200918483143718298947974229395336206533454960240 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=115850995621216904494383503796330975408095255106045614468011929780710440424703847921224130600390810397816897547439198198845956157515122898259982527255253306884970704025534649840715688839477413528532171200018273005278462200918483143718298947974229395336206533454960240 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-22801066961815459860381, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3385293143559578930863, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-38001778269692433100635, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6505477280733409642974, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1817903914173183647117767097090120359528112878151773353032784187004615925899856201019270328709217033330875833068814235336704, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1817903914173183647117767097090120359528112878151773353032784187004615925899856201019270328709217033330875833068814235336704 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3246429755860175673276121413799759423298270257078123598837787800857237452349816572263054905230983328624872412097546021257008383747043831714844645492737034958791915664530811247041275874325193410777503783174346513016846000263652809972562542470648457077448025502607580 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3246429755860175673276121413799759423298270257078123598837787800857237452349816572263054905230983328624872412097546021257008383747043831714844645492737034958791915664530811247041275874325193410777503783174346513016846000263652809972562542470648457077448025502607580 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-25384034588540617189193, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=802325516834421602051, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-42306724314234361981988, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2200531236191480761621, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=609410971228510427158796924592710802341810567107696749028035608143592838795974521932596303374112528218873148585568408436736, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=609410971228510427158796924592710802341810567107696749028035608143592838795974521932596303374112528218873148585568408436736 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1643150507677080388488016154002256060016814675640601693371040280355211503380068128470170517135885779862346180263585064237693960230046123270382657518525701256747245172018318393145503768200528835380158553089037389887228886774487997979866819022035614704501094799296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1643150507677080388488016154002256060016814675640601693371040280355211503380068128470170517135885779862346180263585064237693960230046123270382657518525701256747245172018318393145503768200528835380158553089037389887228886774487997979866819022035614704501094799296 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-27567902599724060890340, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5165047531994737598715, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-45946504332873434817233, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13396503067694355507579, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-29459655118546918640153, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848902, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-49099425197578197733588, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10243582202989592591224, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2861132864920294717338758442579337156757314018454779652216370567047037565194660043649647051434392717230980714545804222660608, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2861132864920294717338758442579337156757314018454779652216370567047037565194660043649647051434392717230980714545804222660608 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=100543119617149432801511527741362757728141814087597130800545015578152532246499021230250171253979725992023200758040512634811805386206779179996671874733558556757175384273129252354238144477714563826128673681354573316489960064607519563616929149584744907369697112354561191 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=100543119617149432801511527741362757728141814087597130800545015578152532246499021230250171253979725992023200758040512634811805386206779179996671874733558556757175384273129252354238144477714563826128673681354573316489960064607519563616929149584744907369697112354561191 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-31128299098049955284952, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1604651033668843204103, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-51880498496749925474920, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7462508903817864849892, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-32620952001331099407099, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=111998130387699081956, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-54368253335551832345165, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4974754065015957979647, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1384085934654583004055572676193614364640722304956463802877233415105787125401026880321489909358153877649644100177392656449536, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1384085934654583004055572676193614364640722304956463802877233415105787125401026880321489909358153877649644100177392656449536 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2014157919476709309290680262536677685500418030404935557781428216792753880382793093076170387887778168342984943564731586219396519186935380217559008845910597271099758817903486349438706456818186942518962229003045397902303425120193187178769106919355476499802936227210935 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2014157919476709309290680262536677685500418030404935557781428216792753880382793093076170387887778168342984943564731586219396519186935380217559008845910597271099758817903486349438706456818186942518962229003045397902303425120193187178769106919355476499802936227210935 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=449, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-33971220797083768645283, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5308319360978789541583, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-56618701328472947742138, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2724306072094842582674, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=754016964401377308179528398224879467304274091506133265746552532109869105628917628831856443157800246779283726216042268065792, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=754016964401377308179528398224879467304274091506133265746552532109869105628917628831856443157800246779283726216042268065792 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=39869289813936149813219182165291592565909301291287198438063367583736181323178558212605398036249171123309945312849895936413123265102965411233260142074071116714507304299099959021564506765200933960538708979558704654196136126721378496927721574650978048835062525660687 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=39869289813936149813219182165291592565909301291287198438063367583736181323178558212605398036249171123309945312849895936413123265102965411233260142074071116714507304299099959021564506765200933960538708979558704654196136126721378496927721574650978048835062525660687 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-35203919628056256735911, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4075620530006301450955, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-58673199380093761226518, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=669808020474029098294, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-36337892627803180855919, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2941647530259377330947, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-60563154379671968093198, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13615604871037769812817, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3811400820056277078332136697876445526510645750215933904938053210253995890096857603273356541441483439199393081831775300222976, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3811400820056277078332136697876445526510645750215933904938053210253995890096857603273356541441483439199393081831775300222976 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=126830855000627585137585172455033107261990566902478837005874037109132475207468891551409676773336260691104732487102474105849258816167897915769922007130327310387401444154104254443710990413192341691514007580848446516751006097854998130196909861993613900786331853907571580 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=126830855000627585137585172455033107261990566902478837005874037109132475207468891551409676773336260691104732487102474105849258816167897915769922007130327310387401444154104254443710990413192341691514007580848446516751006097854998130196909861993613900786331853907571580 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-37387787639239700437056, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1891752518822857749810, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-62312979398732834061760, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11865779851976903844255, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3315608843463590629118200216851867246639342237992722990474566613798191546669624093904464633611696975563699672813007781494784, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3315608843463590629118200216851867246639342237992722990474566613798191546669624093904464633611696975563699672813007781494784 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=116454035066204927635563955407649652218324268303629100279619700885633805329808556946554010953231137604781845900121414512265147004906941323529286715147812408944782576591958171892514577901019810908548746062321023375575757987752448799030075545358758714895063170375424316 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=116454035066204927635563955407649652218324268303629100279619700885633805329808556946554010953231137604781845900121414512265147004906941323529286715147812408944782576591958171892514577901019810908548746062321023375575757987752448799030075545358758714895063170375424316 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-38365216510840437502859, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=914323647222120684007, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-63942027518067395838098, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10236731732642342067917, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-39279540158062558186871, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697806, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-65465900263437596978118, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8712858987272140927897, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2437643884914041708635187698370843209367242268430786996112142432574371355183898087730385213496450112875492594342273633746944, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2437643884914041708635187698370843209367242268430786996112142432574371355183898087730385213496450112875492594342273633746944 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5117115407765928502341674574561293147630904877809126554262449161511385405227787020610323000859286266308414856661119204121404150375821305601674212923989643424343046758174600888998246681675118932794647141915265838620606906792639647510860803104403581387452663694486140 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5117115407765928502341674574561293147630904877809126554262449161511385405227787020610323000859286266308414856661119204121404150375821305601674212923989643424343046758174600888998246681675118932794647141915265838620606906792639647510860803104403581387452663694486140 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-40138415204370297495473, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5687714980036020389204, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-66897358673950495825788, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7281400576759242080227, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2034812903932483968648864307538373356971808164749428128110559572954030326149270861368160538384748611171491699514525024780288, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2034812903932483968648864307538373356971808164749428128110559572954030326149270861368160538384748611171491699514525024780288 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3902683545224242098945323297871309496995480717061479005352704183473766085004904830701742385713959284852517398028709744554366295605220309577824193050915257959927027956915598935219552451410380983213874882340667618418892188334421064515185079276074078716712714969929840 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3902683545224242098945323297871309496995480717061479005352704183473766085004904830701742385713959284852517398028709744554366295605220309577824193050915257959927027956915598935219552451410380983213874882340667618418892188334421064515185079276074078716712714969929840 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-40948184137565594831670, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4877946046840723053007, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-68246973562609324719450, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5931785688100413186565, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1652639921975621497379788270081927599571011707410703048211621988186014478090778364562973026099288212118978030062558395760640, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1652639921975621497379788270081927599571011707410703048211621988186014478090778364562973026099288212118978030062558395760640 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2759639370250446046035618699433101836681269827216438157437785627638180799859584813895530658709571582911419845219503459802621716728298352345712539886775941221002314688075463505341699920263448730067265230020115887634670014860347232971446215485181468042223966857778951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2759639370250446046035618699433101836681269827216438157437785627638180799859584813895530658709571582911419845219503459802621716728298352345712539886775941221002314688075463505341699920263448730067265230020115887634670014860347232971446215485181468042223966857778951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-41714159838211535978541, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4111970346194781906136, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-69523599730352559964235, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4655159520357177941780, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1301453938555801929186583262689517984662171719585928650466652315696486401496487962093341258053189467043695198674264736661504, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1301453938555801929186583262689517984662171719585928650466652315696486401496487962093341258053189467043695198674264736661504 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=112507293314670727867882215523831868713649905776109582954577494293798889673815110736542549613566513608698861307093290934565639137853070390064178458836798404823923866522869709631822484311418816744286265091059104153948609008521644591342509625930082519817353286769820 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=112507293314670727867882215523831868713649905776109582954577494293798889673815110736542549613566513608698861307093290934565639137853070390064178458836798404823923866522869709631822484311418816744286265091059104153948609008521644591342509625930082519817353286769820 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-42440837040846738953817, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3385293143559578930860, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-70734728401411231589695, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3444030849298506316320, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=960596954648329995352001931985120417250650554932471146773005280633120915390264924402228071420211273294155979973862067535872, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=960596954648329995352001931985120417250650554932471146773005280633120915390264924402228071420211273294155979973862067535872 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=63616873907402959623674243669028964632506234012469323646411736841980019385839238149504021818082361165649382199226525885399626852659704893752844651084805216602074576870728350790448963184095728456929980200294747108689588245232463420734175062766544694001965766172367 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=63616873907402959623674243669028964632506234012469323646411736841980019385839238149504021818082361165649382199226525885399626852659704893752844651084805216602074576870728350790448963184095728456929980200294747108689588245232463420734175062766544694001965766172367 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-43132052148749038532816, prec=73, ln2=None / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1198 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1405 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2694078035657279351861, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-71886753581248397554693, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2292005669461340351322, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=640397969765553330234667954656746944833767036621647431182003520422080610260176616268152047613474182196103986649241378357248, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=640397969765553330234667954656746944833767036621647431182003520422080610260176616268152047613474182196103986649241378357248 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1811139297567446088424855369437216669317848823230590146432981196349870049441767752916673713571674165216277298414226242754823393078287356150224155617318346402131653422448604831770843389052308405834982584833848227837283386376202285703809976556739239400222825086071 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1811139297567446088424855369437216669317848823230590146432981196349870049441767752916673713571674165216277298414226242754823393078287356150224155617318346402131653422448604831770843389052308405834982584833848227837283386376202285703809976556739239400222825086071 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (0, 9035365512355300862764, -73, 73, 73, 'd') / result: (0, 2258841378088825215691, -71, 71)

[2]libmpf._normalize. / x: (0, 2533556591542955012084, -73, 72, 73, 'd') / result: (0, 633389147885738753021, -71, 70)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (1, 6703708186976009930559261, -84, 83, 83, 'd') / result: (1, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 33518540934880049652796305, -84, 85, 83, 'd') / result: (1, 2094908808430003103299769, -80, 81)

[2]libmpf._normalize. / x: (0, 1750711592962066872460373123, -91, 91, 77, 'd') / result: (0, 106854955625126151883567, -77, 77)

[2]libmpf._normalize. / x: (1, 26182648167811157971625518150431, -107, 105, 77, 'd') / result: (1, 97537965207588516070043, -79, 77)

[2]libmpf._normalize. / x: (1, 160132888102537861168525166888336, -107, 107, 77, 'd') / result: (1, 149135373628267889068019, -77, 77)

[3]libmpf._normalize1 / x: (1, 10422414944021969395954273960305989372952683381, -156, 153, 73, 'd') / result: (1, 2155304894419480572357, -74, 71)

[3]libmpf._normalize1 / x: (1, 15935853731185174240265267144738468605031343773, -154, 154, 73, 'd') / result: (1, 3295457312729301012359, -72, 72)

[3]libmpf._normalize1 / x: (0, 21044770825898061427141, -74, 75, 73, 'd') / result: (0, 5261192706474515356785, -72, 73)

[2]libmpf._normalize1 / x: (0, 3295457312729301012359, -72, 72, 73, 'd') / result: (0, 3295457312729301012359, -72, 72)

[2]libmpf._normalize. / x: (0, 38540187594681661956416441848888658116281106, -144, 145, 63, 'd') / result: (0, 3984961997809671927, -61, 62)

[2]libmpf._normalize. / x: (0, 13971506682687208828281996105079933014899974, -143, 144, 63, 'd') / result: (0, 5778479728036962529, -62, 63)

[2]libmpf._normalize. / x: (1, 4111532972501794020029092875391392020127584, -143, 142, 63, 'd') / result: (1, 6801960725452009337, -64, 63)

[3]libmpf._normalize1 / x: (0, 417954647124010841, -59, 59, 53, 'n') / result: (0, 6530541361312669, -53, 53)

[3]libmpf._normalize1 / x: (1, 491982533219590525, -61, 59, 53, 'n') / result: (1, 3843613540778051, -54, 52)

[7]gammazeta.mpc_zeta / s: ((0, 3, -1, 2), (0, 5, -1, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 6530541361312669, -53, 53), (1, 3843613540778051, -54, 52))

zeta_ / result: (0.725035738259624 - 0.213363412536641j) / count: 544
zeta / count: 0 / s: Complex { re: 1.5, im: 2.5 }
zeta__ / s: Complex { re: 1.5, im: 2.5 } / result: Complex { re: 0.7250357382596239, im: -0.21336341253664076 } / z: Complex { re: NaN, im: NaN }
gamma_ / s: (-0.5, -2.5) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(-0.5-2.5j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(-0.5-2.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=-0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -53, 53, 53, 'd') / result: (1, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -53, 53, 53, 'd') / result: (1, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-2.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -51, 53, 53, 'd') / result: (1, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -51, 53, 53, 'd') / result: (1, 5, -1, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, -1, 1), (1, 5, -1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-0.5', imag='-2.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, -1, 1), (1, 5, -1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(1, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, -1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-0.5-2.5j) / result: (-0.5 - 2.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-0.5-2.5j) / result: (-0.5 - 2.5j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((1, 1, -1, 1), (1, 5, -1, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((1, 1, -1, 1), (1, 5, -1, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((1, 1, -1, 1), (1, 5, -1, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 5, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_neg / f_locals: z=((1, 1, -1, 1), (1, 5, -1, 3)), prec=None, rnd='d' / f_lineno: 109 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2055 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, -1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 111 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 111 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=24548310838692625530380802326528000, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=24548310838692625530380802326528000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=14074198079624317914798658420736000, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=14074198079624317914798658420736000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1095589024025757689577472, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1095589024025757689577472 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1095589024025757689577472, y=188894659314785808547840, prec=76 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=76, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 29, -1, 5), (0, 5, -1, 3)), prec=76, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 29, -1, 5), b=(0, 5, -1, 3), prec=76, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 29, -1, 5), t=(0, 29, -1, 5), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 841, -2, 10), t=(0, 25, -2, 5), prec=96, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=866 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=866, exp=-2, bc=10, prec=96, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 866, -2, 10, 96, 'd') / result: (0, 433, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 866, -2, 10, 96, 'd') / result: (0, 433, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 433, -1, 9), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=431 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=431, exp=-1, bc=9, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 431, -1, 9, 10, 'd') / result: (0, 431, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 431, -1, 9, 10, 'd') / result: (0, 431, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 433, -1, 9), prec=76, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=433, n=87 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=67003504626321207378915098624, prec=96 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=301756958467617494383905187876773141627797504, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=107670480682718808026640256723786711881748756647625780825860450997369031103213475802906624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=117081339978859764055153375205601253767471157805242736028054043700706639364380767002034176 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=122090873352184503596982221400929581003780910343489977274369241412464432752752608094978048 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=124675454029777161067936632395723543997960563393252050377439324412426123883487656090271744 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125988190226428677613149703181187567436166622445828455149257809956577763973867439107604480 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126649732551165524303191814530687058475545688490892989404668510083635844036848674205073408 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126981805192679328770390471410714934813928916529541810870822830251054550423642443798806528 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127148167878410917053695834366933106531067624381526815929425527074908914591469714622382080 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=426056617827949645023504831689, exp=-96, prec=76, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=426056617827949645023504831689 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=426056617827949645023504831689, exp=-96, bc=99, prec=76, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 426056617827949645023504831689, -96, 99, 76, 'd') / result: (0, 3174369169979912378069, -69, 72)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 426056617827949645023504831689, -96, 99, 76, 'd') / result: (0, 3174369169979912378069, -69, 72)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 3174369169979912378069, -69, 72), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 29, -1, 5), (0, 5, -1, 3)), prec=76, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5, -1, 3), x=(0, 29, -1, 5), prec=76, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5, -1, 3), t=(0, 29, -1, 5), prec=80, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=53359484451956046331858803 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=53359484451956046331858803, exp=-88, bc=86, prec=80, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 53359484451956046331858803, -88, 86, 80, 'd') / result: (0, 833741944561813223935293, -82, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 53359484451956046331858803, -88, 86, 80, 'd') / result: (0, 833741944561813223935293, -82, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 833741944561813223935293, -82, 80), prec=80, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 833741944561813223935293, -82, 80), prec=112 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=895223596299108211815601963794432, prec=112 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=22, prec=112 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=111 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=61327049295959213639223225249782994141446144, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=14480029203577767871420191418282409984, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=14480029203577767871420191418282409984, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=444146979030948277420818097584518042384709396366626444206873409324991390986896685476299000764183707006975345579312568860672, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=444146979030948277420818097584518042384709396366626444206873409324991390986896685476299000764183707006975345579312568860672 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=880085830672703614473355383303181556036810382123974779839640843045098213420313168051513486911863184968760455041816177450211583259190654328741162239672068055225920506247778019963551648031389754744053328339585007895425545180792541837006145303749956292957327693671 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=880085830672703614473355383303181556036810382123974779839640843045098213420313168051513486911863184968760455041816177450211583259190654328741162239672068055225920506247778019963551648031389754744053328339585007895425545180792541837006145303749956292957327693671 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=61327049295959213639223225249782994141446144, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=68380004581949403648559078773784158013821705820823976148992, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=68380004581949403648559078773784158013821705820823976148992, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=61327049295959213639223225249782994141446144, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=68380004581949403648559078773778973583900707556099099413703, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=886507902184390359906432341366050, exp=-112, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=886507902184390359906432341366050 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=886507902184390359906432341366050, exp=-112, bc=110, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 886507902184390359906432341366050, -112, 110, 80, 'd') / result: (0, 412812410939666610167563, -81, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 886507902184390359906432341366050, -112, 110, 80, 'd') / result: (0, 412812410939666610167563, -81, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 412812410939666610167563, -81, 79), prec=76, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=412812410939666610167563, exp=-81, bc=79, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 412812410939666610167563, -81, 79, 76, 'd') / result: (0, 51601551367458326270945, -78, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 412812410939666610167563, -81, 79, 76, 'd') / result: (0, 51601551367458326270945, -78, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3174369169979912378069, -70, 72), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 51601551367458326270945, -78, 76), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1786249462544947171769439, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1786249462544947171769439 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=499537162172374108838422, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=499537162172374108838422 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_sin_pi / f_locals: z=((1, 1, -1, 1), (1, 5, -1, 3)), prec=76, rnd='d' / f_lineno: 518 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: f / f_locals: prec=81, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 522 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=101, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7964883625991394727376702227904 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7964883625991394727376702227904, exp=-101, bc=103, prec=81, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7964883625991394727376702227904, -101, 103, 81, 'd') / result: (0, 474744059204542322598499, -77, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7964883625991394727376702227904, -101, 103, 81, 'd') / result: (0, 474744059204542322598499, -77, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, -1, 3), t=(0, 474744059204542322598499, -77, 79), prec=81, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 522 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=2373720296022711612992495, exp=-78, bc=81, prec=81, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 2373720296022711612992495, -78, 81, 81, 'd') / result: (1, 2373720296022711612992495, -78, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 2373720296022711612992495, -78, 81, 81, 'd') / result: (1, 2373720296022711612992495, -78, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin_pi / f_locals: x=(1, 1, -1, 1), prec=82, rnd='d' / f_lineno: 1381 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 526 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 1, -1, 1), prec=82, rnd='d', which=0, pi=1 / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1381 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_cosh_sinh / f_locals: x=(1, 2373720296022711612992495, -78, 81), prec=82, rnd='d', tanh=0 / f_lineno: 1196 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 527 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1237 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_expneg_basecase / f_locals: x=18171981135795506213748426872, prec=96 / f_lineno: 1111 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1248 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=18171981135795506213748426872, prec=96 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1118 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=99653046822758329480521022754, exp=-86, prec=82, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1258 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=99653046822758329480521022754 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=99653046822758329480521022754, exp=-86, bc=97, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 99653046822758329480521022754, -86, 97, 82, 'd') / result: (0, 1520584820903905173958145, -70, 81)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 99653046822758329480521022754, -86, 97, 82, 'd') / result: (0, 1520584820903905173958145, -70, 81)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-99653016786990234492302379238, exp=-86, prec=82, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1259 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=99653016786990234492302379238 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=99653016786990234492302379238, exp=-86, bc=97, prec=82, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 99653016786990234492302379238, -86, 97, 82, 'd') / result: (1, 3041168725188910964730907, -71, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 99653016786990234492302379238, -86, 97, 82, 'd') / result: (1, 3041168725188910964730907, -71, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, 0, 1), t=(0, 1520584820903905173958145, -70, 81), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 528 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1520584820903905173958145, exp=-70, bc=81, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 1520584820903905173958145, -70, 81, 76, 'd') / result: (1, 2969892228327939792887, -61, 72)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 1520584820903905173958145, -70, 81, 76, 'd') / result: (1, 2969892228327939792887, -61, 72)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(1, 3041168725188910964730907, -71, 82), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 529 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((1, 2969892228327939792887, -61, 72), (0, 0, 0, 0)), w=((1, 1, -1, 1), (1, 5, -1, 3)), prec=76, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 2969892228327939792887, -61, 72), t=(1, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(1, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 2969892228327939792887, -61, 72), t=(1, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(1, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 2969892228327939792887, -62, 72), t=(0, 0, 0, 0), prec=76, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 2969892228327939792887, -62, 72), t=(0, 0, 0, 0), prec=76, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2969892228327939792887, exp=-62, bc=72, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 2969892228327939792887, -62, 72, 76, 'd') / result: (0, 2969892228327939792887, -62, 72)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 2969892228327939792887, -62, 72, 76, 'd') / result: (0, 2969892228327939792887, -62, 72)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 14849461141639698964435, -62, 74), t=(0, 0, 0, 0), prec=76, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=14849461141639698964435, exp=-62, bc=74, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 14849461141639698964435, -62, 74, 76, 'd') / result: (0, 14849461141639698964435, -62, 74)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 14849461141639698964435, -62, 74, 76, 'd') / result: (0, 14849461141639698964435, -62, 74)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: f / f_locals: prec=76, rnd='d' / f_lineno: 114 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 2167 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 116 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=248902613312231085230521944622 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=248902613312231085230521944622, exp=-96, bc=98, prec=76, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 119 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 248902613312231085230521944622, -96, 98, 76, 'd') / result: (0, 14835751850141947581203, -72, 74)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 248902613312231085230521944622, -96, 98, 76, 'd') / result: (0, 14835751850141947581203, -72, 74)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 14835751850141947581203, -72, 74), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2167 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((0, 1786249462544947171769439, -76, 81), (0, 249768581086187054419211, -75, 78)), prec=76, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2174 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(0, 1786249462544947171769439, -76, 81), prec=80, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1461970633869107911625312628, prec=94 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=21324318101097736831333358016, exp=-60, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=21324318101097736831333358016 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=21324318101097736831333358016, exp=-60, bc=95, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 21324318101097736831333358016, -60, 95, 80, 'd') / result: (0, 650766543612601832010905, -45, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 21324318101097736831333358016, -60, 95, 80, 'd') / result: (0, 650766543612601832010905, -45, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(0, 249768581086187054419211, -75, 78), prec=80, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=249768581086187054419211, exp=-75, mag=3, wp=90 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=112, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=425942265652792247718925071613512, prec=110 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=867635959037201286124388841793011989774781146390619100311101543797657600997658641395560838702126311362463465782843157774336, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=867635959037201286124388841793011989774781146390619100311101543797657600997658641395560838702126311362463465782843157774336 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=52325365243955965121058149052196190520979327763892958010000636007135151438901101811275488477179410578113747363477485081763597819702283350913071255375686396652661543459635514494283424290502002149010309728285350727275803799235907242555925684905756508288126937598832 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=52325365243955965121058149052196190520979327763892958010000636007135151438901101811275488477179410578113747363477485081763597819702283350913071255375686396652661543459635514494283424290502002149010309728285350727275803799235907242555925684905756508288126937598832 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1228815938800814662501430300669267, exp=-110, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1228815938800814662501430300669267 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=1228815938800814662501430300669267, exp=-110, bc=110, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1228815938800814662501430300669267, -110, 110, 80, 'd') / result: (0, 1144424023852510994767239, -80, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1228815938800814662501430300669267, -110, 110, 80, 'd') / result: (0, 1144424023852510994767239, -80, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=418339641016707262261823502559378, exp=-110, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=418339641016707262261823502559378 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=418339641016707262261823502559378, exp=-110, bc=109, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 418339641016707262261823502559378, -110, 109, 80, 'd') / result: (0, 779218303070789691548465, -81, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 418339641016707262261823502559378, -110, 109, 80, 'd') / result: (0, 779218303070789691548465, -81, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 650766543612601832010905, -45, 80), t=(0, 1144424023852510994767239, -80, 80), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=744752866429724375543507090859441657379784741295, exp=-125, bc=160, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 744752866429724375543507090859441657379784741295, -125, 160, 76, 'd') / result: (0, 19251410382936331563401, -40, 75)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 744752866429724375543507090859441657379784741295, -125, 160, 76, 'd') / result: (0, 19251410382936331563401, -40, 75)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 650766543612601832010905, -45, 80), t=(0, 779218303070789691548465, -81, 80), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=507089201809054651846625251330786537374216010825, exp=-126, bc=159, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 507089201809054651846625251330786537374216010825, -126, 159, 76, 'd') / result: (0, 52431794571429962035599, -43, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 507089201809054651846625251330786537374216010825, -126, 159, 76, 'd') / result: (0, 52431794571429962035599, -43, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((0, 2969892228327939792887, -62, 72), (0, 14849461141639698964435, -62, 74)), w=((0, 19251410382936331563401, -40, 75), (0, 52431794571429962035599, -43, 76)), prec=76, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2174 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 2969892228327939792887, -62, 72), t=(0, 19251410382936331563401, -40, 75), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 14849461141639698964435, -62, 74), t=(0, 52431794571429962035599, -43, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 2969892228327939792887, -62, 72), t=(0, 52431794571429962035599, -43, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 14849461141639698964435, -62, 74), t=(0, 19251410382936331563401, -40, 75), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 57174614080634418462738501079237284849328687, -102, 146), t=(0, 778583896074884534741545010509763044904921565, -105, 150), prec=76, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 57174614080634418462738501079237284849328687, -102, 146), t=(0, 778583896074884534741545010509763044904921565, -105, 150), prec=76, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=321186983429809187039637001875864766110292069 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=321186983429809187039637001875864766110292069, exp=-105, bc=148, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 321186983429809187039637001875864766110292069, -105, 148, 76, 'd') / result: (1, 68013989298567350534097, -33, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 321186983429809187039637001875864766110292069, -105, 148, 76, 'd') / result: (1, 68013989298567350534097, -33, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 155716779214976906948309002101952608980984313, -105, 147), t=(0, 285873070403172092313692505396186424246643435, -102, 148), prec=76, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2442701342440353645457849045271444002954131793 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2442701342440353645457849045271444002954131793, exp=-105, bc=151, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2442701342440353645457849045271444002954131793, -105, 151, 76, 'd') / result: (0, 64657766167165271864361, -30, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2442701342440353645457849045271444002954131793, -105, 151, 76, 'd') / result: (0, 64657766167165271864361, -30, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_mul / f_locals: z=((1, 14835751850141947581203, -72, 74), (0, 0, 0, 0)), w=((0, 41586456159625, -7, 46), (0, 11921309479625, -6, 44)), prec=76, rnd='d' / f_lineno: 145 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2176 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14835751850141947581203, -72, 74), t=(0, 41586456159625, -7, 46), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 155 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(0, 11921309479625, -6, 44), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14835751850141947581203, -72, 74), t=(0, 11921309479625, -6, 44), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 157 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 0, 0, 0), t=(0, 41586456159625, -7, 46), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 158 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 616966343911003585918913369217528875, -79, 119), t=(0, 0, 0, 0), prec=76, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 159 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 616966343911003585918913369217528875, -79, 119), t=(0, 0, 0, 0), prec=76, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 0, 0, 0), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=616966343911003585918913369217528875, exp=-79, bc=119, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 616966343911003585918913369217528875, -79, 119, 76, 'd') / result: (1, 35070476309954505377329, -35, 75)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 616966343911003585918913369217528875, -79, 119, 76, 'd') / result: (1, 35070476309954505377329, -35, 75)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 176861589168461332101655163361488875, -78, 118), t=(0, 0, 0, 0), prec=76, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 160 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=176861589168461332101655163361488875, exp=-78, bc=118, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 884 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 176861589168461332101655163361488875, -78, 118, 76, 'd') / result: (1, 10053417393490993396293, -34, 74)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 176861589168461332101655163361488875, -78, 118, 76, 'd') / result: (1, 10053417393490993396293, -34, 74)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((1, 35070476309954505377329, -35, 75), (1, 10053417393490993396293, -34, 74)), w=((1, 68013989298567350534097, -33, 76), (0, 64657766167165271864361, -30, 76)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2177 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 68013989298567350534097, -33, 76), t=(1, 68013989298567350534097, -33, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 64657766167165271864361, -30, 76), t=(0, 64657766167165271864361, -30, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 4625902740305634079112897770816352151159605409, -66, 152), t=(0, 4180626725727822091008702672537723360781938321, -60, 152), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=272186013186886247903669868813230647241203657953 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=272186013186886247903669868813230647241203657953, exp=-66, bc=158, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 272186013186886247903669868813230647241203657953, -66, 158, 63, 'd') / result: (0, 3435470476017685469, 30, 62)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 272186013186886247903669868813230647241203657953, -66, 158, 63, 'd') / result: (0, 3435470476017685469, 30, 62)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 35070476309954505377329, -35, 75), t=(1, 68013989298567350534097, -33, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 10053417393490993396293, -34, 74), t=(0, 64657766167165271864361, -30, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 2385283000440905513066026932168641066665286913, -68, 151), t=(1, 650031511009252825873875520243798283416213773, -64, 149), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8015221175707139700915981391732131467994133455 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=8015221175707139700915981391732131467994133455, exp=-68, bc=153, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 8015221175707139700915981391732131467994133455, -68, 153, 63, 'd') / result: (1, 809330512923514463, 25, 60)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 8015221175707139700915981391732131467994133455, -68, 153, 63, 'd') / result: (1, 809330512923514463, 25, 60)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 10053417393490993396293, -34, 74), t=(1, 68013989298567350534097, -33, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 35070476309954505377329, -35, 75), t=(0, 64657766167165271864361, -30, 76), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 683773023014927291442557959587059933529902421, -67, 149), t=(1, 2267578656620147586099257049834745763612471769, -65, 151), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 683773023014927291442557959587059933529902421, -67, 149), t=(1, 2267578656620147586099257049834745763612471769, -65, 151), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9754087649495517635839586158926042987979789497 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=9754087649495517635839586158926042987979789497, exp=-67, bc=153, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 9754087649495517635839586158926042987979789497, -67, 153, 63, 'd') / result: (0, 7879289254692992365, 23, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 9754087649495517635839586158926042987979789497, -67, 153, 63, 'd') / result: (0, 7879289254692992365, 23, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 809330512923514463, 25, 60), t=(0, 3435470476017685469, 30, 62), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=543212092316176857 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=543212092316176857, exp=-66, bc=59, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 543212092316176857, -66, 59, 53, 'n') / result: (1, 8487688942440263, -60, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 543212092316176857, -66, 59, 53, 'n') / result: (1, 8487688942440263, -60, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 7879289254692992365, 23, 63), t=(0, 3435470476017685469, 30, 62), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=661059532178209445 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=661059532178209445, exp=-65, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 661059532178209445, -65, 60, 53, 'n') / result: (0, 5164527595142261, -58, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 661059532178209445, -65, 60, 53, 'n') / result: (0, 5164527595142261, -58, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 8487688942440263, -60, 53), (0, 5164527595142261, -58, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-0.00736189663261994 + 0.0179180545232466j) / count: 284
gamma__ / s: Complex { re: -0.5, im: -2.5 } / result: Complex { re: -0.007361896632619941, im: 0.017918054523246647 }
zeta_ / s: (-0.5, -2.5) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(-0.5-2.5j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(-0.5-2.5j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(-0.5-2.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=-0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 4503599627370496, -53, 53, 53, 'd') / result: (1, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 4503599627370496, -53, 53, 53, 'd') / result: (1, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=-2.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-5629499534213120, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=5629499534213120, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 5629499534213120, -51, 53, 53, 'd') / result: (1, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 5629499534213120, -51, 53, 53, 'd') / result: (1, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((1, 1, -1, 1), (1, 5, -1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='-0.5', imag='-2.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((1, 1, -1, 1), (1, 5, -1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(1, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(1, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 1, -1, 1), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1254 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (-0.5-2.5j) / result: (-0.5 - 2.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (-0.5-2.5j) / result: (-0.5 - 2.5j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((1, 1, -1, 1), (1, 5, -1, 3)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((1, 1, -1, 1), (1, 5, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(1, 1, -1, 1), y=(1, 5, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1, -1, 1), t=(1, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 5, -1, 3), t=(1, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 25, -2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=26, exp=-2, bc=5, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 26, -2, 5, 14, 'd') / result: (0, 13, -1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 26, -2, 5, 14, 'd') / result: (0, 13, -1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 13, -1, 4), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=27262976 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=27262976 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=27262976 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5221, exp=-11, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5221 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5221, exp=-11, bc=13, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5221, -11, 13, 10, 'd') / result: (0, 163, -6, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5221, -11, 13, 10, 'd') / result: (0, 163, -6, 8)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 163, -6, 8), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 163, -6, 8), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((1, 1, -1, 1), (1, 5, -1, 3)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(1, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(1, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3, exp=-1, bc=2, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 3, -1, 2, 73, 'd') / result: (0, 3, -1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 3, -1, 2, 73, 'd') / result: (0, 3, -1, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(1, 5, -1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(1, 5, -1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, -1, 3, 73, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, -1, 3, 73, 'd') / result: (0, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 3, -1, 2), (0, 5, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 3, -1, 2), y=(0, 5, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3, -1, 2), t=(0, 3, -1, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, -2, 4), t=(0, 25, -2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=34 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=34, exp=-2, bc=6, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 34, -2, 6, 14, 'd') / result: (0, 17, -1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 34, -2, 6, 14, 'd') / result: (0, 17, -1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 17, -1, 5), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=8912896 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=8912896 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=8912896 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=2985, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2985 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=2985, exp=-10, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2985, -10, 12, 10, 'd') / result: (0, 373, -7, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2985, -10, 12, 10, 'd') / result: (0, 373, -7, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(1, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(1, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(1, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((1, 1, -1, 1), (1, 5, -1, 3)), prec=730, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1165 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(1, 1, -1, 1), prec=730, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(1, 1, -1, 1), prec=730, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3, exp=-1, bc=2, prec=730, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 3, -1, 2, 730, 'd') / result: (0, 3, -1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 3, -1, 2, 730, 'd') / result: (0, 3, -1, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(1, 5, -1, 3), prec=730, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(1, 5, -1, 3), prec=730, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 5, -1, 3), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=5, exp=-1, bc=3, prec=730, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 5, -1, 3, 730, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 5, -1, 3, 730, 'd') / result: (0, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 3, -1, 2), (0, 5, -1, 3)), prec=73, rnd='d', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1166 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 3, -1, 2), (0, 5, -1, 3)) / prec: 73 / rnd: d / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 3, -1, 2), (0, 5, -1, 3)) / prec: 73 / rnd: d / type: 0call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 3, -1, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -1, 2), prec=96 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=96 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=772277518722799029367566535171796841267200000, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=772277518722799029367566535171796841267200000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-180748899232726765749870561746592622182400000, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=180748899232726765749870561746592622182400000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=1465721006513890245480563081216, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1465721006513890245480563081216 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: complex_stirling_series / f_locals: x=1465721006513890245480563081216, y=198070406285660843983859875840, prec=96 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=219186244839373642163325646 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1749 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=153 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1750 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: stirling_coefficient / f_locals: n=22 / f_lineno: 1648 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1753 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: stirling_coefficient / f_locals: n=24 / f_lineno: 1648 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1753 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: stirling_coefficient / f_locals: n=26 / f_lineno: 1648 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1753 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpc_log / f_locals: z=((0, 37, -1, 6), (0, 5, -1, 3)), prec=96, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 37, -1, 6), b=(0, 5, -1, 3), prec=96, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 37, -1, 6), t=(0, 37, -1, 6), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1369, -2, 11), t=(0, 25, -2, 5), prec=116, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1394 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=1394, exp=-2, bc=11, prec=116, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1394, -2, 11, 116, 'd') / result: (0, 697, -1, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1394, -2, 11, 116, 'd') / result: (0, 697, -1, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 697, -1, 10), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=695 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=695, exp=-1, bc=10, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 695, -1, 10, 10, 'd') / result: (0, 695, -1, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 695, -1, 10, 10, 'd') / result: (0, 695, -1, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 697, -1, 10), prec=96, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: lshift / f_locals: x=697, n=106 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_taylor_cached / f_locals: x=56547357974980857141964936585412608, prec=116 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_taylor / f_locals: x=242520604034020526664200936215050931377537024, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=86534243135302875735036511177546826177479370238738502834640731979409752480180807342751744 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=104962304677526819086157034602122492702732068093320370278323734916796050531328244104298496 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=115599521729953439630638438865360559642128145084959706596799842463604298673645377745321984 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=121315802920254206501841894904884070960906872496336072702415357850159793040397153962295296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=124279084887216170974024883349437551203410736649164138534348186301016939057246181301157888 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=125787759495207558200356192520168462291958788907920998874015225255968642982037380472504320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=126548950873329954242010831121954237852070856932442176197644137078320206533499666802147328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=126931272175230373517882198668618377281989242282611819640572251425215662544579246203863040 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=116, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=486301238298717316738011280104484197, exp=-116, prec=96, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=486301238298717316738011280104484197 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=486301238298717316738011280104484197, exp=-116, bc=119, prec=96, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 486301238298717316738011280104484197, -116, 119, 96, 'd') / result: (0, 14492906281313816211760380271, -91, 94)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 486301238298717316738011280104484197, -116, 119, 96, 'd') / result: (0, 14492906281313816211760380271, -91, 94)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_shift / f_locals: s=(0, 14492906281313816211760380271, -91, 94), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpc_arg / f_locals: z=((0, 37, -1, 6), (0, 5, -1, 3)), prec=96, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5, -1, 3), x=(0, 37, -1, 6), prec=96, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 5, -1, 3), t=(0, 37, -1, 6), prec=100, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=87707717204980196427880005561151 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=87707717204980196427880005561151, exp=-109, bc=107, prec=100, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 87707717204980196427880005561151, -109, 107, 100, 'd') / result: (0, 342608270331953892296406271723, -101, 99)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 87707717204980196427880005561151, -109, 107, 100, 'd') / result: (0, 342608270331953892296406271723, -101, 99)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_atan / f_locals: x=(0, 342608270331953892296406271723, -101, 99), prec=100, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 342608270331953892296406271723, -101, 99), prec=132 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: atan_taylor / f_locals: x=735745658207434515596485637689787285504, prec=132 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=17, prec=132 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=131 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: atan_newton / f_locals: x=16125669515545602639468189656249912799277791144475767510391020979278014086176047104, prec=276 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=276, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=702043790779777101118939381077377024, prec=122, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=121, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=702043790779777101118939381077377024, prec=122 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=340856983907471933834581330704397567411521164653457503693647035063365486106223037691113186632978193749539218700402669125632, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=340856983907471933834581330704397567411521164653457503693647035063365486106223037691113186632978193749539218700402669125632 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=520352089751556564460975110225379842354212174773830521696479436056222827292555885960237412041695115126143483560331728454966537923745155118630109173038160170319277208530564124877681633902443232657117676641017485361817417482819671033500149246134649473204469421820 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=520352089751556564460975110225379842354212174773830521696479436056222827292555885960237412041695115126143483560331728454966537923745155118630109173038160170319277208530564124877681633902443232657117676641017485361817417482819671033500149246134649473204469421820 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: rshift / f_locals: x=16125669515545602639468189656249912799277791144475767510391020979278014086176047104, n=154 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=207206754192823132587048884881163447080245375806860165120, prec=190, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=189, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=207206754192823132587048884881163447080245375806860165120, prec=190 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: rshift / f_locals: x=16125669515545602639468189656249912799277791144475767510391020979278014086176047104, n=86 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=18050254018237170074067042621925407026493420594962238230664140687007316701284424837787254869983232, prec=326, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=325, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=18050254018237170074067042621925407026493420594962238230664140687007316701284424837787254869983232, prec=326 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: rshift / f_locals: x=16125669515545602639468189656249912799277791144475767510391020979278014086176047104, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: rshift / f_locals: x=18050254018237170074067042621925407026493420594962238230065836709466821154001290888320795842512785, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=731315491135833069701964869379309168408, exp=-132, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=731315491135833069701964869379309168408 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=731315491135833069701964869379309168408, exp=-132, bc=130, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 731315491135833069701964869379309168408, -132, 130, 100, 'd') / result: (0, 681090626060807211047005717995, -102, 100)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 731315491135833069701964869379309168408, -132, 130, 100, 'd') / result: (0, 681090626060807211047005717995, -102, 100)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_pos / f_locals: s=(0, 681090626060807211047005717995, -102, 100), prec=96, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=681090626060807211047005717995, exp=-102, bc=100, prec=96, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 681090626060807211047005717995, -102, 100, 96, 'd') / result: (0, 21284082064400225345218928687, -97, 95)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 681090626060807211047005717995, -102, 100, 96, 'd') / result: (0, 21284082064400225345218928687, -97, 95)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 14492906281313816211760380271, -92, 94), prec=96 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 21284082064400225345218928687, -97, 95), prec=96 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=2754787163539957990343584336643, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2754787163539957990343584336643 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=573155234191598708492729983801, exp=-96, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=573155234191598708492729983801 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_exp / f_locals: z=((0, 2754787163539957990343584336643, -96, 102), (0, 573155234191598708492729983801, -96, 99)), prec=96, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_exp / f_locals: x=(0, 2754787163539957990343584336643, -96, 102), prec=100, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: g / f_locals: prec=120, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2345740574283352712547081975818799, prec=114 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=23252527025005565254526978700078423, exp=-64, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=23252527025005565254526978700078423 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=23252527025005565254526978700078423, exp=-64, bc=115, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 23252527025005565254526978700078423, -64, 115, 100, 'd') / result: (0, 709610810089281166214812582399, -49, 100)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 23252527025005565254526978700078423, -64, 115, 100, 'd') / result: (0, 709610810089281166214812582399, -49, 100)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_cos_sin / f_locals: x=(0, 573155234191598708492729983801, -96, 99), prec=100, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mod_pi2 / f_locals: man=573155234191598708492729983801, exp=-96, mag=3, wp=110 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=132, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1294503273016815820851007951440652821979, prec=130 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=790582146134313768216315360051776458420, exp=-130, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=790582146134313768216315360051776458420 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=790582146134313768216315360051776458420, exp=-130, bc=130, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 790582146134313768216315360051776458420, -130, 130, 100, 'd') / result: (0, 368143499891419787060616239929, -99, 99)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 790582146134313768216315360051776458420, -130, 130, 100, 'd') / result: (0, 368143499891419787060616239929, -99, 99)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=1107995170571930641270028521089131724657, exp=-130, prec=100, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1107995170571930641270028521089131724657 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=1107995170571930641270028521089131724657, exp=-130, bc=130, prec=100, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1107995170571930641270028521089131724657, -130, 130, 100, 'd') / result: (0, 1031900914918566719880354144693, -100, 100)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1107995170571930641270028521089131724657, -130, 130, 100, 'd') / result: (0, 1031900914918566719880354144693, -100, 100)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 709610810089281166214812582399, -49, 100), t=(0, 368143499891419787060616239929, -99, 99), prec=96, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=261238607187053588150820097004497423630454537261465866409671, exp=-148, bc=198, prec=96, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 261238607187053588150820097004497423630454537261465866409671, -148, 198, 96, 'd') / result: (0, 12880057759015963378113081331, -44, 94)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 261238607187053588150820097004497423630454537261465866409671, -148, 198, 96, 'd') / result: (0, 12880057759015963378113081331, -44, 94)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 709610810089281166214812582399, -49, 100), t=(0, 1031900914918566719880354144693, -100, 100), prec=96, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=732248044167234531235402939815718431750401478166166231058507, exp=-149, bc=199, prec=96, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 732248044167234531235402939815718431750401478166166231058507, -149, 199, 96, 'd') / result: (0, 72205231871010008238527299175, -46, 96)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 732248044167234531235402939815718431750401478166166231058507, -149, 199, 96, 'd') / result: (0, 72205231871010008238527299175, -46, 96)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_div / f_locals: z=((0, 12880057759015963378113081331, -44, 94), (0, 72205231871010008238527299175, -46, 96)), w=((0, 4990726492172321875, -9, 63), (1, 1168062384262596875, -9, 61)), prec=73, rnd='d' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 4990726492172321875, -9, 63), t=(0, 4990726492172321875, -9, 63), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 1168062384262596875, -9, 61), t=(1, 1168062384262596875, -9, 61), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 24907350919670648757456919828603515625, -18, 125), t=(0, 1364369733529222519755857118759765625, -18, 121), prec=83, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=26271720653199871277212776947363281250 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=26271720653199871277212776947363281250, exp=-18, bc=125, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 26271720653199871277212776947363281250, -18, 125, 83, 'd') / result: (0, 5973497685135924092995259, 24, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 26271720653199871277212776947363281250, -18, 125, 83, 'd') / result: (0, 5973497685135924092995259, 24, 83)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 12880057759015963378113081331, -44, 94), t=(0, 4990726492172321875, -9, 63), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 72205231871010008238527299175, -46, 96), t=(1, 1168062384262596875, -9, 61), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 64280845478630635985192696934620100988985415625, -53, 156), t=(1, 84340215295485598958931468980593256565545078125, -55, 156), prec=83, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=172783166619036944981839318757887147390396584375 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=172783166619036944981839318757887147390396584375, exp=-55, bc=157, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 172783166619036944981839318757887147390396584375, -55, 157, 83, 'd') / result: (0, 1143383084822294591143467, 22, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 172783166619036944981839318757887147390396584375, -55, 157, 83, 'd') / result: (0, 1143383084822294591143467, 22, 80)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 72205231871010008238527299175, -46, 96), t=(0, 4990726492172321875, -9, 63), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 12880057759015963378113081331, -44, 94), t=(1, 1168062384262596875, -9, 61), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 360356563572094915853978649821310715532521953125, -55, 158), t=(1, 15044710975436146594832554259280691658141440625, -53, 154), prec=83, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 360356563572094915853978649821310715532521953125, -55, 158), t=(1, 15044710975436146594832554259280691658141440625, -53, 154), prec=83, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=420535407473839502233308866858433482165087715625 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=420535407473839502233308866858433482165087715625, exp=-55, bc=159, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 420535407473839502233308866858433482165087715625, -55, 159, 83, 'd') / result: (0, 2782869887635581216347853, 22, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 420535407473839502233308866858433482165087715625, -55, 159, 83, 'd') / result: (0, 2782869887635581216347853, 22, 82)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 1143383084822294591143467, 22, 80), t=(0, 5973497685135924092995259, 24, 83), prec=73, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=925598639732857129890313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=925598639732857129890313, exp=-84, bc=80, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 925598639732857129890313, -84, 80, 73, 'd') / result: (0, 1807809843228236581817, -75, 71)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 925598639732857129890313, -84, 80, 73, 'd') / result: (0, 1807809843228236581817, -75, 71)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 2782869887635581216347853, 22, 82), t=(0, 5973497685135924092995259, 24, 83), prec=73, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=563201567510804744813265 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=563201567510804744813265, exp=-82, bc=79, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 563201567510804744813265, -82, 79, 73, 'd') / result: (0, 8800024492356324137707, -76, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 563201567510804744813265, -82, 79, 73, 'd') / result: (0, 8800024492356324137707, -76, 73)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 3, -1, 2), (0, 5, -1, 3)), prec=73, rnd='d', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1167 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 3, -1, 2), (0, 5, -1, 3)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 3, -1, 2), y=(0, 5, -1, 3), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3, -1, 2), t=(0, 3, -1, 2), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 9, -2, 4), t=(0, 25, -2, 5), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=34 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=34, exp=-2, bc=6, prec=14, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 34, -2, 6, 14, 'd') / result: (0, 17, -1, 5)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 34, -2, 6, 14, 'd') / result: (0, 17, -1, 5)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 17, -1, 5), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=8912896 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=8912896 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=8912896 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=2985, exp=-10, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2985 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=2985, exp=-10, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 2985, -10, 12, 10, 'd') / result: (0, 373, -7, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 2985, -10, 12, 10, 'd') / result: (0, 373, -7, 9)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=73, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 373, -7, 9), t=(0, 73, 0, 7) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 373, -7, 9), t=(0, 73, 0, 7) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 3, -1, 2), (0, 5, -1, 3)), prec=93, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 3, -1, 2), prec=93, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 3, -1, 2), prec=93, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1, exp=-1, bc=1, prec=93, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 1, -1, 1, 93, 'd') / result: (1, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 1, -1, 1, 93, 'd') / result: (1, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 5, -1, 3), prec=93, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
[2]libmpf._normalize1 / x: (1, 5, -1, 3, 93, 'd') / result: (1, 5, -1, 3)

[2]libmpf._normalize. / x: (0, 26, -2, 5, 14, 'd') / result: (0, 13, -1, 4)

[2]libmpf._normalize. / x: (0, 5221, -11, 13, 10, 'd') / result: (0, 163, -6, 8)

[2]gammazeta.borwein_coefficients / n: 42 / result: [1, 3529, 2076817, 488608401, 61478817681, 4799740409745, 254491767943057, 9737301077340049, 280787600504270737, 6304127587769397137, 113012350730582110097, 1650349868562966130577, 19953578432320987475857, 202422687806400954118033, 1742307499719932947738513, 12843638005836798078758801, 81734555945005570000695185, 452099989999431623684403089, 2186350832000315525854146449, 9291105348305501355511132049, 34850004287731592942713057169, 115831045294414958622024150929, 342338269928330588207073996689, 902588023612218522253187624849, 2129376048079597243081113743249, 4508844085740406908948176973713, 8596648150439746591335183036305, 14812624142603103089500190158737, 23167864599601900460410297134993, 33074864778499446042372674432913, 43407250275812931434634001264529, 52849007091972478107202786439057, 60370565349290053482274943676305, 65560265219140874720086968250257, 68635811674056857455401381408657, 70184409806221592447592820912017, 70837535309536766282327708151697, 71063868323643764693772304396177, 71126606246852371270979753881489, 71139976966417309069652004188049, 71142033349236473553878179393425, 71142236448774168811579530030993, 71142246120180725728612927680401]

[2]libmpf._normalize. / x: (0, 9474267427483471957473647757, -93, 93, 93, 'd') / result: (0, 9474267427483471957473647757, -93, 93)

[2]libmpf._normalize. / x: (0, 2656626636533745594752572603, -93, 92, 93, 'd') / result: (0, 2656626636533745594752572603, -93, 92)

[2]libmpf._normalize. / x: (0, 7370805100797290441810754461379827637, -123, 123, 103, 'd') / result: (0, 7029347515866556588946108304385, -103, 103)

[2]libmpf._normalize1 / x: (1, 7029347515866556588946108304385, -104, 103, 103, 'd') / result: (1, 7029347515866556588946108304385, -104, 103)

[3]libmpf._normalize1 / x: (1, 35146737579332782944730541521925, -104, 105, 103, 'd') / result: (1, 8786684394833195736182635380481, -102, 103)

[2]libmpf._normalize. / x: (0, 1835754159301792232857008151837435, -111, 111, 97, 'd') / result: (0, 56022770974786139918731938227, -96, 96)

[2]libmpf._normalize. / x: (1, 27454496485210752781255234577502347992, -127, 125, 97, 'd') / result: (1, 102275969405512335826662311619, -99, 97)

[2]libmpf._normalize. / x: (1, 167911503275006740312647439630319688156, -127, 127, 97, 'd') / result: (1, 19547471692204328755923481615, -94, 94)

[3]libmpf._normalize1 / x: (1, 5729783210229251745425557314814793861887446898936132359513, -195, 192, 93, 'd') / result: (1, 2260000984970801260639905783, -94, 91)

[3]libmpf._normalize1 / x: (1, 1095103529748478378912027930405996096972426356450950196605, -190, 190, 93, 'd') / result: (1, 6911074894304879076671544609, -93, 93)

[3]libmpf._normalize1 / x: (0, 22067041613536885659025893367, -94, 95, 93, 'd') / result: (0, 5516760403384221414756473341, -92, 93)

[2]libmpf._normalize1 / x: (0, 6911074894304879076671544609, -93, 93, 93, 'd') / result: (0, 6911074894304879076671544609, -93, 93)

[3]libmpf._normalize1 / x: (0, 169501537588083345032969897820975181492367975784451772005, -186, 187, 83, 'd') / result: (0, 2089267755907637275320971, -80, 81)

[3]libmpf._normalize1 / x: (0, 122894672441317399173125827460769075434323880920815639501, -186, 187, 83, 'd') / result: (0, 6059175159306086020981053, -82, 83)

[3]libmpf._normalize1 / x: (1, 36165426490001147120328805556272576562210075328105338767, -186, 185, 83, 'd') / result: (1, 3566186384825783071302629, -83, 82)

[3]libmpf._normalize1 / x: (0, 438257212062706790745483, -79, 79, 73, 'd') / result: (0, 3423884469239896802699, -72, 72)

[3]libmpf._normalize1 / x: (1, 515881076753265354776033, -81, 79, 73, 'd') / result: (1, 8060641824269771168375, -75, 73)

[7]gammazeta.mpc_zeta / s: ((0, 3, -1, 2), (0, 5, -1, 3)) / prec: 73 / rnd: d / alt: 0 / force: False / result: ((0, 3423884469239896802699, -72, 72), (1, 8060641824269771168375, -75, 73))

[2]libmpf._normalize. / x: (0, 995610453248924340922087778488, -98, 100, 78, 'd') / result: (0, 237372029602271161299249, -76, 78)

[3]libmpf._normalize1 / x: (1, 1186860148011355806496245, -78, 80, 78, 'd') / result: (1, 296715037002838951624061, -76, 78)

[2]libmpf._normalize. / x: (0, 1750711592962066872460373072, -91, 91, 79, 'd') / result: (0, 213709911250252303767135, -78, 78)

[2]libmpf._normalize. / x: (1, 1750711592962066872460373068, -91, 91, 79, 'd') / result: (1, 213709911250252303767135, -78, 78)

[2]libmpf._normalize. / x: (0, 15713705970901797705251515176, -89, 94, 79, 'd') / result: (0, 239772124800137294086479, -73, 78)

[2]libmpf._normalize. / x: (1, 15701510483222253883606196880, -89, 94, 79, 'd') / result: (1, 29948254553265102164471, -70, 75)

[3]libmpf._normalize1 / x: (1, 51241679511321760517377614913251974010168067665, -151, 156, 73, 'd') / result: (1, 5298265480802632708791, -68, 73)

[3]libmpf._normalize1 / x: (1, 6400238822678249438734187014989176675654460585, -148, 153, 73, 'd') / result: (1, 1323538367457165761137, -66, 71)

[2]libmpf._normalize. / x: (0, 1175409358604344043874510131134287648884263686251049, -168, 170, 148, 'd') / result: (0, 70059857285281660787732012935536363654390793, -144, 146)

[2]libmpf._normalize. / x: (0, 74553150924144135383490614002952, -105, 106, 85, 'd') / result: (0, 17774856310878785940048841, -83, 84)

[2]libmpf._normalize1 / x: (1, 17774856310878785940048841, -84, 84, 85, 'd') / result: (1, 17774856310878785940048841, -84, 84)

[3]libmpf._normalize1 / x: (1, 88874281554393929700244205, -84, 87, 85, 'd') / result: (1, 22218570388598482425061051, -82, 85)

[2]libmpf._normalize. / x: (0, 3950932978181990101077564966, -93, 92, 79, 'd') / result: (0, 120572905828307803377611, -78, 77)

[2]libmpf._normalize. / x: (1, 76213034775388867908018541564398, -109, 106, 79, 'd') / result: (1, 567831358130193262606997, -82, 79)

[2]libmpf._normalize. / x: (0, 644546926146230344338707038292373, -109, 109, 79, 'd') / result: (0, 600281102718999930041569, -79, 79)

[3]libmpf._normalize1 / x: (1, 68465076870191914825699437906589145583881744167, -160, 156, 75, 'd') / result: (1, 14158246055993868733597, -78, 74)

[3]libmpf._normalize1 / x: (0, 72377636868650741862173650976654999645833911659, -157, 156, 75, 'd') / result: (0, 29934689000075560248981, -76, 75)

[3]libmpf._normalize1 / x: (1, 2307435361610501900143763, -87, 81, 75, 'd') / result: (1, 18026838762582046094873, -80, 74)

[3]libmpf._normalize1 / x: (0, 2439297906831672874966371, -84, 82, 75, 'd') / result: (0, 9528507448561222167837, -76, 74)

[3]libmpf._normalize1 / x: (0, 902637069881201787176096113319745332387971359, -148, 150, 73, 'd') / result: (0, 5973151075019220332967, -71, 73)

[3]libmpf._normalize1 / x: (1, 178079035646889367834825095012965840631069667, -146, 147, 73, 'd') / result: (1, 4713712825255884742689, -71, 72)

[3]libmpf._normalize1 / x: (0, 125615482838600805880463471238873200104963089, -146, 147, 73, 'd') / result: (0, 3325014145298500807487, -71, 72)

[3]libmpf._normalize1 / x: (1, 177261096456786187819910010504186443446059513, -146, 147, 73, 'd') / result: (1, 9384124310332526234411, -72, 73)

[3]libmpf._normalize1 / x: (0, 106624496973217636713802067875029244292691093, -148, 147, 53, 'n') / result: (0, 168223794402055, -49, 48)

[2]libmpf._normalize. / x: (0, 12295493617761508569394403450102203362307522, -147, 144, 53, 'n') / result: (0, 4966110323428617, -56, 53)

[5]gammazeta.mpc_zeta / s: ((1, 1, -1, 1), (1, 5, -1, 3)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 168223794402055, -49, 48), (0, 4966110323428617, -56, 53))

zeta_ / result: (0.298825487735952 + 0.0689186252987392j) / count: 908
zeta / count: 0 / s: Complex { re: -0.5, im: -2.5 }
gamma_ / s: (1.5, 2.5) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(1.5+2.5j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(1.5+2.5j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=1.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-52, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-52, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=2.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, -1, 2), (0, 5, -1, 3)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='1.5', imag='2.5') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, -1, 2), (0, 5, -1, 3)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3, -1, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, -1, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -1, 2), prec=68 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=68, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=150000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=150000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 5, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (1.5+2.5j) / result: (1.5 + 2.5j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (1.5+2.5j) / result: (1.5 + 2.5j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 3, -1, 2), (0, 5, -1, 3)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 3, -1, 2), (0, 5, -1, 3)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 3, -1, 2), (0, 5, -1, 3)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 3, -1, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 5, -1, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, -1, 2), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7301484710524170392644161110016000, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7301484710524170392644161110016000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-8359027393372216133623488708608000, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=8359027393372216133623488708608000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1095589024025757689577472, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1095589024025757689577472 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=1095589024025757689577472, y=188894659314785808547840, prec=76 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=76, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 29, -1, 5), (0, 5, -1, 3)), prec=76, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 29, -1, 5), b=(0, 5, -1, 3), prec=76, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 29, -1, 5), t=(0, 29, -1, 5), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 5, -1, 3), t=(0, 5, -1, 3), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 841, -2, 10), t=(0, 25, -2, 5), prec=96, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=866 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=866, exp=-2, bc=10, prec=96, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 866, -2, 10, 96, 'd') / result: (0, 433, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 866, -2, 10, 96, 'd') / result: (0, 433, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 433, -1, 9), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=431 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=431, exp=-1, bc=9, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 431, -1, 9, 10, 'd') / result: (0, 431, -1, 9)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 431, -1, 9, 10, 'd') / result: (0, 431, -1, 9)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 433, -1, 9), prec=76, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=433, n=87 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=67003504626321207378915098624, prec=96 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=96, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=426056617827949645023504831689, exp=-96, prec=76, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=426056617827949645023504831689 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=426056617827949645023504831689, exp=-96, bc=99, prec=76, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 426056617827949645023504831689, -96, 99, 76, 'd') / result: (0, 3174369169979912378069, -69, 72)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 426056617827949645023504831689, -96, 99, 76, 'd') / result: (0, 3174369169979912378069, -69, 72)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 3174369169979912378069, -69, 72), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 29, -1, 5), (0, 5, -1, 3)), prec=76, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 5, -1, 3), x=(0, 29, -1, 5), prec=76, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 5, -1, 3), t=(0, 29, -1, 5), prec=80, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=53359484451956046331858803 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=53359484451956046331858803, exp=-88, bc=86, prec=80, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 53359484451956046331858803, -88, 86, 80, 'd') / result: (0, 833741944561813223935293, -82, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 53359484451956046331858803, -88, 86, 80, 'd') / result: (0, 833741944561813223935293, -82, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 833741944561813223935293, -82, 80), prec=80, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 833741944561813223935293, -82, 80), prec=112 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=895223596299108211815601963794432, prec=112 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=22, prec=112 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=111 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=886507902184390359906432341366050, exp=-112, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=886507902184390359906432341366050 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=886507902184390359906432341366050, exp=-112, bc=110, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 886507902184390359906432341366050, -112, 110, 80, 'd') / result: (0, 412812410939666610167563, -81, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 886507902184390359906432341366050, -112, 110, 80, 'd') / result: (0, 412812410939666610167563, -81, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 412812410939666610167563, -81, 79), prec=76, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=412812410939666610167563, exp=-81, bc=79, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 412812410939666610167563, -81, 79, 76, 'd') / result: (0, 51601551367458326270945, -78, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 412812410939666610167563, -81, 79, 76, 'd') / result: (0, 51601551367458326270945, -78, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3174369169979912378069, -70, 72), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 51601551367458326270945, -78, 76), prec=76 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1786249462544947171769439, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1786249462544947171769439 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=499537162172374108838422, exp=-76, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=499537162172374108838422 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((0, 1786249462544947171769439, -76, 81), (0, 249768581086187054419211, -75, 78)), prec=76, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(0, 1786249462544947171769439, -76, 81), prec=80, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=1461970633869107911625312628, prec=94 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=21324318101097736831333358016, exp=-60, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=21324318101097736831333358016 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=21324318101097736831333358016, exp=-60, bc=95, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 21324318101097736831333358016, -60, 95, 80, 'd') / result: (0, 650766543612601832010905, -45, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 21324318101097736831333358016, -60, 95, 80, 'd') / result: (0, 650766543612601832010905, -45, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(0, 249768581086187054419211, -75, 78), prec=80, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=249768581086187054419211, exp=-75, mag=3, wp=90 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=112, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=425942265652792247718925071613512, prec=110 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=1228815938800814662501430300669267, exp=-110, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1228815938800814662501430300669267 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=1228815938800814662501430300669267, exp=-110, bc=110, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 1228815938800814662501430300669267, -110, 110, 80, 'd') / result: (0, 1144424023852510994767239, -80, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 1228815938800814662501430300669267, -110, 110, 80, 'd') / result: (0, 1144424023852510994767239, -80, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=418339641016707262261823502559378, exp=-110, prec=80, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=418339641016707262261823502559378 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=418339641016707262261823502559378, exp=-110, bc=109, prec=80, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 418339641016707262261823502559378, -110, 109, 80, 'd') / result: (0, 779218303070789691548465, -81, 80)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 418339641016707262261823502559378, -110, 109, 80, 'd') / result: (0, 779218303070789691548465, -81, 80)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 650766543612601832010905, -45, 80), t=(0, 1144424023852510994767239, -80, 80), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=744752866429724375543507090859441657379784741295, exp=-125, bc=160, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 744752866429724375543507090859441657379784741295, -125, 160, 76, 'd') / result: (0, 19251410382936331563401, -40, 75)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 744752866429724375543507090859441657379784741295, -125, 160, 76, 'd') / result: (0, 19251410382936331563401, -40, 75)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 650766543612601832010905, -45, 80), t=(0, 779218303070789691548465, -81, 80), prec=76, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=507089201809054651846625251330786537374216010825, exp=-126, bc=159, prec=76, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 507089201809054651846625251330786537374216010825, -126, 159, 76, 'd') / result: (0, 52431794571429962035599, -43, 76)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 507089201809054651846625251330786537374216010825, -126, 159, 76, 'd') / result: (0, 52431794571429962035599, -43, 76)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((0, 19251410382936331563401, -40, 75), (0, 52431794571429962035599, -43, 76)), w=((0, 12369196227375, -7, 44), (1, 14160743218375, -7, 44)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 12369196227375, -7, 44), t=(0, 12369196227375, -7, 44), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 14160743218375, -7, 44), t=(1, 14160743218375, -7, 44), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 152997015311307932699390625, -14, 87), t=(0, 200526648496753552937640625, -14, 88), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=353523663808061485637031250 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 868 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=353523663808061485637031250, exp=-14, bc=89, prec=63, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 869 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 353523663808061485637031250, -14, 89, 63, 'd') / result: (0, 5267913100243530953, 12, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 353523663808061485637031250, -14, 89, 63, 'd') / result: (0, 5267913100243530953, 12, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 19251410382936331563401, -40, 75), t=(0, 12369196227375, -7, 44), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 52431794571429962035599, -43, 76), t=(1, 14160743218375, -7, 44), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 238124472680263976448841784824302375, -47, 118), t=(1, 742473179404607974421892249580931625, -50, 120), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1162522602037503837168842029013487375 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1162522602037503837168842029013487375, exp=-50, bc=120, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 1162522602037503837168842029013487375, -50, 120, 63, 'd') / result: (0, 8066620996432404247, 7, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1162522602037503837168842029013487375, -50, 120, 63, 'd') / result: (0, 8066620996432404247, 7, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 52431794571429962035599, -43, 76), t=(0, 12369196227375, -7, 44), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 19251410382936331563401, -40, 75), t=(1, 14160743218375, -7, 44), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 648539155607432491369770626248322625, -50, 119), t=(1, 272614279024319719005831172100693375, -47, 118), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 648539155607432491369770626248322625, -50, 119), t=(1, 272614279024319719005831172100693375, -47, 118), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=2829453387801990243416420003053869625 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2829453387801990243416420003053869625, exp=-50, bc=122, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2829453387801990243416420003053869625, -50, 122, 63, 'd') / result: (0, 4908319216002221269, 9, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2829453387801990243416420003053869625, -50, 122, 63, 'd') / result: (0, 4908319216002221269, 9, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 8066620996432404247, 7, 63), t=(0, 5267913100243530953, 12, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=882719650013787393 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=882719650013787393, exp=-64, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 882719650013787393, -64, 60, 53, 'n') / result: (0, 3448123632866357, -56, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 882719650013787393, -64, 60, 53, 'n') / result: (0, 3448123632866357, -56, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 4908319216002221269, 9, 63), t=(0, 5267913100243530953, 12, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=537110869894795175 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=537110869894795175, exp=-62, bc=59, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 537110869894795175, -62, 59, 53, 'n') / result: (0, 8392357342106175, -56, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 537110869894795175, -62, 59, 53, 'n') / result: (0, 8392357342106175, -56, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 3448123632866357, -56, 52), (0, 8392357342106175, -56, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (0.0478523281120296 + 0.116467354401103j) / count: 164
gamma__ / s: Complex { re: 1.5, im: 2.5 } / result: Complex { re: 0.04785232811202962, im: 0.11646735440110322 }
zeta / count: 1 / s: Complex { re: 1.5, im: 2.5 }
zeta__ / s: Complex { re: -0.5, im: -2.5 } / result: Complex { re: 0.29882548773595197, im: 0.06891862529873917 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (0.5, 14.134725) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5+14.134725j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5+14.134725j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5+14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7957142780373054, -49, 53, 53, 'd') / result: (0, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7957142780373054, -49, 53, 53, 'd') / result: (0, 3978571390186527, -48, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+14.134725j) / result: (0.5 + 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+14.134725j) / result: (0.5 + 14.134725j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 3978571390186527, -48, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 15829030306810754071359852321729, -96, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15848837347439320155758238309313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15848837347439320155758238309313, exp=-96, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6401, -5, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13109248 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13109248 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13109248 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3620, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3620, exp=-8, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 905, -6, 10), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 905, -6, 10), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(0, 3978571390186527, -48, 52), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(0, 3978571390186527, -48, 52), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(0, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3978571390186527, exp=-48, bc=52, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 3978571390186527, -48, 52, 73, 'd') / result: (1, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 3978571390186527, -48, 52, 73, 'd') / result: (1, 3978571390186527, -48, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 3978571390186527, -48, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3978571390186527, -48, 52), t=(1, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 15829030306810754071359852321729, -96, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15848837347439320155758238309313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15848837347439320155758238309313, exp=-96, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6401, -5, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13109248 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13109248 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13109248 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3620, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3620, exp=-8, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=45 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 45 / result: [1, 4051, 2736451, 739027171, 106764890851, 9573696452323, 583327124420323, 25664548404164323, 851672769217066723, 22025556704041924323, 455310086907194799843, 7676718923626409391843, 107311229250534993327843, 1260619007250012201842403, 12586223430355989445244643, 107825444073394299229992675, 799077851966414289603163875, 5158527083919185637090293475, 29183936184458903285463807715, 145449144946956939472898651875, 641514035666948560539287320291, 2514000556967729940871184152291, 8784653093416858284308234008291, 27457262868620929351431893579491, 76986029222708323529476210456291, 194156939340377930327821051524835, 441576659045864279524929313208035, 908060519119520582902845518673635, 1693207379711025218198662924236515, 2872115128040193097693048163563235, 4449320522415034644948813274707683, 6325953064637876253264768589395683, 8306842970317542395376054754899683, 10155673548951897461346588509370083, 11674993497680392932591908609619683, 12768400566371956133016076863960803, 13452849435662449529212739307992803, 13822314985986603313609160575448803, 13992398776170915511899723629098723, 14058212084260882469746421687154403, 14079205696461732689211444358837987, 14084578948605882850772802163996387, 14085639418334848803484854421583587, 14085790872561530124227861611312867, 14085804799386972084755954226460387, 14085805418356991727446091676022499]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 45 / result: [1, 4051, 2736451, 739027171, 106764890851, 9573696452323, 583327124420323, 25664548404164323, 851672769217066723, 22025556704041924323, 455310086907194799843, 7676718923626409391843, 107311229250534993327843, 1260619007250012201842403, 12586223430355989445244643, 107825444073394299229992675, 799077851966414289603163875, 5158527083919185637090293475, 29183936184458903285463807715, 145449144946956939472898651875, 641514035666948560539287320291, 2514000556967729940871184152291, 8784653093416858284308234008291, 27457262868620929351431893579491, 76986029222708323529476210456291, 194156939340377930327821051524835, 441576659045864279524929313208035, 908060519119520582902845518673635, 1693207379711025218198662924236515, 2872115128040193097693048163563235, 4449320522415034644948813274707683, 6325953064637876253264768589395683, 8306842970317542395376054754899683, 10155673548951897461346588509370083, 11674993497680392932591908609619683, 12768400566371956133016076863960803, 13452849435662449529212739307992803, 13822314985986603313609160575448803, 13992398776170915511899723629098723, 14058212084260882469746421687154403, 14079205696461732689211444358837987, 14084578948605882850772802163996387, 14085639418334848803484854421583587, 14085790872561530124227861611312867, 14085804799386972084755954226460387, 14085805418356991727446091676022499]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=178405961588244985132285746181186892047843328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-92534249710111795780385, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11316013240881837288036, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3160673850778376113738845066531686534179559890422969579704727052405752689348613622226685912414888705677545482494642931892224, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3160673850778376113738845066531686534179559890422969579704727052405752689348613622226685912414888705677545482494642931892224 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=111632460967373837407354403753895723681789657144573205056976045556515349354119667191838605595576729770243430291345509727538352528942610935461423631220207445083103010928295062038190811143034129291631549816719120721101356952514956549567992195890476572404580642642694495 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=111632460967373837407354403753895723681789657144573205056976045556515349354119667191838605595576729770243430291345509727538352528942610935461423631220207445083103010928295062038190811143034129291631549816719120721101356952514956549567992195890476572404580642642694495 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=267608942382367477698428619271780338071764992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-146663315822894713294213, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1694202678524762517817, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=464804978055643546138065450960542137379347042709260232309518684177316571963031415033336163590424809658462570955094548807680, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=464804978055643546138065450960542137379347042709260232309518684177316571963031415033336163590424809658462570955094548807680 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=962994051344196787362805239277482892631263401325567352538580239037526547840242202233961182802509043050508567854711746428513644369481971582570860018212696085607543261471704941897099979045661669236988876228911180480437749915981712192498955158815685110480406390720 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=962994051344196787362805239277482892631263401325567352538580239037526547840242202233961182802509043050508567854711746428513644369481971582570860018212696085607543261471704941897099979045661669236988876228911180480437749915981712192498955158815685110480406390720 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=356811923176489970264571492362373784095686656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-185068499420223591560783, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7796274631621726994856, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2179418897105350849669595781170542021934271689147864644829076496920306592982213968267420678168436329731902277144998884409344, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2179418897105350849669595781170542021934271689147864644829076496920306592982213968267420678168436329731902277144998884409344 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4343191077352272429939724505830096292121100169758460386755553734071429503067409151887766822545206286927923341264542061977507130504516498226524982341874164085406279439270871414879999514800478408586794072181714815188225916874058121940877125020551895564566321332695951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4343191077352272429939724505830096292121100169758460386755553734071429503067409151887766822545206286927923341264542061977507130504516498226524982341874164085406279439270871414879999514800478408586794072181714815188225916874058121940877125020551895564566321332695951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=446014903970612462830714365452967230119608320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-214857874141231343584460, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7678403610897870133585, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2148431898568307946593724751106505879442315219633913962675108584641818821518011873931864933929074675754671439081325914488832, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2148431898568307946593724751106505879442315219633913962675108584641818821518011873931864933929074675754671439081325914488832 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4248932001365617342943161371516735444219618132761992457054010457339231731947846722816002715130979408451881328990680037796217315677483783361394452363384101088444818815762895251753111478434080493836047299755995152865019790628897213320062346901381334863542782677053440 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4248932001365617342943161371516735444219618132761992457054010457339231731947846722816002715130979408451881328990680037796217315677483783361394452363384101088444818815762895251753111478434080493836047299755995152865019790628897213320062346901381334863542782677053440 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=535217884764734955396857238543560676143529984 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-239197565533006509074597, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13010215919406599805854, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=624420865558857447963000111634154122167451648 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-259776481382589775916712, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7267051919965280544942, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2024483904420136334290240630850361309474489341578111234059236935527867735661203496589641956971628059845748086826634034806784, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2024483904420136334290240630850361309474489341578111234059236935527867735661203496589641956971628059845748086826634034806784 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3871214814050782701080432801454941227499883483609999654157003783902564212561959837168508900122589138287372454803982871561949165118529667578270653429386188463721442173990515650912109276568513962643223714978951437304255477969856986530237929164114604509705383002283151 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3871214814050782701080432801454941227499883483609999654157003783902564212561959837168508900122589138287372454803982871561949165118529667578270653429386188463721442173990515650912109276568513962643223714978951437304255477969856986530237929164114604509705383002283151 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=713623846352979940529142984724747568191373312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-277602749130335387341181, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4276536022361616701676, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1187834943919977951241722819121385462191664664701442815902103304008697906127746949529636862508863402460515459107463846952960, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1187834943919977951241722819121385462191664664701442815902103304008697906127746949529636862508863402460515459107463846952960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=95012273951100171539691734580727118632213178753315586957227260561312151208625669609086672797633452246408902189880964517583599491415532870270179743045158155594351283359138441861042358680418101430793296603397496633948949649334298039797435020706453112319536748107911 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=95012273951100171539691734580727118632213178753315586957227260561312151208625669609086672797633452246408902189880964517583599491415532870270179743045158155594351283359138441861042358680418101430793296603397496633948949649334298039797435020706453112319536748107911 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=802826827147102433095285857815341014215294976 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-293326631645789426588426, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3388405357049525035634, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=939938955623634726634754578609096322256012908589837358670360005780795734414130194845190908593970170642668754598080087588864, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=939938955623634726634754578609096322256012908589837358670360005780795734414130194845190908593970170642668754598080087588864 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=61025196621664124465465595028348374744915066434026098003186017165850628352862912732173379686107334223491195570620533564647061939927831926913351964652875972645920771964035999225724667130770099129413234349416358381121560371598885585402351894704671971666419393382236 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=61025196621664124465465595028348374744915066434026098003186017165850628352862912732173379686107334223491195570620533564647061939927831926913351964652875972645920771964035999225724667130770099129413234349416358381121560371598885585402351894704671971666419393382236 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=892029807941224925661428730905934460239216640 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-307392123851343139364859, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4158665001637759840404, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=981232788735347418227571603996527906263138304 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-320115909254039904082176, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=6270631449082942704290, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1070435769529469910793714477087121352287059968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-331731815243118304854995, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9490477310146489512674, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1159638750323592403359857350177714798310981632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-342417412915683532528371, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13640631487723209420501, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1248841731117714895926000223268308244334903296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-352310731092701571697097, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3747313310705170251775, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1338044711911837388492143096358901690358824960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-361521189964126056878687, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9372606289422632651388, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1427247692705959881058285969449495136382746624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-370136998840447183121579, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=756797413101506408496, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1516450673500082373624428842540088582406668288 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-378230307233061956523797, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7499240870628680587481, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2096786901006569774800606367666445641955721103777329492418495397511005869077675050039272026863471919125953375641870964621312, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2096786901006569774800606367666445641955721103777329492418495397511005869077675050039272026863471919125953375641870964621312 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4091592594170751151109404508525902361513745009008188846962029413900196850389778960882496850055864203367094486444904802568921685303500853590758847998716987872545749478526213688508093234540047473370547061155551111305154275452373542660362547476102410045355221991976960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4091592594170751151109404508525902361513745009008188846962029413900196850389778960882496850055864203367094486444904802568921685303500853590758847998716987872545749478526213688508093234540047473370547061155551111305154275452373542660362547476102410045355221991976960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1605653654294204866190571715630682028430589952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-385860881355901222368824, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14704418597931362323657, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4110941805914358474732223321828794903932891622184123832426409695612711014250811181850395402421979427645957849780614009454592, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4110941805914358474732223321828794903932891622184123832426409695612711014250811181850395402421979427645957849780614009454592 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128944690813795035099834268518049164363515518636118000926256061817303028018100248539937189997676526313343798234374020130442897724711209428349141438006468333232603826153185844160654960768805345624685776279556617769128539092071551731146030418235864008112394727309180672 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128944690813795035099834268518049164363515518636118000926256061817303028018100248539937189997676526313343798234374020130442897724711209428349141438006468333232603826153185844160654960768805345624685776279556617769128539092071551731146030418235864008112394727309180672 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1694856635088327358756714588721275474454511616 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-393078785279443022451842, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7486514674389562240639, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1784059615882449851322857461811868920478433280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-399926373561454935145257, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=638926392377649547224, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=175592991709909784096602503696204807454419993912387198872484836244764038297145201234815884023049372537641415694146829549568, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=175592991709909784096602503696204807454419993912387198872484836244764038297145201234815884023049372537641415694146829549568 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=8665939886431528002672251188168139359163272038688746516296269518626406825050286944524377738881754809685914017561571389458462120252392691122710311599237811182653935632908562851108553657472192600549194803463319427224322685306022205689754674941098475672897870455 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8665939886431528002672251188168139359163272038688746516296269518626406825050286944524377738881754809685914017561571389458462120252392691122710311599237811182653935632908562851108553657472192600549194803463319427224322685306022205689754674941098475672897870455 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=441, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1873262596676572343889000334902462366502354944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-406439797205484489210925, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8961254598490043062759, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2499617881988127514786929758498915494351155207458688360420078257131346898112302276401496701975173420829954270469619573587968, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2499617881988127514786929758498915494351155207458688360420078257131346898112302276401496701975173420829954270469619573587968 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5297793625591197483193180204165731213979706298415294596530132816620129736310211480965358301622685124973209823278854654921437695163584709408664132957127522248055119765650311366435862118913487171300133231885357128511401606551801268523631399289027638005878688198145340 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5297793625591197483193180204165731213979706298415294596530132816620129736310211480965358301622685124973209823278854654921437695163584709408664132957127522248055119765650311366435862118913487171300133231885357128511401606551801268523631399289027638005878688198145340 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1962465577470694836455143207993055812526276608 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-412650158964151699862561, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=2750892839822832411123, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=764345963913724942538152074912891514801592914677450159797875169536031696116984993610375024570920798105027338903933258039296, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=764345963913724942538152074912891514801592914677450159797875169536031696116984993610375024570920798105027338903933258039296 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=40938290804694274843113727818664606116730508935344965078317676415474105841463829280949876442606708002014818956440133869003051298380831075815527055204023167610821300832103245360998449715619896650436122257610857631186161059916686379446151053201134099073640420304367 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=40938290804694274843113727818664606116730508935344965078317676415474105841463829280949876442606708002014818956440133869003051298380831075815527055204023167610821300832103245360998449715619896650436122257610857631186161059916686379446151053201134099073640420304367 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2051668558264817329021286081083649258550198272 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-418584411620941391260587, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11652392033175088594300, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2140871539058939821587428954174242704574119936 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-424266064953230100635394, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5970738700886379219493, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1662968921487969131738411946769939647068330530582019942262944625612177068578845729341491607512408763444721642750449385734144, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1662968921487969131738411946769939647068330530582019942262944625612177068578845729341491607512408763444721642750449385734144 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2789560246066154960018852375321706412320576387249125621458010634011257961638158892605847980087261950571145402488650703426329140302437619862681502480278114603636616978812698768466691812327544155202351979429829418097315042091815852507089878364237204099310412142470287 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2789560246066154960018852375321706412320576387249125621458010634011257961638158892605847980087261950571145402488650703426329140302437619862681502480278114603636616978812698768466691812327544155202351979429829418097315042091815852507089878364237204099310412142470287 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2230074519853062314153571827264836150598041600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-429715748282462687168935, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=521055371653792685952, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=144605993172866881020731473632168664962463524398436516718516923966276266832943106899260139783687718560410577630473859629056, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=144605993172866881020731473632168664962463524398436516718516923966276266832943106899260139783687718560410577630473859629056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=367501740107863281836387802053990800781930783847049256022654196197784600741571600087751173149768363752247296204085890618665479043833615650155129202110356772020673251337217202196643804723196863418753837806319535360624205491019912594493679529673996859732910012 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=367501740107863281836387802053990800781930783847049256022654196197784600741571600087751173149768363752247296204085890618665479043833615650155129202110356772020673251337217202196643804723196863418753837806319535360624205491019912594493679529673996859732910012 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=438, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2319277500647184806719714700355429596621963264 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-434951662625795328308769, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10120892878463099127321, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2830145866383251814262887412515301014265357548940828970062402654768549793730457949314091307195031063253749876482131252740096, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2830145866383251814262887412515301014265357548940828970062402654768549793730457949314091307195031063253749876482131252740096 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=99280149635882160368162407015798443222641189554406445373196466423186645492665787714755247682188280825190654819137321244640841709522246583916973405382240090866107740055817251701388199798831048025209607410618102196801384448818110406617921175013839164961637932186178716 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=99280149635882160368162407015798443222641189554406445373196466423186645492665787714755247682188280825190654819137321244640841709522246583916973405382240090866107740055817251701388199798831048025209607410618102196801384448818110406617921175013839164961637932186178716 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2408480481441307299285857573446023042645884928 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-439989947468684139882638, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5082608035574287553452, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=28, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2497683462235429791852000446536616488669806592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-444844980802813367477495, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=227574701445059958595, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=29, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2586886443029552284418143319627209934693728256 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-449529626490112153701211, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10378680864288221316082, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2902448862969685254773253149331385346746589311140047228421661116751687927146929502763721377086874922533955165297368182554624, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2902448862969685254773253149331385346746589311140047228421661116751687927146929502763721377086874922533955165297368182554624 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=102196154760157817812739172287690713225678234227744115006595680814474430450213054973204492095444287349684310236904645981547959392062508499872307604414424222978856492162848213599156689212286781420207798537896064607482945547664998878994895192622283579945228773948483740 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=102196154760157817812739172287690713225678234227744115006595680814474430450213054973204492095444287349684310236904645981547959392062508499872307604414424222978856492162848213599156689212286781420207798537896064607482945547664998878994895192622283579945228773948483740 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=30, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2676089423823674776984286192717803380717649920 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=-454055439674237852659071, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5852867680162522358222, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1631981922950926228662540916705903504576374061068069260108976713333689297114643635005935863273047109467490804686776415813632, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1631981922950926228662540916705903504576374061068069260108976713333689297114643635005935863273047109467490804686776415813632 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 1235332605446049793123610219249947, -108, 110, 88, 'd') / result: (0, 294526244508278320580389551, -86, 88)

[2]libmpf._normalize. / x: (1, 153120441794174, -73, 48, 73, 'd') / result: (1, 76560220897087, -72, 47)

[2]libmpf._normalize. / x: (1, 2515609284194685, -73, 52, 73, 'd') / result: (1, 2515609284194685, -73, 52)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (1, 26671181600861946303071036718460217276547, -131, 135, 83, 'd') / result: (1, 5922191981447154929945283, -79, 83)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (1, 151121746166493518974841525782529, -107, 107, 77, 'd') / result: (1, 70371546860082782327589, -76, 76)

[2]libmpf._normalize. / x: (0, 59078682726760234328303176772303, -107, 106, 77, 'd') / result: (0, 55021310901977340065225, -77, 76)

[3]libmpf._normalize1 / x: (1, 7519548517005631292626979655834296412779829963, -152, 153, 73, 'd') / result: (1, 6220024748418928932523, -72, 73)

[3]libmpf._normalize1 / x: (0, 5879299734867058439431761933794605628385657575, -153, 153, 73, 'd') / result: (0, 2431621378035093300407, -72, 72)

[3]libmpf._normalize1 / x: (0, 10942391231288574146219, -72, 74, 73, 'd') / result: (0, 5471195615644287073109, -71, 73)

[2]libmpf._normalize1 / x: (1, 2431621378035093300407, -72, 72, 73, 'd') / result: (1, 2431621378035093300407, -72, 72)

[3]libmpf._normalize1 / x: (0, 125648708384698363898211291208006903590069173, -144, 147, 63, 'd') / result: (0, 3247942986504735535, -59, 62)

[3]libmpf._normalize1 / x: (0, 4441505534611752507045341591641202863, -145, 122, 63, 'd') / result: (0, 963097989946490775, -83, 60)

[2]libmpf._normalize. / x: (1, 13949555956200469759062948925906440074, -144, 124, 63, 'd') / result: (1, 6049655549168262979, -83, 63)

[3]libmpf._normalize1 / x: (0, 683741302274438299, -85, 60, 53, 'n') / result: (0, 5341728924019049, -78, 53)

[3]libmpf._normalize1 / x: (1, 536861176988063609, -82, 59, 53, 'n') / result: (1, 4194227945219247, -75, 52)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5341728924019049, -78, 53), (1, 4194227945219247, -75, 52))

zeta_ / result: (1.76742984138492e-8 - 1.11020289309231e-7j) / count: 550
zeta / count: 0 / s: Complex { re: 0.5, im: 14.134725 }
gamma_ / s: (0.5, -14.134725) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-14.134725j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=56 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 3978571390186527, -48, 52), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=287275361037200865517000943840, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=287275361037200865517000943840 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-243790725006669908234919702522, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=243790725006669908234919702522 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3324546003940230230441984, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3324546003940230230441984 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=3324546003940230230441984, y=-8543917002826194402410496, prec=79 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=79, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 11, -1, 4), (1, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 11, -1, 4), b=(1, 3978571390186527, -48, 52), prec=79, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 11, -1, 4), t=(0, 11, -1, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3978571390186527, -48, 52), t=(1, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 121, -2, 7), t=(0, 15829030306810754071359852321729, -96, 104), prec=99, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18225682222867250283564556819393 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=18225682222867250283564556819393, exp=-96, bc=104, prec=99, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 284776284732300785680696200303, -90, 98), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=283538344693015405405797076079 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=283538344693015405405797076079, exp=-90, bc=98, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 284776284732300785680696200303, -90, 98), prec=79, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=284776284732300785680696200303, n=1 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=569552569464601571361392400606, prec=99 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor / f_locals: x=320573212228877707659575950169320196648468480, prec=148, r=8 / f_lineno: 600 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 646 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=114384344374250927695737917073768793223104914683389975011306714685426684312882676372602880 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=120676485028096484433951552367843431407527463960676057612806510180772854322011304760442880 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=123951185326074664259857871786972098313394081357046750141548787348173476088241469901504512 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=125621709862019204453913212908825132427429745625801802714947246381288877340626171700707328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126465396056981193274815852744801877898272499397908483525622083986070613245447135251398656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=126889361632846350693997912295296262541909385612810917707591166893070219651155061672771584 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127101877115422858141706372732003982758358472832807458644577177971327327704869509082906624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=127208268290567809871602809777025776342159359187110407689967463022858021207834437890342912 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 610 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3446903713076390561309005800422, exp=-99, prec=79, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3446903713076390561309005800422 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3446903713076390561309005800422, exp=-99, bc=102, prec=79, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 410902942785786457217813, -76, 79), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 11, -1, 4), (1, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 11, -1, 4), prec=83, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=795361000990365733460758901 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=795361000990365733460758901, exp=-88, bc=90, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 3106878910118616146331089, -80, 82), prec=83, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 3106878910118616146331089, -80, 82), prec=115, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4137755196124176474103397727147895027 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4137755196124176474103397727147895027, exp=-123, bc=122, prec=115, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 32326212469720128703932794743342929, -116, 115), prec=115 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=16163106234860064351966397371671464, prec=115 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=49, prec=115 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=114 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_newton / f_locals: x=136592064341000066741906274419971214224130048, prec=148 / f_lineno: 784 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 813 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=148, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 792 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=31102006696265179814114748792328683520, prec=126, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=125, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=31102006696265179814114748792328683520, prec=126 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=136592064341000066741906274419971214224130048, n=22 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_fixed / f_locals: x=146875073972429994300413514533805050883358785970196765999104, prec=198, pi2=None / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 795 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=197, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1393 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=146875073972429994300413514533805050883358785970196765999104, prec=198 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=136592064341000066741906274419971214224130048, n=-50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 797 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: rshift / f_locals: x=146875073972429994300413514533803264057810994313047999882333, n=50 / f_lineno: 43 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 800 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=115, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=49834032997671069426337453096415908, exp=-115, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=49834032997671069426337453096415908 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=49834032997671069426337453096415908, exp=-115, bc=116, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 2900722494678983315030197, -81, 82), prec=79, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2900722494678983315030197, exp=-81, bc=82, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 181295155917436457189387, -77, 78), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 410902942785786457217813, -77, 79), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 181295155917436457189387, -77, 78), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4800046813251803222648618, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4800046813251803222648618 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-18310891217218483114822925, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18310891217218483114822925 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 2400023406625901611324309, -78, 81), (1, 18310891217218483114822925, -79, 84)), prec=79, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 2400023406625901611324309, -78, 81), prec=83, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=59699187411898656429395990080, prec=97 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=230957530658735881693891676201, exp=-109, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=230957530658735881693891676201 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=230957530658735881693891676201, exp=-109, bc=98, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 18310891217218483114822925, -79, 84), prec=83, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=18310891217218483114822925, exp=-79, mag=5, wp=93 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=117, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=4649164099690916627888465732026023, prec=113 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exponential_series / f_locals: x=1177505944407630316883099142433373414694345841530125921850780666582535315639679584751118281095742851134771846419572856979456, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=1177505944407630316883099142433373414694345841530125921850780666582535315639679584751118281095742851134771846419572856979456 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: isqrt_fast_python / f_locals: x=93477364213445395674486584006672159009349578834116038418346307598933757089764905705753957410338063415411683564056931495176489629478493565113272041128563300977300636534135255003477278175347280633168128240323507519288257651602240552345475774780715975148167786059120 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=93477364213445395674486584006672159009349578834116038418346307598933757089764905705753957410338063415411683564056931495176489629478493565113272041128563300977300636534135255003477278175347280633168128240323507519288257651602240552345475774780715975148167786059120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4495404953043347407944683301079216, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4495404953043347407944683301079216 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4495404953043347407944683301079216, exp=-113, bc=112, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4495404953043347407944683301079216, -113, 112, 83, 'd') / result: (0, 8373344229615009218351325, -84, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4495404953043347407944683301079216, -113, 112, 83, 'd') / result: (0, 8373344229615009218351325, -84, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=9361149554235093976625001073510346, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9361149554235093976625001073510346 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=9361149554235093976625001073510346, exp=-113, bc=113, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9361149554235093976625001073510346, -113, 113, 83, 'd') / result: (0, 8718249904210766755626537, -83, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9361149554235093976625001073510346, -113, 113, 83, 'd') / result: (0, 8718249904210766755626537, -83, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 8373344229615009218351325, -84, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3688596547369876239432441312247797506607298704825, exp=-174, bc=162, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3688596547369876239432441312247797506607298704825, -174, 162, 79, 'd') / result: (0, 381391943939299648778581, -91, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3688596547369876239432441312247797506607298704825, -174, 162, 79, 'd') / result: (0, 381391943939299648778581, -91, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 8718249904210766755626537, -83, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3840533198437269834067505864995107096179479656597, exp=-173, bc=162, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3840533198437269834067505864995107096179479656597, -173, 162, 79, 'd') / result: (0, 198550912725848715621957, -89, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3840533198437269834067505864995107096179479656597, -173, 162, 79, 'd') / result: (0, 198550912725848715621957, -89, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((0, 381391943939299648778581, -91, 79), (0, 198550912725848715621957, -89, 78)), w=((0, 8977355032412527047406279495, -74, 93), (1, 121895362503334954117459851261, -78, 97)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 8977355032412527047406279495, -74, 93), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 121895362503334954117459851261, -78, 97), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 80592903377982524553907910110515080449823065558057455025, -148, 186), t=(0, 14858479399819437132148394216276916640401370646256243290121, -156, 194), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=35490262664582963417948819204568777235556075429118951776521 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35490262664582963417948819204568777235556075429118951776521, exp=-156, bc=195, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 35490262664582963417948819204568777235556075429118951776521, -156, 195, 63, 'd') / result: (0, 6518531761158815351, -24, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 35490262664582963417948819204568777235556075429118951776521, -156, 195, 63, 'd') / result: (0, 6518531761158815351, -24, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778581, -91, 79), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 198550912725848715621957, -89, 78), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 3423890887245068097056047351909084148739746255496595, -165, 172), t=(1, 24202435482085350494818342228484790191920956325737777, -167, 175), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10506871933105078106594152820848453596961971303751397 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=10506871933105078106594152820848453596961971303751397, exp=-167, bc=173, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 10506871933105078106594152820848453596961971303751397, -167, 173, 63, 'd') / result: (1, 8094199711123548935, -57, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 10506871933105078106594152820848453596961971303751397, -167, 173, 63, 'd') / result: (1, 8094199711123548935, -57, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 198550912725848715621957, -89, 78), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778581, -91, 79), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1782462035549498425446128939415939579200266300871715, -163, 171), t=(1, 46489909262332533317794197358759010978315664582640641, -169, 175), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1782462035549498425446128939415939579200266300871715, -163, 171), t=(1, 46489909262332533317794197358759010978315664582640641, -169, 175), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=160567479537500432546346449481379144047132707838430401 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=160567479537500432546346449481379144047132707838430401, exp=-169, bc=177, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 160567479537500432546346449481379144047132707838430401, -169, 177, 63, 'd') / result: (0, 7731042923401420971, -55, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 160567479537500432546346449481379144047132707838430401, -169, 177, 63, 'd') / result: (0, 7731042923401420971, -55, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 8094199711123548935, -57, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=715803592853699603 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=715803592853699603, exp=-92, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 7731042923401420971, -55, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=683688134538102371 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=683688134538102371, exp=-90, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 683688134538102371, -90, 60, 53, 'n') / result: (0, 5341313551078925, -83, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 683688134538102371, -90, 60, 53, 'n') / result: (0, 5341313551078925, -83, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 699026946146191, -82, 50), (0, 5341313551078925, -83, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.4455538437607e-10 + 5.52278876877407e-10j) / count: 199
gamma__ / s: Complex { re: 0.5, im: -14.134725 } / result: Complex { re: -1.4455538437606964e-10, im: 5.522788768774066e-10 }
zeta__ / s: Complex { re: 0.5, im: 14.134725 } / result: Complex { re: 1.767429841384921e-8, im: -1.1102028930923147e-7 } / z: Complex { re: 0.0, im: 0.0 }
gamma_ / s: (0.5, -14.134725) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5-14.134725j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5-14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=-14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(1, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=56 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 3978571390186527, -48, 52), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=287275361037200865517000943840, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=287275361037200865517000943840 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-243790725006669908234919702522, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=243790725006669908234919702522 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3324546003940230230441984, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3324546003940230230441984 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=3324546003940230230441984, y=-8543917002826194402410496, prec=79 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=79, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 11, -1, 4), (1, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 11, -1, 4), b=(1, 3978571390186527, -48, 52), prec=79, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 11, -1, 4), t=(0, 11, -1, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3978571390186527, -48, 52), t=(1, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 121, -2, 7), t=(0, 15829030306810754071359852321729, -96, 104), prec=99, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18225682222867250283564556819393 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=18225682222867250283564556819393, exp=-96, bc=104, prec=99, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 284776284732300785680696200303, -90, 98), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=283538344693015405405797076079 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=283538344693015405405797076079, exp=-90, bc=98, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 284776284732300785680696200303, -90, 98), prec=79, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=284776284732300785680696200303, n=1 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=569552569464601571361392400606, prec=99 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3446903713076390561309005800422, exp=-99, prec=79, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3446903713076390561309005800422 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3446903713076390561309005800422, exp=-99, bc=102, prec=79, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 410902942785786457217813, -76, 79), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 11, -1, 4), (1, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(1, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 11, -1, 4), prec=83, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=795361000990365733460758901 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=795361000990365733460758901, exp=-88, bc=90, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 3106878910118616146331089, -80, 82), prec=83, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 3106878910118616146331089, -80, 82), prec=115, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4137755196124176474103397727147895027 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4137755196124176474103397727147895027, exp=-123, bc=122, prec=115, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 32326212469720128703932794743342929, -116, 115), prec=115 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=16163106234860064351966397371671464, prec=115 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=49, prec=115 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=114 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=115, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=49834032997671069426337453096415908, exp=-115, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=49834032997671069426337453096415908 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=49834032997671069426337453096415908, exp=-115, bc=116, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 2900722494678983315030197, -81, 82), prec=79, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2900722494678983315030197, exp=-81, bc=82, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_neg / f_locals: s=(0, 181295155917436457189387, -77, 78), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 895 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 410902942785786457217813, -77, 79), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(1, 181295155917436457189387, -77, 78), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4800046813251803222648618, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4800046813251803222648618 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-18310891217218483114822925, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18310891217218483114822925 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 2400023406625901611324309, -78, 81), (1, 18310891217218483114822925, -79, 84)), prec=79, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 2400023406625901611324309, -78, 81), prec=83, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=59699187411898656429395990080, prec=97 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=230957530658735881693891676201, exp=-109, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=230957530658735881693891676201 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=230957530658735881693891676201, exp=-109, bc=98, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(1, 18310891217218483114822925, -79, 84), prec=83, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=18310891217218483114822925, exp=-79, mag=5, wp=93 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=117, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=4649164099690916627888465732026023, prec=113 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4495404953043347407944683301079216, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4495404953043347407944683301079216 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4495404953043347407944683301079216, exp=-113, bc=112, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4495404953043347407944683301079216, -113, 112, 83, 'd') / result: (0, 8373344229615009218351325, -84, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4495404953043347407944683301079216, -113, 112, 83, 'd') / result: (0, 8373344229615009218351325, -84, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=9361149554235093976625001073510346, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9361149554235093976625001073510346 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=9361149554235093976625001073510346, exp=-113, bc=113, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9361149554235093976625001073510346, -113, 113, 83, 'd') / result: (0, 8718249904210766755626537, -83, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9361149554235093976625001073510346, -113, 113, 83, 'd') / result: (0, 8718249904210766755626537, -83, 83)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 8373344229615009218351325, -84, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3688596547369876239432441312247797506607298704825, exp=-174, bc=162, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3688596547369876239432441312247797506607298704825, -174, 162, 79, 'd') / result: (0, 381391943939299648778581, -91, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3688596547369876239432441312247797506607298704825, -174, 162, 79, 'd') / result: (0, 381391943939299648778581, -91, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 8718249904210766755626537, -83, 83), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3840533198437269834067505864995107096179479656597, exp=-173, bc=162, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 3840533198437269834067505864995107096179479656597, -173, 162, 79, 'd') / result: (0, 198550912725848715621957, -89, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 3840533198437269834067505864995107096179479656597, -173, 162, 79, 'd') / result: (0, 198550912725848715621957, -89, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((0, 381391943939299648778581, -91, 79), (0, 198550912725848715621957, -89, 78)), w=((0, 8977355032412527047406279495, -74, 93), (1, 121895362503334954117459851261, -78, 97)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 8977355032412527047406279495, -74, 93), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 121895362503334954117459851261, -78, 97), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 80592903377982524553907910110515080449823065558057455025, -148, 186), t=(0, 14858479399819437132148394216276916640401370646256243290121, -156, 194), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=35490262664582963417948819204568777235556075429118951776521 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=35490262664582963417948819204568777235556075429118951776521, exp=-156, bc=195, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 35490262664582963417948819204568777235556075429118951776521, -156, 195, 63, 'd') / result: (0, 6518531761158815351, -24, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 35490262664582963417948819204568777235556075429118951776521, -156, 195, 63, 'd') / result: (0, 6518531761158815351, -24, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778581, -91, 79), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 198550912725848715621957, -89, 78), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 3423890887245068097056047351909084148739746255496595, -165, 172), t=(1, 24202435482085350494818342228484790191920956325737777, -167, 175), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=10506871933105078106594152820848453596961971303751397 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=10506871933105078106594152820848453596961971303751397, exp=-167, bc=173, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 10506871933105078106594152820848453596961971303751397, -167, 173, 63, 'd') / result: (1, 8094199711123548935, -57, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 10506871933105078106594152820848453596961971303751397, -167, 173, 63, 'd') / result: (1, 8094199711123548935, -57, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 198550912725848715621957, -89, 78), t=(0, 8977355032412527047406279495, -74, 93), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778581, -91, 79), t=(1, 121895362503334954117459851261, -78, 97), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1782462035549498425446128939415939579200266300871715, -163, 171), t=(1, 46489909262332533317794197358759010978315664582640641, -169, 175), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1782462035549498425446128939415939579200266300871715, -163, 171), t=(1, 46489909262332533317794197358759010978315664582640641, -169, 175), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=160567479537500432546346449481379144047132707838430401 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=160567479537500432546346449481379144047132707838430401, exp=-169, bc=177, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 160567479537500432546346449481379144047132707838430401, -169, 177, 63, 'd') / result: (0, 7731042923401420971, -55, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 160567479537500432546346449481379144047132707838430401, -169, 177, 63, 'd') / result: (0, 7731042923401420971, -55, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 8094199711123548935, -57, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=715803592853699603 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=715803592853699603, exp=-92, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 7731042923401420971, -55, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=683688134538102371 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=683688134538102371, exp=-90, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 683688134538102371, -90, 60, 53, 'n') / result: (0, 5341313551078925, -83, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 683688134538102371, -90, 60, 53, 'n') / result: (0, 5341313551078925, -83, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 699026946146191, -82, 50), (0, 5341313551078925, -83, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.4455538437607e-10 + 5.52278876877407e-10j) / count: 174
gamma__ / s: Complex { re: 0.5, im: -14.134725 } / result: Complex { re: -1.4455538437606964e-10, im: 5.522788768774066e-10 }
zeta_ / s: (0.5, -14.134725) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(0.5-14.134725j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(0.5-14.134725j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(0.5-14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=-14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=-7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=1, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 7957142780373054, -49, 53, 53, 'd') / result: (1, 3978571390186527, -48, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='-14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 59 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5-14.134725j) / result: (0.5 - 14.134725j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(1, 3978571390186527, -48, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 3978571390186527, -48, 52), t=(1, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 15829030306810754071359852321729, -96, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15848837347439320155758238309313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15848837347439320155758238309313, exp=-96, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6401, -5, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13109248 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13109248 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13109248 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3620, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3620, exp=-8, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_int / f_locals: n=53, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_gt / f_locals: s=(0, 905, -6, 10), t=(0, 53, 0, 6) / f_lineno: 726 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1124 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 905, -6, 10), t=(0, 53, 0, 6) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 729 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpc_sub / f_locals: z=((0, 1, 0, 1), (0, 0, 0, 0)), w=((0, 1, -1, 1), (1, 3978571390186527, -48, 52)), prec=73, rnd='d' / f_lineno: 96 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1130 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 1, -1, 1), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1, exp=-1, bc=1, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 1, -1, 1, 73, 'd') / result: (0, 1, -1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 0, 0, 0), t=(1, 3978571390186527, -48, 52), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 0, 0, 0), t=(1, 3978571390186527, -48, 52), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_neg / f_locals: s=(1, 3978571390186527, -48, 52), prec=None, rnd='d' / f_lineno: 753 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 872 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=3978571390186527, exp=-48, bc=52, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 879 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (0, 3978571390186527, -48, 52, 73, 'd') / result: (0, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (0, 3978571390186527, -48, 52, 73, 'd') / result: (0, 3978571390186527, -48, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpc_abs / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=10, rnd='d' / f_lineno: 117 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 1131 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_hypot / f_locals: x=(0, 1, -1, 1), y=(0, 3978571390186527, -48, 52), prec=10, rnd='d' / f_lineno: 1486 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 121 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 1, -1, 1), t=(0, 1, -1, 1), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, -2, 1), t=(0, 15829030306810754071359852321729, -96, 104), prec=14, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1491 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15848837347439320155758238309313 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15848837347439320155758238309313, exp=-96, bc=104, prec=14, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15848837347439320155758238309313, -96, 104, 14, 'd') / result: (0, 6401, -5, 13)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 6401, -5, 13), prec=10, rnd='d' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1492 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_python / f_locals: x=13109248 / f_lineno: 299 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1477 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=13109248 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 301 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=13109248 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=3620, exp=-8, prec=10, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3620 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=3620, exp=-8, bc=12, prec=10, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3620, -8, 12, 10, 'd') / result: (0, 905, -6, 10)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_lt / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 716 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1156 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_cmp / f_locals: s=(0, 1, -1, 1), t=(0, 0, 0, 0) / f_lineno: 664 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 719 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: mpf_sign / f_locals: s=(0, 1, -1, 1) / f_lineno: 782 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 677 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(1, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1180 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=45 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1181 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 45 / result: [1, 4051, 2736451, 739027171, 106764890851, 9573696452323, 583327124420323, 25664548404164323, 851672769217066723, 22025556704041924323, 455310086907194799843, 7676718923626409391843, 107311229250534993327843, 1260619007250012201842403, 12586223430355989445244643, 107825444073394299229992675, 799077851966414289603163875, 5158527083919185637090293475, 29183936184458903285463807715, 145449144946956939472898651875, 641514035666948560539287320291, 2514000556967729940871184152291, 8784653093416858284308234008291, 27457262868620929351431893579491, 76986029222708323529476210456291, 194156939340377930327821051524835, 441576659045864279524929313208035, 908060519119520582902845518673635, 1693207379711025218198662924236515, 2872115128040193097693048163563235, 4449320522415034644948813274707683, 6325953064637876253264768589395683, 8306842970317542395376054754899683, 10155673548951897461346588509370083, 11674993497680392932591908609619683, 12768400566371956133016076863960803, 13452849435662449529212739307992803, 13822314985986603313609160575448803, 13992398776170915511899723629098723, 14058212084260882469746421687154403, 14079205696461732689211444358837987, 14084578948605882850772802163996387, 14085639418334848803484854421583587, 14085790872561530124227861611312867, 14085804799386972084755954226460387, 14085805418356991727446091676022499]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 45 / result: [1, 4051, 2736451, 739027171, 106764890851, 9573696452323, 583327124420323, 25664548404164323, 851672769217066723, 22025556704041924323, 455310086907194799843, 7676718923626409391843, 107311229250534993327843, 1260619007250012201842403, 12586223430355989445244643, 107825444073394299229992675, 799077851966414289603163875, 5158527083919185637090293475, 29183936184458903285463807715, 145449144946956939472898651875, 641514035666948560539287320291, 2514000556967729940871184152291, 8784653093416858284308234008291, 27457262868620929351431893579491, 76986029222708323529476210456291, 194156939340377930327821051524835, 441576659045864279524929313208035, 908060519119520582902845518673635, 1693207379711025218198662924236515, 2872115128040193097693048163563235, 4449320522415034644948813274707683, 6325953064637876253264768589395683, 8306842970317542395376054754899683, 10155673548951897461346588509370083, 11674993497680392932591908609619683, 12768400566371956133016076863960803, 13452849435662449529212739307992803, 13822314985986603313609160575448803, 13992398776170915511899723629098723, 14058212084260882469746421687154403, 14079205696461732689211444358837987, 14084578948605882850772802163996387, 14085639418334848803484854421583587, 14085790872561530124227861611312867, 14085804799386972084755954226460387, 14085805418356991727446091676022499]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1182 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(1, 3978571390186527, -48, 52), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1183 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1189 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=72, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1190 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=89202980794122492566142873090593446023921664 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=0, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=0, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=178405961588244985132285746181186892047843328 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=92534249710111795780384, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3519738609260110293166, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=267608942382367477698428619271780338071764992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=146663315822894713294212, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=13141549171617185063385, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=356811923176489970264571492362373784095686656 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=185068499420223591560782, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7039477218520220586346, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1962509907346050528138498570722289024490576402550209869751301110970892192732799307918530468492904751891286410699288094965760, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1962509907346050528138498570722289024490576402550209869751301110970892192732799307918530468492904751891286410699288094965760 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3682673850294328368025026939773916857910505556831825902392929067674531010963732236212611167999035392296980047175240039410766730729923790965798801507194034001181092396291967493195611166325271182956075673683930478937136799689661119082365854667433403576754030729347807 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3682673850294328368025026939773916857910505556831825902392929067674531010963732236212611167999035392296980047175240039410766730729923790965798801507194034001181092396291967493195611166325271182956075673683930478937136799689661119082365854667433403576754030729347807 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=446014903970612462830714365452967230119608320 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=214857874141231343584459, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7157348239244077447617, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=535217884764734955396857238543560676143529984 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=239197565533006509074596, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1825535930735347775348, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=506120976105034083572560157712590327368622335394527808514809233881966933915300874147410489242907014961437021706658508701696, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=506120976105034083572560157712590327368622335394527808514809233881966933915300874147410489242907014961437021706658508701696 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1139615378511306542224539198338586647613085063154646680494152350616588470324302380146518468364770137355115937150384477893693718303290756489672318347568401308544091910129489785593279918788804543029394387306651634586474499243748208333361502501607109725154741808380 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1139615378511306542224539198338586647613085063154646680494152350616588470324302380146518468364770137355115937150384477893693718303290756489672318347568401308544091910129489785593279918788804543029394387306651634586474499243748208333361502501607109725154741808380 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=444, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=624420865558857447963000111634154122167451648 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=259776481382589775916711, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7568699930176667036260, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2117444900031265043517853721042469736950358750119963280521140672363331050053809779596309189689713021777440601017652944568320, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2117444900031265043517853721042469736950358750119963280521140672363331050053809779596309189689713021777440601017652944568320 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=4154552979615420050536478423752187419793882432674079951778984941499626982888569234403826893034695626685766600683907094266140934921169744167166210011377611380769907693040338772747315550579906182376870085774149123330568770091643966358596027294151678832159588890185152 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4154552979615420050536478423752187419793882432674079951778984941499626982888569234403826893034695626685766600683907094266140934921169744167166210011377611380769907693040338772747315550579906182376870085774149123330568770091643966358596027294151678832159588890185152 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=713623846352979940529142984724747568191373312 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=277602749130335387341180, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10559215827780330879526, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2954093860531423426566371532771445584233183426996631698678274303882500879587266326656314284152477679162673228736823132422144, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2954093860531423426566371532771445584233183426996631698678274303882500879587266326656314284152477679162673228736823132422144 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=104210484355601736922773500142536238139439785498329775339050904222349840587096938420066145669422779036381294613746947092310206585607855390871249361176824303584845923307915674799669331759257752649878167795260311888193689524540253973397136441222207709799102825665766000 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=104210484355601736922773500142536238139439785498329775339050904222349840587096938420066145669422779036381294613746947092310206585607855390871249361176824303584845923307915674799669331759257752649878167795260311888193689524540253973397136441222207709799102825665766000 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=802826827147102433095285857815341014215294976 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=293326631645789426588425, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11447346493092422545568, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3201989848827766651173339773283734724168835183108237155910017602110403051300883081340760238067370910980519933246206891786240, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3201989848827766651173339773283734724168835183108237155910017602110403051300883081340760238067370910980519933246206891786240 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=112984341511666109235631464647751464939401069926182926344539614153199673503675768314354544315322436087995443634565824132105973690995897330539973610636710317383041786000598648179490571997520656546832468623374264957042105571538405943158468972694449134320772153560719932 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=112984341511666109235631464647751464939401069926182926344539614153199673503675768314354544315322436087995443634565824132105973690995897330539973610636710317383041786000598648179490571997520656546832468623374264957042105571538405943158468972694449134320772153560719932 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=892029807941224925661428730905934460239216640 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=307392123851343139364858, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=10677086848504187740798, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2985080859068466329642242562835481726725139896510582380832242216160988651051468420991870028391839333139904066800496102342656, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2985080859068466329642242562835481726725139896510582380832242216160988651051468420991870028391839333139904066800496102342656 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=105390185879644325351155683506915385534516600324571191761046765708153899583182747996283760394896956292424857356037256091886613517264319781515263982801929420325999144366223168288516874352086056346865609762448372893746905089311029827971388955194085817338566397290034767 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=105390185879644325351155683506915385534516600324571191761046765708153899583182747996283760394896956292424857356037256091886613517264319781515263982801929420325999144366223168288516874352086056346865609762448372893746905089311029827971388955194085817338566397290034767 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=981232788735347418227571603996527906263138304 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=320115909254039904082175, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8565120401059004876912, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1070435769529469910793714477087121352287059968 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=331731815243118304854994, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5345274539995458068528, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1487375929778059347641809443073734839613910536669632743390459789367413030281700528106675723489359390907080227056302556184576, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1487375929778059347641809443073734839613910536669632743390459789367413030281700528106675723489359390907080227056302556184576 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2292681391577183599948267225311175900320870245633481023679806722505043135317781351990644023851713546126950438009682918450574601671273666466118831422671213118763922667979623946736544584183220477408618613398112515634128013750407485043622199502601981389949267212463367 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2292681391577183599948267225311175900320870245633481023679806722505043135317781351990644023851713546126950438009682918450574601671273666466118831422671213118763922667979623946736544584183220477408618613398112515634128013750407485043622199502601981389949267212463367 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1159638750323592403359857350177714798310981632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=342417412915683532528370, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=1195120362418738160701, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1248841731117714895926000223268308244334903296 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=352310731092701571697096, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=11088438539436777329427, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3098699853704290307587103006403614249195646951395068215396791227848777146420209433555574423936165397723083806367296992051200, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3098699853704290307587103006403614249195646951395068215396791227848777146420209433555574423936165397723083806367296992051200 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=109518749919556303121581747285590908436343924577850808564547178036039270031157495363538651925742629958981704686168434856827691958556114310943045713840192151765556190163334022836038671280422256481649022524123829789727230721066856535629184071767006792300818056793579255 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=109518749919556303121581747285590908436343924577850808564547178036039270031157495363538651925742629958981704686168434856827691958556114310943045713840192151765556190163334022836038671280422256481649022524123829789727230721066856535629184071767006792300818056793579255 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1338044711911837388492143096358901690358824960 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=361521189964126056878686, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5463145560719314929814, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1528691927827449885076304149825783029603185829354900319595750339072063392233969987220750049141841596210054677807866516078592, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1528691927827449885076304149825783029603185829354900319595750339072063392233969987220750049141841596210054677807866516078592 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2407156727274857966483337155694838567834044076158447438053169444500641973649494691719105778199275646236037719234453963638841815809509093385423515183632729058179449493726384972705557067012536732200196954191090077176978873177018074508175053818117331487515084330318551 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2407156727274857966483337155694838567834044076158447438053169444500641973649494691719105778199275646236037719234453963638841815809509093385423515183632729058179449493726384972705557067012536732200196954191090077176978873177018074508175053818117331487515084330318551 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1427247692705959881058285969449495136382746624 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=370136998840447183121578, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14078954437040441172706, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1516450673500082373624428842540088582406668288 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=378230307233061956523796, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7336510979513266993721, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2045141903444831603007487984226385404469126987920745022161882210380192916637338226146679119797869162497235312202416014753792, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2045141903444831603007487984226385404469126987920745022161882210380192916637338226146679119797869162497235312202416014753792 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3934160081769470408721870445040709643653712195865674199798591183429984169085941801549467340097896214370479330320999794733981107887978123883500613943299538587020284414727229026150431895117516642750904250471396019396890466181191624631316404433259919395941571740506992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3934160081769470408721870445040709643653712195865674199798591183429984169085941801549467340097896214370479330320999794733981107887978123883500613943299538587020284414727229026150431895117516642750904250471396019396890466181191624631316404433259919395941571740506992 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1605653654294204866190571715630682028430589952 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=385860881355901222368823, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=131333252210585257545, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1694856635088327358756714588721275474454511616 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=393078785279443022451841, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=7349237175752385340563, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2055470902957179237366111660914397451966445811092061916213204847806355507125405590925197701210989713822978924890307004727296, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2055470902957179237366111660914397451966445811092061916213204847806355507125405590925197701210989713822978924890307004727296 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=3965642502520912966703066284083638852021593532004061807560926867092365726913844465789953769762090607450639134748914495390478391730723447842348793649801735059821471611067459278923684869371267006084929244583109069043956958840655196609881247690786673425207538035626992 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3965642502520912966703066284083638852021593532004061807560926867092365726913844465789953769762090607450639134748914495390478391730723447842348793649801735059821471611067459278923684869371267006084929244583109069043956958840655196609881247690786673425207538035626992 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1784059615882449851322857461811868920478433280 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=399926373561454935145256, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14196825457764298033978, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=3966335812741491593711491848196626238970428097785687315707892771646434747417868074951135262638291709085547272150140149825536, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3966335812741491593711491848196626238970428097785687315707892771646434747417868074951135262638291709085547272150140149825536 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128332782343142608585323878678335477232873318640892385779288611573151599006978464847461599385633557631829159387996686533619142911816543098090226992098431232149452680995782393047242669843803131925309799785309873116285027226144146517034120603027257435862406649951813632 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128332782343142608585323878678335477232873318640892385779288611573151599006978464847461599385633557631829159387996686533619142911816543098090226992098431232149452680995782393047242669843803131925309799785309873116285027226144146517034120603027257435862406649951813632 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1873262596676572343889000334902462366502354944 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=406439797205484489210924, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=5874497251651904518443, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1642310922463273863021164593393915552073692884239386154160299350759851887602710999784454444686167660793234417374667405787136, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1642310922463273863021164593393915552073692884239386154160299350759851887602710999784454444686167660793234417374667405787136 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2729796065331479329239046209421871667470854267480199694238183669290562587427779466795750692971111908478708287119599859008038990880142059291428850949598487367956051194073877708680956762867570003368247824191218527085247228257450157369426537297097534081664704400313247 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2729796065331479329239046209421871667470854267480199694238183669290562587427779466795750692971111908478708287119599859008038990880142059291428850949598487367956051194073877708680956762867570003368247824191218527085247228257450157369426537297097534081664704400313247 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=1962465577470694836455143207993055812526276608 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=412650158964151699862560, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=12084859010319115170079, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2051668558264817329021286081083649258550198272 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=418584411620941391260586, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=3183359816966858986902, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=888293958061896554841636195169036084769418792733252888413746818649982781973793370952598001528367414013950691158625137721344, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=888293958061896554841636195169036084769418792733252888413746818649982781973793370952598001528367414013950691158625137721344 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=54751242761107502225372705405028501895647775516823817672940574461139202302787238618875119262181392402022935694922908313086067236271137038015569543134188803721016351172381074192569407265377611638294540984586760016133892841347221064199795643096815343433175650571036 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=54751242761107502225372705405028501895647775516823817672940574461139202302787238618875119262181392402022935694922908313086067236271137038015569543134188803721016351172381074192569407265377611638294540984586760016133892841347221064199795643096815343433175650571036 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2140871539058939821587428954174242704574119936 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=424266064953230100635393, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=8865013149255568361709, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2478959882963432246069682405122891399356517561116054572317432982279021717136167546844459539148932318178467045093837593640960, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2478959882963432246069682405122891399356517561116054572317432982279021717136167546844459539148932318178467045093837593640960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=5237857394008698967001428739644590290398211325006871772991834406191952557032950618508930144363090238390959916106805761541842354950781365556908198368374942587359851150692102940438697008851094517136911888314324450239566571781503963291064909878789205588155277119447951 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5237857394008698967001428739644590290398211325006871772991834406191952557032950618508930144363090238390959916106805761541842354950781365556908198368374942587359851150692102940438697008851094517136911888314324450239566571781503963291064909878789205588155277119447951 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=450, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2230074519853062314153571827264836150598041600 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=429715748282462687168934, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=14314696478488154895250, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=4007651810790882131145986554948674428959703390470954891913183321351085109370137534065209588290773914388521722901704109719552, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4007651810790882131145986554948674428959703390470954891913183321351085109370137534065209588290773914388521722901704109719552 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=128585961762639639178533948869796845548392477695087378572914211698137004665938730903710768937797264405471586841690456270613003495559621546049791723529223989055702877072079097806868998595912198566336317567464246534200588680865529282807922013158294840992682831458862727 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=128585961762639639178533948869796845548392477695087378572914211698137004665938730903710768937797264405471586841690456270613003495559621546049791723529223989055702877072079097806868998595912198566336317567464246534200588680865529282807922013158294840992682831458862727 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2319277500647184806719714700355429596621963264 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=434951662625795328308768, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=4714858971678848453881, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=1311782938068149563545206939377530032159490542757245544517974953122648991984555326871859839466310018369438811362155726635008, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=1311782938068149563545206939377530032159490542757245544517974953122648991984555326871859839466310018369438811362155726635008 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=114150772052822570588297085934413406892271972827024492287905789813301865268015970717944991608804622253866527678846826145931721964616238560208446168008011534191144354903914198991642305029230079297573974170474661718499608958298044843027789315093145475714370802317607 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=114150772052822570588297085934413406892271972827024492287905789813301865268015970717944991608804622253866527678846826145931721964616238560208446168008011534191144354903914198991642305029230079297573974170474661718499608958298044843027789315093145475714370802317607 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=447, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2408480481441307299285857573446023042645884928 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=439989947468684139882637, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_basecase / f_locals: x=9753143814567660027750, prec=73 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1396 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exponential_series / f_locals: x=2726855871259775470676650645635180539292169317227660029549176280506923888849784301528905493063825549996313749603221353005056, prec=410, type=2 / f_lineno: 1011 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1135 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=2726855871259775470676650645635180539292169317227660029549176280506923888849784301528905493063825549996313749603221353005056 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1025 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=94936204689650800525774224150537880501239672113822390714662574749314310478075643837864413676430676973986705929052002402042903068857183766914814926447714550269670870264903923577542996217049177349803210476652666597452785248954207206938802154900469370210198693464858460 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1081 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=94936204689650800525774224150537880501239672113822390714662574749314310478075643837864413676430676973986705929052002402042903068857183766914814926447714550269670870264903923577542996217049177349803210476652666597452785248954207206938802154900469370210198693464858460 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: giant_steps / f_locals: start=50, target=452, n=2 / f_lineno: 19 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 268 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=28, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1193 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: isqrt_fast_python / f_locals: x=2497683462235429791852000446536616488669806592 / f_lineno: 231 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1196 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: cos_sin_fixed / f_locals: x=444844980802813367477494, prec=73, pi2=14835751850141947581203 / f_lineno: 1391 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1203 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]libmpf._normalize. / x: (1, 153120441794175, -73, 48, 73, 'd') / result: (1, 153120441794175, -73, 48)

[2]libmpf._normalize. / x: (0, 2515609284194687, -73, 52, 73, 'd') / result: (0, 2515609284194687, -73, 52)

[2]libmpf._normalize. / x: (0, 7029347515866556588946108304385, -103, 103, 83, 'd') / result: (0, 6703708186976009930559261, -83, 83)

[2]libmpf._normalize1 / x: (0, 6703708186976009930559261, -84, 83, 83, 'd') / result: (0, 6703708186976009930559261, -84, 83)

[3]libmpf._normalize1 / x: (0, 26671181600861946303071036718460217276547, -131, 135, 83, 'd') / result: (0, 5922191981447154929945283, -79, 83)

[2]libmpf._normalize. / x: (0, 3501423185924133744920746024, -91, 92, 77, 'd') / result: (0, 106854955625126151883567, -76, 77)

[2]libmpf._normalize. / x: (1, 151121746166493518974841525782529, -107, 107, 77, 'd') / result: (1, 70371546860082782327589, -76, 76)

[2]libmpf._normalize. / x: (1, 59078682726760234328303176772303, -107, 106, 77, 'd') / result: (1, 55021310901977340065225, -77, 76)

[3]libmpf._normalize1 / x: (1, 7519548517005631292626979655834296412779829963, -152, 153, 73, 'd') / result: (1, 6220024748418928932523, -72, 73)

[3]libmpf._normalize1 / x: (1, 5879299734867058439431761933794605628385657575, -153, 153, 73, 'd') / result: (1, 2431621378035093300407, -72, 72)

[3]libmpf._normalize1 / x: (0, 10942391231288574146219, -72, 74, 73, 'd') / result: (0, 5471195615644287073109, -71, 73)

[2]libmpf._normalize1 / x: (0, 2431621378035093300407, -72, 72, 73, 'd') / result: (0, 2431621378035093300407, -72, 72)

[3]libmpf._normalize1 / x: (0, 125648708384698363898211291208006903590069173, -144, 147, 63, 'd') / result: (0, 3247942986504735535, -59, 62)

[3]libmpf._normalize1 / x: (0, 4441505534611746427896866373253657459, -145, 122, 63, 'd') / result: (0, 7704783919571915655, -86, 63)

[3]libmpf._normalize1 / x: (0, 27899111912400963834529738464054472991, -145, 125, 63, 'd') / result: (0, 1512413887292067063, -81, 61)

[3]libmpf._normalize1 / x: (0, 683741302274437363, -85, 60, 53, 'n') / result: (0, 2670864462009521, -77, 52)

[3]libmpf._normalize1 / x: (0, 536861176988064077, -82, 59, 53, 'n') / result: (0, 8388455890438501, -76, 53)

[7]gammazeta.mpc_zeta / s: ((0, 1, -1, 1), (1, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 2670864462009521, -77, 52), (0, 8388455890438501, -76, 53))

zeta_ / result: (1.76742984138492e-8 + 1.11020289309232e-7j) / count: 521
zeta / count: 0 / s: Complex { re: 0.5, im: -14.134725 }
gamma_ / s: (0.5, 14.134725) / count: 0
call(gamma_) / f_code.co_name: f / f_locals: x=(0.5+14.134725j), kwargs={}, name='gamma' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(gamma_) / f_code.co_name: convert / f_locals: x=(0.5+14.134725j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_float / f_locals: x=0.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-53, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -53, 53, 53, 'd') / result: (0, 1, -1, 1)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_float / f_locals: x=14.134725, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=7957142780373054, exp=-49, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=7957142780373054 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=7957142780373054, exp=-49, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7957142780373054, -49, 53, 53, 'd') / result: (0, 3978571390186527, -48, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7957142780373054, -49, 53, 53, 'd') / result: (0, 3978571390186527, -48, 52)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: __str__ / f_locals: s=mpc(real='0.5', imag='14.134725') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 1, -1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, -1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=69 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=69, base=10, bdigits=21 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: to_str / f_locals: s=(0, 3978571390186527, -48, 52), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3978571390186527, -48, 52), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=65 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: bin_to_radix / f_locals: x=521479309254528466944, xbits=65, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: numeral_python / f_locals: n=1413472499999999953956, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: small_numeral / f_locals: n=1413472499999999953956, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (0.5+14.134725j) / result: (0.5 + 14.134725j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (0.5+14.134725j) / result: (0.5 + 14.134725j)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(gamma_) / f_code.co_name: mpc_gamma / f_locals: z=((0, 1, -1, 1), (0, 3978571390186527, -48, 52)), prec=53, rnd='n', type=0 / f_lineno: 1987 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='mpc_gamma / z: ((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
mpc_gamma / z: ((0, 1, -1, 1), (0, 3978571390186527, -48, 52)) / prec: 53 / rnd: n / type: 0call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 1, -1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2038 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_int / f_locals: s=(0, 3978571390186527, -48, 52), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=56 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 2045 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, -1, 1), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2118 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 3978571390186527, -48, 52), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=287275361037200865517000943960, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=287275361037200865517000943960 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=243790725006669908234919702701, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2133 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=243790725006669908234919702701 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3324546003940230230441984, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2134 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3324546003940230230441984 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: complex_stirling_series / f_locals: x=3324546003940230230441984, y=8543917002826194402410496, prec=79 / f_lineno: 1709 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 2137 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: g / f_locals: prec=79, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1718 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpc_log / f_locals: z=((0, 11, -1, 4), (0, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 444 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2139 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_log_hypot / f_locals: a=(0, 11, -1, 4), b=(0, 3978571390186527, -48, 52), prec=79, rnd='d' / f_lineno: 740 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 445 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 11, -1, 4), t=(0, 11, -1, 4), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 765 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 3978571390186527, -48, 52), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 766 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 121, -2, 7), t=(0, 15829030306810754071359852321729, -96, 104), prec=99, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 769 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18225682222867250283564556819393 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=18225682222867250283564556819393, exp=-96, bc=104, prec=99, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 18225682222867250283564556819393, -96, 104, 99, 'd') / result: (0, 284776284732300785680696200303, -90, 98)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 284776284732300785680696200303, -90, 98), t=(1, 1, 0, 1), prec=10, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 770 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=283538344693015405405797076079 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 855 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=283538344693015405405797076079, exp=-90, bc=98, prec=10, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 856 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 283538344693015405405797076079, -90, 98, 10, 'd') / result: (0, 229, 0, 8)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_log / f_locals: x=(0, 284776284732300785680696200303, -90, 98), prec=79, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: lshift / f_locals: x=284776284732300785680696200303, n=1 / f_lineno: 50 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: log_taylor_cached / f_locals: x=569552569464601571361392400606, prec=99 / f_lineno: 634 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 728 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=99, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 730 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=3446903713076390561309005800422, exp=-99, prec=79, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 738 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=3446903713076390561309005800422 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=3446903713076390561309005800422, exp=-99, bc=102, prec=79, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 3446903713076390561309005800422, -99, 102, 79, 'd') / result: (0, 410902942785786457217813, -76, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_shift / f_locals: s=(0, 410902942785786457217813, -76, 79), n=-1 / f_lineno: 1023 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 777 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpc_arg / f_locals: z=((0, 11, -1, 4), (0, 3978571390186527, -48, 52)), prec=79, rnd='d' / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 446 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_atan2 / f_locals: y=(0, 3978571390186527, -48, 52), x=(0, 11, -1, 4), prec=79, rnd='d' / f_lineno: 877 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 126 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(0, 3978571390186527, -48, 52), t=(0, 11, -1, 4), prec=83, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=795361000990365733460758901 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=795361000990365733460758901, exp=-88, bc=90, prec=83, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 795361000990365733460758901, -88, 90, 83, 'd') / result: (0, 3106878910118616146331089, -80, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_atan / f_locals: x=(0, 3106878910118616146331089, -80, 82), prec=83, rnd='d' / f_lineno: 842 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 906 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: mpf_rdiv_int / f_locals: n=1, t=(0, 3106878910118616146331089, -80, 82), prec=115, rnd='d' / f_lineno: 1077 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 859 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4137755196124176474103397727147895027 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=4137755196124176474103397727147895027, exp=-123, bc=122, prec=115, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1090 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 4137755196124176474103397727147895027, -123, 122, 115, 'd') / result: (0, 32326212469720128703932794743342929, -116, 115)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 32326212469720128703932794743342929, -116, 115), prec=115 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 863 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor / f_locals: x=16163106234860064351966397371671464, prec=115 / f_lineno: 817 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 867 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: atan_taylor_get_cached / f_locals: n=49, prec=115 / f_lineno: 802 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 819 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=114 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 807 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=115, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 871 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=49834032997671069426337453096415908, exp=-115, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 874 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=49834032997671069426337453096415908 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=49834032997671069426337453096415908, exp=-115, bc=116, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 49834032997671069426337453096415908, -115, 116, 83, 'd') / result: (0, 2900722494678983315030197, -81, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_pos / f_locals: s=(0, 2900722494678983315030197, -81, 82), prec=79, rnd='d' / f_lineno: 743 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 910 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=2900722494678983315030197, exp=-81, bc=82, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 750 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 2900722494678983315030197, -81, 82, 79, 'd') / result: (0, 181295155917436457189387, -77, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 410902942785786457217813, -77, 79), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2140 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: to_fixed / f_locals: s=(0, 181295155917436457189387, -77, 78), prec=79 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2141 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-4800046813251803222648618, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4800046813251803222648618 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=18310891217218483114822926, exp=-79, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 2144 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=18310891217218483114822926 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: mpc_exp / f_locals: z=((1, 2400023406625901611324309, -78, 81), (0, 9155445608609241557411463, -78, 83)), prec=79, rnd='d' / f_lineno: 417 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: mpf_exp / f_locals: x=(1, 2400023406625901611324309, -78, 81), prec=83, rnd='d' / f_lineno: 1151 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 438 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: g / f_locals: prec=100, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1176 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: exp_basecase / f_locals: x=59699187411898656429395990080, prec=97 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1187 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=230957530658735881693891676201, exp=-109, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1188 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=230957530658735881693891676201 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=230957530658735881693891676201, exp=-109, bc=98, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 230957530658735881693891676201, -109, 98, 83, 'd') / result: (0, 440516530339690936458381, -90, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_cos_sin / f_locals: x=(0, 9155445608609241557411463, -78, 83), prec=83, rnd='d', which=0, pi=False / f_lineno: 1299 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 439 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mod_pi2 / f_locals: man=9155445608609241557411463, exp=-78, mag=5, wp=93 / f_lineno: 1263 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1359 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: g / f_locals: prec=117, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1270 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: cos_sin_basecase / f_locals: x=4649164099690916627888482911895207, prec=113 / f_lineno: 1122 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1360 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=4495404953043347407944698787802062, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1368 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=4495404953043347407944698787802062 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=0, man=4495404953043347407944698787802062, exp=-113, bc=112, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4495404953043347407944698787802062, -113, 112, 83, 'd') / result: (0, 4186672114807504609175677, -83, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4495404953043347407944698787802062, -113, 112, 83, 'd') / result: (0, 4186672114807504609175677, -83, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: from_man_exp / f_locals: man=-9361149554235093976624993636486701, exp=-113, prec=83, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1369 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=9361149554235093976624993636486701 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize / f_locals: sign=1, man=9361149554235093976624993636486701, exp=-113, bc=113, prec=83, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (1, 9361149554235093976624993636486701, -113, 113, 83, 'd') / result: (1, 4359124952105383377813265, -82, 82)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (1, 9361149554235093976624993636486701, -113, 113, 83, 'd') / result: (1, 4359124952105383377813265, -82, 82)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(0, 4186672114807504609175677, -83, 82), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 440 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=1844298273684938119716227043613588678822227998937, exp=-173, bc=161, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 1844298273684938119716227043613588678822227998937, -173, 161, 79, 'd') / result: (0, 381391943939299648778583, -91, 79)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 1844298273684938119716227043613588678822227998937, -173, 161, 79, 'd') / result: (0, 381391943939299648778583, -91, 79)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 440516530339690936458381, -90, 79), t=(1, 4359124952105383377813265, -82, 82), prec=79, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 441 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=1920266599218634917033751390689697359171462223965, exp=-172, bc=161, prec=79, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 984 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 1920266599218634917033751390689697359171462223965, -172, 161, 79, 'd') / result: (1, 198550912725848715621957, -89, 78)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 1920266599218634917033751390689697359171462223965, -172, 161, 79, 'd') / result: (1, 198550912725848715621957, -89, 78)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpc_div / f_locals: z=((0, 381391943939299648778583, -91, 79), (1, 198550912725848715621957, -89, 78)), w=((0, 35909420129650108189625117995, -76, 95), (0, 243790725006669908234919702701, -79, 98)), prec=53, rnd='n' / f_lineno: 194 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 2213 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 35909420129650108189625117995, -76, 95), t=(0, 35909420129650108189625117995, -76, 95), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 243790725006669908234919702701, -79, 98), t=(0, 243790725006669908234919702701, -79, 98), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 1289486454047720392862526562845523891086672294617672820025, -152, 190), t=(0, 59433917599277748528593576952384746113993309733126226695401, -158, 196), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 199 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=141961050658331853671795276974498275143540336588657287177001 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=141961050658331853671795276974498275143540336588657287177001, exp=-158, bc=197, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 141961050658331853671795276974498275143540336588657287177001, -158, 197, 63, 'd') / result: (0, 6518531761158815351, -24, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 141961050658331853671795276974498275143540336588657287177001, -158, 197, 63, 'd') / result: (0, 6518531761158815351, -24, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778583, -91, 79), t=(0, 35909420129650108189625117995, -76, 95), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 198550912725848715621957, -89, 78), t=(0, 243790725006669908234919702701, -79, 98), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(0, 13695563548980272388224261232197475054264859003901085, -167, 174), t=(1, 48404870964170700989636684492510193761768832747805857, -168, 176), prec=63, rnd='d', _sub=0 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 201 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=21013743866210156213188162028115243653239114740003687 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=21013743866210156213188162028115243653239114740003687, exp=-168, bc=174, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 21013743866210156213188162028115243653239114740003687, -168, 174, 63, 'd') / result: (1, 8094199711123548935, -57, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 21013743866210156213188162028115243653239114740003687, -168, 174, 63, 'd') / result: (1, 8094199711123548935, -57, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(1, 198550912725848715621957, -89, 78), t=(0, 35909420129650108189625117995, -76, 95), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_mpf_mul / f_locals: s=(0, 381391943939299648778583, -91, 79), t=(0, 243790725006669908234919702701, -79, 98), prec=0, rnd='d' / f_lineno: 974 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_sub / f_locals: s=(1, 7129848142197993701784515760642022007688795937816215, -165, 173), t=(0, 92979818524665066635588882367237193261582436136052683, -170, 176), prec=63, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 202 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: mpf_add / f_locals: s=(1, 7129848142197993701784515760642022007688795937816215, -165, 173), t=(0, 92979818524665066635588882367237193261582436136052683, -170, 176), prec=63, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=321134959075000865092693386707781897507623906146171563 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=321134959075000865092693386707781897507623906146171563, exp=-170, bc=178, prec=63, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 321134959075000865092693386707781897507623906146171563, -170, 178, 63, 'd') / result: (1, 7731042923401420971, -55, 63)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 321134959075000865092693386707781897507623906146171563, -170, 178, 63, 'd') / result: (1, 7731042923401420971, -55, 63)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 8094199711123548935, -57, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=715803592853699603 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=715803592853699603, exp=-92, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 715803592853699603, -92, 60, 53, 'n') / result: (1, 699026946146191, -82, 50)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: mpf_div / f_locals: s=(1, 7731042923401420971, -55, 63), t=(0, 6518531761158815351, -24, 63), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 203 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(gamma_) / f_code.co_name: python_bitcount / f_locals: n=683688134538102371 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=683688134538102371, exp=-90, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (1, 683688134538102371, -90, 60, 53, 'n') / result: (1, 5341313551078925, -83, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (1, 683688134538102371, -90, 60, 53, 'n') / result: (1, 5341313551078925, -83, 53)
call(gamma_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(gamma_) / f_code.co_name: make_mpc / f_locals: v=((1, 699026946146191, -82, 50), (1, 5341313551078925, -83, 53)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
gamma_ / result: (-1.4455538437607e-10 - 5.52278876877407e-10j) / count: 170
gamma__ / s: Complex { re: 0.5, im: 14.134725 } / result: Complex { re: -1.4455538437606964e-10, im: -5.522788768774066e-10 }
zeta__ / s: Complex { re: 0.5, im: -14.134725 } / result: Complex { re: 1.7674298413849186e-8, im: 1.1102028930923156e-7 } / z: Complex { re: 0.0, im: 0.0 }

test_euler_product_formula¶

In [ ]:
inl test_euler_product_formula log = run_test log (3u8, 2u8) fun zeta, gamma =>
    inl s_values = ;[2; 2.5; 3; 3.5; 4; 4.5; 5]
    inl primes = ;[2; 3; 5; 7; 11; 13; 17; 19; 23; 29; 31; 37; 41; 43; 47; 53; 59; 61; 67; 71]
    (a s_values : _ i32 _)
    |> am.iter fun s_re =>
        inl s = .^(s_re, 0)
        inl product =
            (1, (a primes : _ i32 _))
            ||> am.fold fun acc x =>
                acc * 1 / (1 - x ** -s_re)

        inl result = zeta s
        re result - product |> abs |> _assert_lt 0.01
        result |> im |> _assert_lt 0.01
()


In [ ]:
// // test
// // rust=
// // print_code=false

types ()
test_euler_product_formula true
[2]libmpf._normalize. / x: (0, 5779919761767295, -53, 53, 53, 'd') / result: (0, 5779919761767295, -53, 53)

[2]libmpf._normalize. / x: (0, 6755399441055744, -52, 53, 53, 'd') / result: (0, 3, -1, 2)

[1]gammazeta.bernoulli_size / n: 3000 / result: 22378

[2]libmpf._normalize. / x: (0, 6582605983394595, -52, 53, 53, 'd') / result: (0, 6582605983394595, -52, 53)

[2]libmpf._normalize. / x: (0, 6582605983439631, -52, 53, 53, 'd') / result: (0, 6582605983439631, -52, 53)

[2]libmpf._normalize. / x: (1, 4953959590107546, -52, 53, 53, 'd') / result: (1, 2476979795053773, -51, 52)

[2]libmpf._normalize. / x: (0, 4953959590107546, -52, 53, 53, 'd') / result: (0, 2476979795053773, -51, 52)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'f') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 1, -1, 1, 53, 'c') / result: (0, 1, -1, 1)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'f') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 3, -1, 2, 53, 'c') / result: (0, 3, -1, 2)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'f') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -2, 1, 53, 'c') / result: (0, 1, -2, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'f') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 1, -4, 1, 53, 'c') / result: (0, 1, -4, 1)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'f') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 3, -4, 2, 53, 'c') / result: (0, 3, -4, 2)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'f') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 5, -1, 3, 53, 'c') / result: (0, 5, -1, 3)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'f') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 3, -2, 2, 53, 'c') / result: (0, 3, -2, 2)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'f') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 7, -2, 3, 53, 'c') / result: (0, 7, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'f') / result: (0, 5, -2, 3)

[2]libmpf._normalize1 / x: (0, 5, -2, 3, 53, 'c') / result: (0, 5, -2, 3)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'f') / result: (0, 6004799503160661, -54, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -60, 59, 53, 'c') / result: (0, 3002399751580331, -53, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'f') / result: (0, 6004799503160661, -53, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -59, 59, 53, 'c') / result: (0, 3002399751580331, -52, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'f') / result: (0, 6004799503160661, -52, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -58, 59, 53, 'c') / result: (0, 3002399751580331, -51, 52)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'f') / result: (0, 6004799503160661, -55, 53)

[3]libmpf._normalize1 / x: (0, 384307168202282325, -61, 59, 53, 'c') / result: (0, 3002399751580331, -54, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'f') / result: (0, 3752999689475413, -52, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -59, 59, 53, 'c') / result: (0, 7505999378950827, -53, 53)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'f') / result: (0, 3752999689475413, -51, 52)

[3]libmpf._normalize1 / x: (0, 480383960252852907, -58, 59, 53, 'c') / result: (0, 7505999378950827, -52, 53)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'f') / result: (0, 0, 0, 0)

[1]libmpf._normalize. / x: (0, 0, 0, 0, 53, 'c') / result: (0, 0, 0, 0)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'f') / result: (0, 1, 0, 1)

[2]libmpf._normalize. / x: (0, 1, 0, 1, 53, 'c') / result: (0, 1, 0, 1)

zeta_ / s: (2.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(2+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(2+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(2+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=2.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -51, 53, 53, 'd') / result: (0, 1, 1, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 1, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 1, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 1, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 1, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 1, 1), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=200000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=200000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2+0j) / result: (2.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2+0j) / result: (2.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 1, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 1, 1, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 1, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=2, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[2]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 928 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=146733021972660147120595982891276473012026808, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=146733021972660147120595982891276473012026808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=146733021972660147120595982891276473012026808, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=146733021972660147120595982891276473012026808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=146733021972660147120595982891276473012026808, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 146733021972660147120595982891276473012026808, -146, 147, 53, 'n') / result: (0, 7408124450506707, -52, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 146733021972660147120595982891276473012026808, -146, 147, 53, 'n') / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 2 / prec: 53 / rnd: n / result: (0, 7408124450506707, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 2 / prec: 53 / rnd: n / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 1, 1, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 7408124450506707, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 1, 1, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 7408124450506707, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7408124450506707, -52, 53), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 1, 1, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 7408124450506707, -52, 53), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 7408124450506707, -52, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.64493406684823 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 2.0, im: 0.0 }
zeta__ / s: Complex { re: 2.0, im: 0.0 } / result: Complex { re: 1.6449340668482264, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (2.5, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(2.5+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(2.5+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(2.5+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=2.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -51, 53, 53, 'd') / result: (0, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, -1, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='2.5', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, -1, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=250000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=250000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (2.5+0j) / result: (2.5 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (2.5+0j) / result: (2.5 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5, -1, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 5, -1, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 5, -1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1066 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 5, -1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=3 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=3, exp=-1, bc=2, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 3, -1, 2, 73, 'd') / result: (1, 3, -1, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 3, -1, 2, 73, 'd') / result: (1, 3, -1, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(1, 3, -1, 2), prec=None, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1067 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1086 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, -1, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1088 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1089 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=86 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=86, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=8749, prec=96, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=8749, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=1, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 0, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 0, 0, 0), prec=83 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: from_int / f_locals: n=2, prec=0, rnd='d' / f_lineno: 420 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_log / f_locals: x=(0, 1, 1, 1), prec=88, rnd='d' / f_lineno: 668 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: g / f_locals: prec=108, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 689 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: ln2_fixed / f_locals: prec=123 / f_lineno: 162 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 99 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: machin / f_locals: coefs=[(18, 26), (-2, 4801), (8, 8749)], prec=123, hyperbolic=True / f_lineno: 146 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 168 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=26, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=11, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=12, b=13, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=13, b=14, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=14, b=15, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=15, b=16, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=16, b=17, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=17, b=18, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=18, b=19, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=19, b=20, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=20, b=21, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=21, b=22, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=22, b=23, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=23, b=24, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=24, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=25, b=26, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=26, b=27, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=27, b=28, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=28, b=29, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=31, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=29, b=30, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=30, b=31, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=31, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=31, b=32, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=32, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=32, b=33, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=26, a=33, b=34, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: acot_fixed / f_locals: a=4801, prec=133, hyperbolic=True / f_lineno: 137 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 156 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=25, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 143 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=0, b=1, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=1, b=2, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=2, b=3, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=3, b=4, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=4, b=5, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=5, b=6, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=6, b=7, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=7, b=8, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=8, b=9, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=9, b=10, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=12, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 132 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: bsp_acot / f_locals: q=4801, a=10, b=11, hyperbolic=True / f_lineno: 123 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 131 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
[2]libmpf._normalize. / x: (0, 224939120507729810846275465740351, -108, 108, 88, 'd') / result: (0, 214518661983232317777896371, -88, 88)

[2]libmpf._normalize. / x: (0, 356520070949948947528356728229971, -108, 109, 88, 'd') / result: (0, 85001008737075077898110563, -86, 87)

[2]libmpf._normalize. / x: (0, 449878241015459621692550931480702, -108, 109, 88, 'd') / result: (0, 214518661983232317777896371, -87, 88)

[2]libmpf._normalize. / x: (0, 522292463546151898066896762790005, -108, 109, 88, 'd') / result: (0, 124524227034128164784168425, -86, 87)

[2]libmpf._normalize. / x: (0, 581459191457678758374632193970322, -108, 109, 88, 'd') / result: (0, 8664417139555197333911541, -82, 83)

[2]libmpf._normalize. / x: (0, 631483947120683840791049765974625, -108, 109, 88, 'd') / result: (0, 301115010795919342418217547, -87, 88)

[2]libmpf._normalize. / x: (0, 674817361523189432538826397221053, -108, 110, 88, 'd') / result: (0, 80444498243712119166711139, -85, 87)

[2]libmpf._normalize. / x: (0, 713040141899897895056713456459942, -108, 110, 88, 'd') / result: (0, 85001008737075077898110563, -85, 87)

[2]libmpf._normalize. / x: (0, 747231584053881708913172228530356, -108, 110, 88, 'd') / result: (0, 89076946264968122114321259, -85, 87)

[2]libmpf._normalize. / x: (0, 778161505752905805354238767353817, -108, 110, 88, 'd') / result: (0, 92764080256570077580718847, -85, 87)

[2]libmpf._normalize. / x: (0, 806398311965408569220907659710673, -108, 110, 88, 'd') / result: (0, 192260339728691236787058749, -86, 88)

[2]libmpf._normalize. / x: (0, 832373655690528864538379510958074, -108, 110, 88, 'd') / result: (0, 198453344271309105047793271, -86, 88)

[2]libmpf._normalize. / x: (0, 856423067628413651637325231714976, -108, 110, 88, 'd') / result: (0, 102093585446883875326791433, -85, 87)

[2]libmpf._normalize. / x: (0, 878812534496100845595253491019976, -108, 110, 88, 'd') / result: (0, 52381308942800810670569747, -84, 86)

[2]libmpf._normalize. / x: (0, 899756482030919243385101862961404, -108, 110, 88, 'd') / result: (0, 214518661983232317777896371, -86, 88)

[2]libmpf._normalize. / x: (0, 919430296618877781423204854757461, -108, 110, 88, 'd') / result: (0, 219209264902800984721947873, -86, 88)

[2]libmpf._normalize. / x: (0, 937979262407627705902988922200293, -108, 110, 88, 'd') / result: (0, 223631682969958235240695219, -86, 88)

[2]libmpf._normalize. / x: (0, 955525078854587723508080664044832, -108, 110, 88, 'd') / result: (0, 28476866449552408561351319, -83, 85)

[2]libmpf._normalize. / x: (0, 972170704561611519759447694270707, -108, 110, 88, 'd') / result: (0, 231783558025744323673116611, -86, 88)

[2]libmpf._normalize. / x: (0, 988004018070632788319406494204596, -108, 110, 88, 'd') / result: (0, 235558514135034749107219337, -86, 88)

[2]libmpf._normalize. / x: (0, 1003100626260635616200514233094168, -108, 110, 88, 'd') / result: (0, 239157826008948234605911787, -86, 88)

[2]libmpf._normalize. / x: (0, 1017526047957690401622753083176439, -108, 110, 88, 'd') / result: (0, 242597114552900886922539015, -86, 88)

[2]libmpf._normalize. / x: (0, 1031337432473138380067183125451024, -108, 110, 88, 'd') / result: (0, 122945002612249658115766421, -85, 87)

[2]libmpf._normalize. / x: (0, 1044584927092303796133793525580010, -108, 110, 88, 'd') / result: (0, 124524227034128164784168425, -85, 87)

[2]libmpf._normalize. / x: (0, 1057312776198258675384654976698425, -108, 110, 88, 'd') / result: (0, 63020752441779296123066841, -84, 86)

[2]libmpf._normalize. / x: (0, 1069560212849846842585070184689914, -108, 110, 88, 'd') / result: (0, 255003026211225233694331689, -86, 88)

[2]libmpf._normalize. / x: (0, 1081362188136143462483600697455327, -108, 110, 88, 'd') / result: (0, 257816836389575830098056959, -86, 88)

[2]libmpf._normalize. / x: (0, 1092749972487262132322162826065000, -108, 110, 88, 'd') / result: (0, 260531895753684552269497591, -86, 88)

[2]libmpf._normalize. / x: (0, 1103751655003830656441528956760327, -108, 110, 88, 'd') / result: (0, 263154901267011322126753081, -86, 88)

[2]libmpf._normalize. / x: (0, 1114392560881063724586709659212406, -108, 110, 88, 'd') / result: (0, 265691890926614695688893713, -86, 88)

[2]libmpf._normalize. / x: (0, 1124695602538649054231377328701755, -108, 110, 88, 'd') / result: (0, 8379635233720012413199077, -81, 83)

[2]libmpf._normalize. / x: (0, 1134681576702854752882595495583788, -108, 110, 88, 'd') / result: (0, 270529169250215233059548257, -86, 88)

[2]libmpf._normalize. / x: (0, 8190471379638829393207, -73, 73, 73, 'd') / result: (0, 8190471379638829393207, -73, 73)

[2]libmpf._normalize1 / x: (1, 3, -1, 2, 73, 'd') / result: (1, 3, -1, 2)

[2]libmpf._normalize. / x: (0, 54709737280064589764386659, -85, 86, 83, 'u') / result: (0, 6838717160008073720548333, -82, 83)

[3]libmpf._normalize1 / x: (0, 319833482451031748506059478797302009888489934350103719873113289869274442037, -246, 248, 78, 'u') / result: (0, 6678434726570384492723, -71, 73)

[3]libmpf._normalize1 / x: (0, 427419822500504607534269, -80, 79, 73, 'd') / result: (0, 3339217363285192246361, -73, 72)

[2]libmpf._normalize1 / x: (0, 6105515602454098181031, -73, 73, 73, 'd') / result: (0, 6105515602454098181031, -73, 73)

[3]libmpf._normalize1 / x: (0, 773314753520319913, -59, 60, 53, 'n') / result: (0, 6041521511877499, -52, 53)

[14]gammazeta.mpf_zeta / s: (0, 5, -1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 6041521511877499, -52, 53)

[1]gammazeta.mpc_zeta / s: ((0, 5, -1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 6041521511877499, -52, 53), (0, 0, 0, 0))

zeta_ / result: (1.34148725725092 + 0.0j) / count: 1000
zeta / count: 0 / s: Complex { re: 2.5, im: 0.0 }
zeta__ / s: Complex { re: 2.5, im: 0.0 } / result: Complex { re: 1.341487257250917, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (3.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(3+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(3+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(3+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=3.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=6755399441055744, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=6755399441055744 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=6755399441055744, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 6755399441055744, -51, 53, 53, 'd') / result: (0, 3, 0, 2)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 3, 0, 2), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='3.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 3, 0, 2), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 3, 0, 2), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 3, 0, 2), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 3, 0, 2), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=442721857769029238784, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=300000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=300000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (3+0j) / result: (3.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (3+0j) / result: (3.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 3, 0, 2), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 3, 0, 2), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 3, 0, 2), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=3, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=107227058845987649992062771777817500340443569, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=107227058845987649992062771777817500340443569 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=107227058845987649992062771777817500340443569, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=107227058845987649992062771777817500340443569 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=107227058845987649992062771777817500340443569, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 107227058845987649992062771777817500340443569, -146, 147, 53, 'n') / result: (0, 5413583021147681, -52, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 107227058845987649992062771777817500340443569, -146, 147, 53, 'n') / result: (0, 5413583021147681, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 3 / prec: 53 / rnd: n / result: (0, 5413583021147681, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 3 / prec: 53 / rnd: n / result: (0, 5413583021147681, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 3, 0, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 5413583021147681, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 3, 0, 2) / prec: 53 / rnd: n / alt: 0 / result: (0, 5413583021147681, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 3, 0, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5413583021147681, -52, 53), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 3, 0, 2), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 5413583021147681, -52, 53), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5413583021147681, -52, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.20205690315959 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 3.0, im: 0.0 }
zeta__ / s: Complex { re: 3.0, im: 0.0 } / result: Complex { re: 1.2020569031595942, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (3.5, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(3.5+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(3.5+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(3.5+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=3.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=7881299347898368, exp=-51, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7881299347898368 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=7881299347898368, exp=-51, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 7881299347898368, -51, 53, 53, 'd') / result: (0, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 7881299347898368, -51, 53, 53, 'd') / result: (0, 7, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 7, -1, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='3.5', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 7, -1, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 7, -1, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 7, -1, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, -1, 3), prec=67 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=516508834063867445248, xbits=67, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=350000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=350000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (3.5+0j) / result: (3.5 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (3.5+0j) / result: (3.5 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 7, -1, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 7, -1, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 7, -1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1066 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 7, -1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5, -1, 3, 73, 'd') / result: (1, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5, -1, 3, 73, 'd') / result: (1, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(1, 5, -1, 3), prec=None, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1067 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1086 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 7, -1, 3), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1088 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1089 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-22913065092203158942339, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848905, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-36316348947724947832444, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2963191210337610354422, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-45826130184406317884681, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697807, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-53202489577569406340889, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5716820659524430939410, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-59229414039928106774783, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6236486223509490203327, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-64325106066022808744126, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1140794197414788233984, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-68739195276609476827023, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848898, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-72632697895449895664888, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5926382420675220708844, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-76115554669772565283231, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2443525646352551090501, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-79266181859862126838993, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5839488482606749232550, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-82142479132131265717125, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2963191210337610354418, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-84788416131540755330477, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=317254210928120741066, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-87238171158225967686464, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4414089210586668082890, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-89518838525294354173337, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2133421843518281596017, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-91652260368812635769365, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697800, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-93656302143530694156103, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4542548251625701311062, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-95545762987653054607230, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2653087407503340859935, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-97333039622493583949929, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=865810772662811517236, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-99028619761975724225573, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5716820659524430939403, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-100641455013747756576570, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4103985407752398588406, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-102179246952065285781331, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2566193469434869383645, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-103648669547748181668564, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1096770873751973496412, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-105055544224334424659467, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6236486223509490203320, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-106404979155138812681782, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4887051292705102181005, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-107701481223743914272819, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3590549224100000589968, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-108949046843174843497332, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2342983604669071365455, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=28, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-110151236250429126628806, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1140794197414788233981, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=29, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-111311234758043937126860, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6527385716143737433738, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=30, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-112431903617497513115675, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5406716856690161444923, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=31, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-113515822539447196644423, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4322797934740477916175, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=32, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-114565325461015794711703, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848895, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=33, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-115582530807587074671437, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2256089666600599889161, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=8760495853491029806377, exp=-73, prec=73, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1105 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=8760495853491029806377 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=8760495853491029806377, exp=-73, bc=73, prec=73, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 8760495853491029806377, -73, 73, 73, 'd') / result: (0, 8760495853491029806377, -73, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 8760495853491029806377, -73, 73, 73, 'd') / result: (0, 8760495853491029806377, -73, 73)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 7, -1, 3), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1111 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 7, -1, 3), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=5, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 5, -1, 3, 73, 'd') / result: (1, 5, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 5, -1, 3, 73, 'd') / result: (1, 5, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_pow / f_locals: s=(0, 1, 1, 1), t=(1, 5, -1, 3), prec=73, rnd='d' / f_lineno: 318 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1111 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 1, 1, 1), prec=83, rnd='u' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 338 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=748288838313422294120286634350736906063837462003712 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1479 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=748288838313422294120286634350736906063837462003712 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=54709737280064589764386659, exp=-85, prec=83, rnd='u' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=54709737280064589764386659 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=54709737280064589764386659, exp=-85, bc=86, prec=83, rnd='u' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 54709737280064589764386659, -85, 86, 83, 'u') / result: (0, 6838717160008073720548333, -82, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 54709737280064589764386659, -85, 86, 83, 'u') / result: (0, 6838717160008073720548333, -82, 83)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_pow_int / f_locals: s=(0, 6838717160008073720548333, -82, 83), n=-5, prec=73, rnd='d' / f_lineno: 1132 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 338 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_pow_int / f_locals: s=(0, 6838717160008073720548333, -82, 83), n=5, prec=78, rnd='u' / f_lineno: 1132 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1162 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=14957989064813680174811896160119652169798998478165118853156513801094587960085288428074839090569459344236843431579902450856893 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1172 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=14957989064813680174811896160119652169798998478165118853156513801094587960085288428074839090569459344236843431579902450856893, exp=-410, bc=413, prec=78, rnd='u' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1172 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 14957989064813680174811896160119652169798998478165118853156513801094587960085288428074839090569459344236843431579902450856893, -410, 413, 78, 'u') / result: (0, 6678434726570384492723, -70, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 14957989064813680174811896160119652169798998478165118853156513801094587960085288428074839090569459344236843431579902450856893, -410, 413, 78, 'u') / result: (0, 6678434726570384492723, -70, 73)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 1, 0, 1), t=(0, 6678434726570384492723, -70, 73), prec=73, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1163 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=427419822500504607534269 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=427419822500504607534269, exp=-81, bc=79, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 427419822500504607534269, -81, 79, 73, 'd') / result: (0, 3339217363285192246361, -74, 72)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 427419822500504607534269, -81, 79, 73, 'd') / result: (0, 3339217363285192246361, -74, 72)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 3339217363285192246361, -74, 72), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1111 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 3339217363285192246361, -74, 72), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=15550248568193388608423 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=15550248568193388608423, exp=-74, bc=74, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 15550248568193388608423, -74, 74, 73, 'd') / result: (0, 7775124284096694304211, -73, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 15550248568193388608423, -74, 74, 73, 'd') / result: (0, 7775124284096694304211, -73, 73)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 8760495853491029806377, -73, 73), t=(0, 7775124284096694304211, -73, 73), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1112 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=649517852799336217 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=649517852799336217, exp=-59, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 649517852799336217, -59, 60, 53, 'n') / result: (0, 2537179112497407, -51, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 649517852799336217, -59, 60, 53, 'n') / result: (0, 2537179112497407, -51, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[14]gammazeta.mpf_zeta / s: (0, 7, -1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 2537179112497407, -51, 52)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1113 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[14]gammazeta.mpf_zeta / s: (0, 7, -1, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 2537179112497407, -51, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1113 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 7, -1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 2537179112497407, -51, 52), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 7, -1, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 2537179112497407, -51, 52), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 2537179112497407, -51, 52), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.12673386731706 + 0.0j) / count: 187
zeta / count: 0 / s: Complex { re: 3.5, im: 0.0 }
zeta__ / s: Complex { re: 3.5, im: 0.0 } / result: Complex { re: 1.1267338673170566, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (4.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(4+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(4+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(4+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=4.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=4503599627370496, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=4503599627370496 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=4503599627370496, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 4503599627370496, -50, 53, 53, 'd') / result: (0, 1, 2, 1)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 4503599627370496, -50, 53, 53, 'd') / result: (0, 1, 2, 1)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 1, 2, 1), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='4.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 1, 2, 1), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 1, 2, 1), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 1, 2, 1), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 1, 2, 1), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=295147905179352825856, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=400000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=400000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (4+0j) / result: (4.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (4+0j) / result: (4.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 1, 2, 1), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 1, 2, 1), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 1, 2, 1), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=4, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=96546458629767209991975301597999168271649827, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=96546458629767209991975301597999168271649827 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=96546458629767209991975301597999168271649827, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=96546458629767209991975301597999168271649827 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=96546458629767209991975301597999168271649827, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 96546458629767209991975301597999168271649827, -146, 147, 53, 'n') / result: (0, 609293814004489, -49, 50)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 96546458629767209991975301597999168271649827, -146, 147, 53, 'n') / result: (0, 609293814004489, -49, 50)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 4 / prec: 53 / rnd: n / result: (0, 609293814004489, -49, 50)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 4 / prec: 53 / rnd: n / result: (0, 609293814004489, -49, 50)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 1, 2, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 609293814004489, -49, 50)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 1, 2, 1) / prec: 53 / rnd: n / alt: 0 / result: (0, 609293814004489, -49, 50)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 1, 2, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 609293814004489, -49, 50), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 1, 2, 1), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 609293814004489, -49, 50), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 609293814004489, -49, 50), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.08232323371114 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 4.0, im: 0.0 }
zeta__ / s: Complex { re: 4.0, im: 0.0 } / result: Complex { re: 1.0823232337111381, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (4.5, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(4.5+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(4.5+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(4.5+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=4.5, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5066549580791808, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5066549580791808 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5066549580791808, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5066549580791808, -50, 53, 53, 'd') / result: (0, 9, -1, 4)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5066549580791808, -50, 53, 53, 'd') / result: (0, 9, -1, 4)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 9, -1, 4), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='4.5', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 9, -1, 4), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 9, -1, 4), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 9, -1, 4), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 9, -1, 4), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=332041393326771929088, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=450000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=450000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (4.5+0j) / result: (4.5 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (4.5+0j) / result: (4.5 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 9, -1, 4), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 9, -1, 4), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 9, -1, 4), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1066 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 9, -1, 4), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=7, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 7, -1, 3, 73, 'd') / result: (1, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 7, -1, 3, 73, 'd') / result: (1, 7, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_abs / f_locals: s=(1, 7, -1, 3), prec=None, rnd='d' / f_lineno: 767 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1067 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1086 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 9, -1, 4), prec=73 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1088 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: g / f_locals: prec=73, kwargs={} / f_lineno: 94 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1089 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=1, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=0, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=0, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=2, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-29459655118546918640150, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848905, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=3, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-46692448647074932927428, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5680271563675144655060, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=4, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-58919310237093837280304, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697806, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=5, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-68403200885446379581143, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3609289404334977094778, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=6, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-76152103765621851567578, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2406976550503264806154, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=7, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-82703707799172182671019, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2401962543296693400524, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=8, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-88378965355640755920458, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848896, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=9, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-93384897294149865854856, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4813953101006529612309, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=10, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-97862856003993298221297, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=335994391163097245868, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=11, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-101913662391251305935848, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2831778030248849229128, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=12, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-105611758884168770207732, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5680271563675144655055, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=13, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-109013677883409542567756, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2278352564434372295031, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=14, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-112163362917719101311168, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5675257556468573249430, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=15, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-115095649532521312508576, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2742970941666362052022, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=16, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-117838620474187674560612, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6546590026343759697797, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=17, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-120415245613110892486418, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3969964887420541771991, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=18, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-122844552412696784495010, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1540658087834649763399, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=19, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-125142479514634607935623, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5789321012240586020597, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=20, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-127322511122540216861451, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3609289404334977094769, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=21, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-129396156446247115598447, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1535644080628078357773, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=22, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-131373317509798224575997, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6105073043420729078034, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=23, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-133262575132819090716725, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4215815420399862937306, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=24, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-135071414002715688847886, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2406976550503264806145, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=25, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-136806401770892759162291, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=671988782326194491740, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=26, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-138473333001956461207910, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=5551647577606252143932, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=27, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-140077345941224798782284, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3947634638337914569558, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=28, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-141623018036266019951322, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=2401962543296693400520, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=29, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-143114444688913633448820, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=910535890649079903022, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=30, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-144555304651068231148725, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=6016265954838241900928, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=31, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-145948914693574967114258, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=4622655912331505935395, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=32, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-147298275592734593200761, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=3273295013171879848892, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: log_int_fixed / f_locals: n=33, prec=73, ln2=6546590026343759697811 / f_lineno: 516 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1091 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_fixed / f_locals: x=-148606111038326238863276, prec=73, ln2=6546590026343759697811 / f_lineno: 1403 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1098 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: exp_basecase / f_locals: x=1965459567580234186377, prec=73 / f_lineno: 1086 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1408 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=9080956387821046546712, exp=-73, prec=73, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1105 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=9080956387821046546712 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=9080956387821046546712, exp=-73, bc=73, prec=73, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 9080956387821046546712, -73, 73, 73, 'd') / result: (0, 1135119548477630818339, -70, 70)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 9080956387821046546712, -73, 73, 73, 'd') / result: (0, 1135119548477630818339, -70, 70)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 9, -1, 4), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1111 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 9, -1, 4), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=7 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=1, man=7, exp=-1, bc=3, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize1 / x: (1, 7, -1, 3, 73, 'd') / result: (1, 7, -1, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize1 / x: (1, 7, -1, 3, 73, 'd') / result: (1, 7, -1, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 224 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_pow / f_locals: s=(0, 1, 1, 1), t=(1, 7, -1, 3), prec=73, rnd='d' / f_lineno: 318 / f_code.co_filename: \mpmath\libmp\libelefun.py / f_back.f_lineno: 1111 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_sqrt / f_locals: s=(0, 1, 1, 1), prec=83, rnd='u' / f_lineno: 1458 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 338 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: sqrtrem_python / f_locals: x=748288838313422294120286634350736906063837462003712 / f_lineno: 279 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1479 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: isqrt_small_python / f_locals: x=748288838313422294120286634350736906063837462003712 / f_lineno: 205 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 284 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=54709737280064589764386659, exp=-85, prec=83, rnd='u' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1484 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=54709737280064589764386659 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=54709737280064589764386659, exp=-85, bc=86, prec=83, rnd='u' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 54709737280064589764386659, -85, 86, 83, 'u') / result: (0, 6838717160008073720548333, -82, 83)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 54709737280064589764386659, -85, 86, 83, 'u') / result: (0, 6838717160008073720548333, -82, 83)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_pow_int / f_locals: s=(0, 6838717160008073720548333, -82, 83), n=-7, prec=73, rnd='d' / f_lineno: 1132 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 338 / f_back.f_code.co_filename: \mpmath\libmp\libelefun.py
call(zeta_) / f_code.co_name: mpf_pow_int / f_locals: s=(0, 6838717160008073720548333, -82, 83), n=7, prec=78, rnd='u' / f_lineno: 1132 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1162 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=699556016300893917039606088219184051691432471831398516208504598236364746884549285827976820526672531929199342305314034177947047695314040742117928135276574031306588972426431877 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1172 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=699556016300893917039606088219184051691432471831398516208504598236364746884549285827976820526672531929199342305314034177947047695314040742117928135276574031306588972426431877, exp=-574, bc=578, prec=78, rnd='u' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1172 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 699556016300893917039606088219184051691432471831398516208504598236364746884549285827976820526672531929199342305314034177947047695314040742117928135276574031306588972426431877, -574, 578, 78, 'u') / result: (0, 6678434726570384492723, -69, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 699556016300893917039606088219184051691432471831398516208504598236364746884549285827976820526672531929199342305314034177947047695314040742117928135276574031306588972426431877, -574, 578, 78, 'u') / result: (0, 6678434726570384492723, -69, 73)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 1, 0, 1), t=(0, 6678434726570384492723, -69, 73), prec=73, rnd='d' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1163 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=427419822500504607534269 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=427419822500504607534269, exp=-82, bc=79, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 427419822500504607534269, -82, 79, 73, 'd') / result: (0, 3339217363285192246361, -75, 72)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 427419822500504607534269, -82, 79, 73, 'd') / result: (0, 3339217363285192246361, -75, 72)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_sub / f_locals: s=(0, 1, 0, 1), t=(0, 3339217363285192246361, -75, 72), prec=73, rnd='d' / f_lineno: 887 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1111 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_add / f_locals: s=(0, 1, 0, 1), t=(0, 3339217363285192246361, -75, 72), prec=73, rnd='d', _sub=1 / f_lineno: 792 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 890 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=34439714499671969463207 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 830 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=34439714499671969463207, exp=-75, bc=75, prec=73, rnd='d' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 831 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 34439714499671969463207, -75, 75, 73, 'd') / result: (0, 8609928624917992365801, -73, 73)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 34439714499671969463207, -75, 75, 73, 'd') / result: (0, 8609928624917992365801, -73, 73)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: mpf_div / f_locals: s=(0, 1135119548477630818339, -70, 70), t=(0, 8609928624917992365801, -73, 73), prec=53, rnd='n' / f_lineno: 1040 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1112 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=607997485113619049 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize1 / f_locals: sign=0, man=607997485113619049, exp=-59, bc=60, prec=53, rnd='n' / f_lineno: 213 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1074 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[3]libmpf._normalize1 / x: (0, 607997485113619049, -59, 60, 53, 'n') / result: (0, 4749980352450149, -52, 53)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[3]libmpf._normalize1 / x: (0, 607997485113619049, -59, 60, 53, 'n') / result: (0, 4749980352450149, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 258 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[14]gammazeta.mpf_zeta / s: (0, 9, -1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 4749980352450149, -52, 53)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1113 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[14]gammazeta.mpf_zeta / s: (0, 9, -1, 4) / prec: 53 / rnd: n / alt: 0 / result: (0, 4749980352450149, -52, 53)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1113 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 9, -1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 4749980352450149, -52, 53), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 9, -1, 4), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 4749980352450149, -52, 53), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 4749980352450149, -52, 53), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.05470751076145 + 0.0j) / count: 187
zeta / count: 0 / s: Complex { re: 4.5, im: 0.0 }
zeta__ / s: Complex { re: 4.5, im: 0.0 } / result: Complex { re: 1.0547075107614543, im: 0.0 } / z: Complex { re: NaN, im: NaN }
zeta_ / s: (5.0, 0.0) / count: 0
call(zeta_) / f_code.co_name: zeta / f_locals: s=(5+0j), a=1, derivative=0, method=None, kwargs={} / f_lineno: 528 / f_code.co_filename: \mpmath\functions\zeta.py / f_back.f_lineno: 24 / f_back.f_code.co_filename: 
call(zeta_) / f_code.co_name: f / f_locals: x=(5+0j), kwargs={}, name='zeta' / f_lineno: 1017 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 533 / f_back.f_code.co_filename: \mpmath\functions\zeta.py
call(zeta_) / f_code.co_name: convert / f_locals: x=(5+0j), strings=True / f_lineno: 623 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1019 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_float / f_locals: x=5.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=5629499534213120, exp=-50, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=5629499534213120 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=5629499534213120, exp=-50, bc=53, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 5629499534213120, -50, 53, 53, 'd') / result: (0, 5, 0, 3)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 5629499534213120, -50, 53, 53, 'd') / result: (0, 5, 0, 3)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: from_float / f_locals: x=0.0, prec=53, rnd='d' / f_lineno: 500 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=0, exp=-53, prec=53, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 517 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=0, exp=-53, bc=0, prec=53, rnd='d' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[1]libmpf._normalize. / x: (0, 0, -53, 0, 53, 'd') / result: (0, 0, 0, 0)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 174 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 5, 0, 3), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 655 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: __str__ / f_locals: s=mpc(real='5.0', imag='0.0') / f_lineno: 396 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: _str_digits / f_locals:  / f_lineno: 404 / f_code.co_filename: \mpmath\ctx_mp.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpc_to_str / f_locals: z=((0, 5, 0, 3), (0, 0, 0, 0)), dps=15, kwargs={} / f_lineno: 55 / f_code.co_filename: \mpmath\libmp\libmpc.py / f_back.f_lineno: 397 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 5, 0, 3), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 57 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: to_digits_exp / f_locals: s=(0, 5, 0, 3), dps=18 / f_lineno: 1243 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1332 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: to_fixed / f_locals: s=(0, 5, 0, 3), prec=66 / f_lineno: 599 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1288 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: bin_to_radix / f_locals: x=368934881474191032320, xbits=66, base=10, bdigits=20 / f_lineno: 131 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1289 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: numeral_python / f_locals: n=500000000000000000000, base=10, size=18, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 149 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 1290 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: small_numeral / f_locals: n=500000000000000000000, base=10, digits='0123456789abcdefghijklmnopqrstuvwxyz' / f_lineno: 138 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 163 / f_back.f_code.co_filename: \mpmath\libmp\libintmath.py
call(zeta_) / f_code.co_name: to_str / f_locals: s=(0, 0, 0, 0), dps=15, strip_zeros=True, min_fixed=None, max_fixed=None, show_zero_exponent=False / f_lineno: 1295 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 61 / f_back.f_code.co_filename: \mpmath\libmp\libmpc.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[3]ctx_mp_python.convert / x: (5+0j) / result: (5.0 + 0.0j)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
[3]ctx_mp_python.convert / x: (5+0j) / result: (5.0 + 0.0j)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 656 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py

call(zeta_) / f_code.co_name: mpc_zeta / f_locals: s=((0, 5, 0, 3), (0, 0, 0, 0)), prec=53, rnd='n', alt=0, force=False / f_lineno: 1116 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
call(zeta_) / f_code.co_name: mpf_zeta / f_locals: s=(0, 5, 0, 3), prec=53, rnd='n', alt=0 / f_lineno: 1001 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1119 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: to_int / f_locals: s=(0, 5, 0, 3), rnd=None / f_lineno: 435 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: mpf_zeta_int / f_locals: s=5, prec=53, rnd='n' / f_lineno: 934 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 1039 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: borwein_coefficients / f_locals: n=33 / f_lineno: 913 / f_code.co_filename: \mpmath\libmp\gammazeta.py / f_back.f_lineno: 988 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.borwein_coefficients / n: 33 / result: [1, 2179, 792067, 115062531, 8930212611, 429314925315, 13983537177347, 327666966438659, 5764846406968067, 78615943485956867, 851604426176701187, 7470527451121689347, 53898915046387983107, 323897845985013506819, 1638178356374090130179, 7034281785235908174595, 25833609859980306522883, 81661917475887913739011, 223448095548034217779971, 532029677981012660429571, 1108048631855905753375491, 2029946562680066824315651, 3292927237466655352791811, 4769455369342763680768771, 6235511670496346417767171, 7463408621503347142796035, 8322751284048216428487427, 8818779962777819524211459, 9050689474911140452082435, 9136270117622166323831555, 9160252037839493347779331, 9165045885455648617505539, 9165654628010081032708867, 9165691521498228451812099]
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 916 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=92497046626946578196606270681831447376742251, exp=-146, prec=None, rnd='d' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 996 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=92497046626946578196606270681831447376742251 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: from_man_exp / f_locals: man=92497046626946578196606270681831447376742251, exp=-146, prec=53, rnd='n' / f_lineno: 362 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 997 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
call(zeta_) / f_code.co_name: python_bitcount / f_locals: n=92497046626946578196606270681831447376742251 / f_lineno: 91 / f_code.co_filename: \mpmath\libmp\libintmath.py / f_back.f_lineno: 373 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: _normalize / f_locals: sign=0, man=92497046626946578196606270681831447376742251, exp=-146, bc=147, prec=53, rnd='n' / f_lineno: 153 / f_code.co_filename: \mpmath\libmp\libmpf.py / f_back.f_lineno: 391 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input="[2]libmpf._normalize. / x: (0, 92497046626946578196606270681831447376742251, -146, 147, 53, 'n') / result: (0, 2334953725836903, -51, 52)\r\n", final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py
[2]libmpf._normalize. / x: (0, 92497046626946578196606270681831447376742251, -146, 147, 53, 'n') / result: (0, 2334953725836903, -51, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 210 / f_back.f_code.co_filename: \mpmath\libmp\libmpf.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[7]gammazeta.mpf_zeta_int / s: 5 / prec: 53 / rnd: n / result: (0, 2334953725836903, -51, 52)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[7]gammazeta.mpf_zeta_int / s: 5 / prec: 53 / rnd: n / result: (0, 2334953725836903, -51, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 998 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[8]gammazeta.mpf_zeta / s: (0, 5, 0, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 2334953725836903, -51, 52)\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[8]gammazeta.mpf_zeta / s: (0, 5, 0, 3) / prec: 53 / rnd: n / alt: 0 / result: (0, 2334953725836903, -51, 52)
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1040 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='[1]gammazeta.mpc_zeta / s: ((0, 5, 0, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 2334953725836903, -51, 52), (0, 0, 0, 0))\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py
[1]gammazeta.mpc_zeta / s: ((0, 5, 0, 3), (0, 0, 0, 0)) / prec: 53 / rnd: n / alt: 0 / force: False / result: ((0, 2334953725836903, -51, 52), (0, 0, 0, 0))
call(zeta_) / f_code.co_name: encode / f_locals: self=<encodings.cp1252.IncrementalEncoder object at 0x<?>>, input='\r\n', final=False / f_lineno: 18 / f_code.co_filename: C:\Users\i574n\scoop\apps\python\current\Lib\encodings\cp1252.py / f_back.f_lineno: 1120 / f_back.f_code.co_filename: \mpmath\libmp\gammazeta.py

call(zeta_) / f_code.co_name: make_mpc / f_locals: v=((0, 2334953725836903, -51, 52), (0, 0, 0, 0)) / f_lineno: 602 / f_code.co_filename: \mpmath\ctx_mp_python.py / f_back.f_lineno: 1035 / f_back.f_code.co_filename: \mpmath\ctx_mp_python.py
zeta_ / result: (1.03692775514337 + 0.0j) / count: 48
zeta / count: 0 / s: Complex { re: 5.0, im: 0.0 }
zeta__ / s: Complex { re: 5.0, im: 0.0 } / result: Complex { re: 1.03692775514337, im: 0.0 } / z: Complex { re: NaN, im: NaN }

graph¶

In [ ]:
graph TD
    zeta("zeta()") --> convert
    zeta --> f["f()"]
    f --> mpc_f["mpc_zeta()"]
    f --> mpf_f["mpf_zeta()"]
    convert --> from_float
    from_float --> from_man_exp
    from_man_exp --> python_bitcount
    python_bitcount --> _normalize
    _normalize --> make_mpc
    make_mpc --> mpc_zeta["mpc_zeta()"]
    mpc_zeta --> mpf_zeta["mpf_zeta()"]
    mpf_zeta --> to_int
    to_int --> mpf_zeta_int["mpf_zeta_int()"]
    mpf_zeta_int --> borwein_coefficients
    borwein_coefficients --> from_man_exp_2("from_man_exp()")
    from_man_exp_2 --> python_bitcount_2("python_bitcount()")
    python_bitcount_2 --> _normalize_2("_normalize()")
    _normalize_2 --> make_mpc_2("make_mpc()")
    make_mpc_2 --> stop_trace
    mpf_zeta_int --> mpf_bernoulli
    mpf_bernoulli --> bernoulli_size
    bernoulli_size --> mpf_rdiv_int
    mpf_rdiv_int --> python_bitcount_3("python_bitcount()")
    python_bitcount_3 --> _normalize1
    _normalize1 --> from_man_exp_3("from_man_exp()")
    from_man_exp_3 --> _normalize_3("_normalize()")
    _normalize_3 --> mpf_sub
    mpf_sub --> mpf_add
    mpf_add --> mpf_neg
    mpf_neg --> _normalize1_2("_normalize1()")
    _normalize1_2 --> from_int
    from_int --> mpf_div
    mpf_div --> python_bitcount_4("python_bitcount()")
    python_bitcount_4 --> _normalize1_3("_normalize1()")
    _normalize1_3 --> make_mpc_3("make_mpc()")
    make_mpc_3 --> final_stop["stop_trace()"]
In [ ]:
graph TD
    zeta_rust("zeta() - Rust") --> num_traits("num-traits")
    zeta_rust --> num_bigint("num-bigint")
    zeta_rust --> rust_decimal("rust_decimal for precision")
    zeta_rust --> error_handling("Rust Error Handling")

    num_traits --> num_traits_usage("Use for common traits")
    num_bigint --> bigint_operations("Arbitrary-precision arithmetic operations")
    rust_decimal --> decimal_operations("High-precision decimal operations")
    error_handling --> result_type("Use Result<T, E> for error handling")

    bigint_operations --> convert_rust("convert() - Rust")
    bigint_operations --> normalize_rust("_normalize() - Rust")

    convert_rust --> from_float_rust("from_float() - Rust")
    from_float_rust --> from_man_exp_rust("from_man_exp() - Rust")
    from_man_exp_rust --> bitcount_rust("bitcount() - Rust")
    bitcount_rust --> normalize_rust
    normalize_rust --> mpc_zeta_rust("mpc_zeta() - Rust")
    mpc_zeta_rust --> mpf_zeta_rust("mpf_zeta() - Rust")
    mpf_zeta_rust --> to_int_rust("to_int() - Rust")
    to_int_rust --> mpf_zeta_int_rust("mpf_zeta_int() - Rust")

    mpf_zeta_int_rust --> borwein_coefficients_rust("borwein_coefficients() - Rust")
    borwein_coefficients_rust --> from_man_exp_rust_2("from_man_exp() - Rust")
    from_man_exp_rust_2 --> bitcount_rust_2("bitcount() - Rust")
    bitcount_rust_2 --> normalize_rust_2("_normalize() - Rust")
    normalize_rust_2 --> make_mpc_rust("make_mpc() - Rust")

    mpf_zeta_int_rust --> mpf_bernoulli_rust("mpf_bernoulli() - Rust")
    mpf_bernoulli_rust --> bernoulli_size_rust("bernoulli_size() - Rust")
    bernoulli_size_rust --> mpf_rdiv_int_rust("mpf_rdiv_int() - Rust")
    mpf_rdiv_int_rust --> bitcount_rust_3("bitcount() - Rust")
    bitcount_rust_3 --> normalize1_rust("_normalize1() - Rust")
    normalize1_rust --> from_man_exp_rust_3("from_man_exp() - Rust")
    from_man_exp_rust_3 --> normalize_rust_3("_normalize() - Rust")
    normalize_rust_3 --> mpf_sub_rust("mpf_sub() - Rust")
    mpf_sub_rust --> mpf_add_rust("mpf_add() - Rust")
    mpf_add_rust --> mpf_neg_rust("mpf_neg() - Rust")
    mpf_neg_rust --> normalize1_rust_2("_normalize1() - Rust")
    normalize1_rust_2 --> from_int_rust("from_int() - Rust")
    from_int_rust --> mpf_div_rust("mpf_div() - Rust")
    mpf_div_rust --> bitcount_rust_4("bitcount() - Rust")
    bitcount_rust_4 --> normalize1_rust_3("_normalize1() - Rust")

    style zeta_rust fill:#f9f,stroke:#333,stroke-width:4px
    style num_traits fill:#bbf,stroke:#333,stroke-width:2px
    style num_bigint fill:#bbf,stroke:#333,stroke-width:2px
    style rust_decimal fill:#bbf,stroke:#333,stroke-width:2px
    style error_handling fill:#bbf,stroke:#333,stroke-width:2px
    style bigint_operations fill:#bfb,stroke:#333,stroke-width:2px
    style decimal_operations fill:#bfb,stroke:#333,stroke-width:2px
    style result_type fill:#bfb,stroke:#333,stroke-width:2px

tests¶

In [ ]:
inl tests () =
    !\($'"}//"') : ()

    !\($'"#[test] fn test_zeta_at_known_values_() { //"') : ()
    test_zeta_at_known_values_ false
    !\($'"} #[test] fn test_zeta_at_2_minus2() { //"') : ()
    test_zeta_at_2_minus2 false
    !\($'"} #[test] fn test_trivial_zero_at_negative_even___() { //"') : ()
    test_trivial_zero_at_negative_even___ false
    !\($'"} #[test] fn test_non_trivial_zero___() { //"') : ()
    test_non_trivial_zero___ false
    !\($'"} #[test] fn test_real_part_greater_than_one___() { //"') : ()
    test_real_part_greater_than_one___ false
    !\($'"} #[test] fn test_zeta_at_1___() { //"') : ()
    test_zeta_at_1___ false
    !\($'"} #[test] fn test_symmetry_across_real_axis___() { //"') : ()
    test_symmetry_across_real_axis___ false
    !\($'"} #[test] fn test_behavior_near_origin___() { //"') : ()
    test_behavior_near_origin___ false
    !\($'"} #[test] fn test_imaginary_axis() { //"') : ()
    test_imaginary_axis false
    !\($'"} #[test] fn test_critical_strip() { //"') : ()
    test_critical_strip false
    !\($'"} #[test] fn test_reflection_formula_for_specific_value() { //"') : ()
    test_reflection_formula_for_specific_value false
    !\($'"} #[test] fn test_euler_product_formula() { //"') : ()
    test_euler_product_formula false
()


In [ ]:
// // rust=

inl main (_args : array_base string) =
    inl value = 1i32
    console.write_line ($"$\"value: {!value}\"" : string)
    0i32

inl main () =
    types ()
    $"let tests () = !tests ()" : ()
    $"let main args = !main args" : ()
.fsx:
[<Fable.Core.Erase; Fable.Core.Emit("Func0<$0>")>] type Func0<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Func1<$0, $1>")>] type Func0<'T, 'U> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Box<$0>")>] type Box<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("dyn $0")>] type Dyn<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Fn() -> $0")>] type Fn<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Fn()")>] type FnUnit = class end
[<Fable.Core.Erase; Fable.Core.Emit("FnOnce() -> $0")>] type FnOnce<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("Fn($0, $1)")>] type ActionFn2<'T, 'U> = class end
[<Fable.Core.Erase; Fable.Core.Emit("impl $0")>] type Impl<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("mut $0")>] type Mut<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("&$0")>] type Ref<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("&'static $0")>] type StaticRef<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("MutCell<$0>")>] type MutCell<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::any::Any")>] type std_any_Any = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::cell::RefCell<$0>")>] type std_cell_RefCell<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::pin::Pin<$0>")>] type std_pin_Pin<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::rc::Rc<$0>")>] type std_rc_Rc<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::rc::Weak<$0>")>] type std_rc_Weak<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::sync::Arc<$0>")>] type std_sync_Arc<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("str")>] type Str = class end
[<Fable.Core.Erase; Fable.Core.Emit("base64::DecodeError")>] type base64_DecodeError = class end
[<Fable.Core.Erase; Fable.Core.Emit("borsh::io::Error")>] type borsh_io_Error = class end
[<Fable.Core.Erase; Fable.Core.Emit("js_sys::JsString")>] type js_sys_JsString = class end
[<Fable.Core.Erase; Fable.Core.Emit("serde_json::Error")>] type serde_json_Error = class end
[<Fable.Core.Erase; Fable.Core.Emit("serde_json::Value")>] type serde_json_Value = class end
[<Fable.Core.Erase; Fable.Core.Emit("serde_wasm_bindgen::Error")>] type serde_wasm_bindgen_Error = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::str::Utf8Error")>] type std_str_Utf8Error = class end
[<Fable.Core.Erase; Fable.Core.Emit("std::string::String")>] type std_string_String = class end
[<Fable.Core.Erase; Fable.Core.Emit("num_complex::Complex<$0>")>] type num_complex_Complex<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::types::PyModule")>] type pyo3_types_PyModule = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::Bound<$0>")>] type pyo3_Bound<'T> = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::Python")>] type pyo3_Python = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::PyAny")>] type pyo3_PyAny = class end
[<Fable.Core.Erase; Fable.Core.Emit("pyo3::PyErr")>] type pyo3_PyErr = class end
Fable.Core.RustInterop.emitRustExpr () ");
use pyo3::prelude::PyAnyMethods;
//"
type Mut0 = {mutable l0 : int32}
and Mut1 = {mutable l0 : int32; mutable l1 : string}
and Mut2 = {mutable l0 : int32; mutable l1 : num_complex_Complex<float>}
and UH0 =
    | UH0_0 of float * UH0
    | UH0_1
and Mut3 = {mutable l0 : int32; mutable l1 : float}
let rec method2 () : float =
    2.0
and method3 (v0 : float) : float =
    v0
and method4 () : float =
    0.0
and method5 () : float =
    -1.0
and method6 (v0 : (struct (num_complex_Complex<float> * float) [])) : (struct (num_complex_Complex<float> * float) []) =
    v0
and method7 (v0 : int32, v1 : Mut0) : bool =
    let v2 : int32 = v1.l0
    let v3 : bool = v2 < v0
    v3
and method8 (v0 : num_complex_Complex<float>) : num_complex_Complex<float> =
    v0
and method10 (v0 : (string [])) : (string []) =
    v0
and method12 (v0 : int32, v1 : Mut1) : bool =
    let v2 : int32 = v1.l0
    let v3 : bool = v2 < v0
    v3
and method11 (v0 : (string [])) : string =
    let v1 : int32 = v0.Length
    let v2 : string = ""
    let v3 : Mut1 = {l0 = 0; l1 = v2} : Mut1
    while method12(v1, v3) do
        let v5 : int32 = v3.l0
        let v6 : string = v3.l1
        let v7 : string = v0.[int v5]
        let v8 : string = "\n"
        let v9 : string = v6 + v7 + v8 + ""
        let v10 : int32 = v5 + 1
        v3.l0 <- v10
        v3.l1 <- v9
        ()
    let v11 : string = v3.l1
    v11
and method13 (v0 : num_complex_Complex<float>) : num_complex_Complex<float> =
    v0
and method14 (v0 : num_complex_Complex<float>) : num_complex_Complex<float> =
    v0
and method15 (v0 : pyo3_Python) : pyo3_Python =
    v0
and method16 (v0 : string) : string =
    v0
and method17 (v0 : Result<pyo3_Bound<pyo3_types_PyModule>, pyo3_PyErr>) : Result<pyo3_Bound<pyo3_types_PyModule>, pyo3_PyErr> =
    v0
and method18 () : string =
    let v0 : string = "fn"
    v0
and method19 (v0 : pyo3_Bound<pyo3_types_PyModule>) : pyo3_Bound<pyo3_types_PyModule> =
    v0
and method20 (v0 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr>) : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> =
    v0
and method21 (v0 : (bool * (float * float))) : (bool * (float * float)) =
    v0
and method22 (v0 : pyo3_Bound<pyo3_PyAny>) : pyo3_Bound<pyo3_PyAny> =
    v0
and method23 (v0 : pyo3_Bound<pyo3_PyAny>) : pyo3_Bound<pyo3_PyAny> =
    v0
and method24 (v0 : Result<struct (float * float), pyo3_PyErr>) : Result<struct (float * float), pyo3_PyErr> =
    v0
and method25 (v0 : float) : float =
    v0
and method26 (v0 : float) : float =
    v0
and method9 (v0 : pyo3_Python, v1 : string, v2 : num_complex_Complex<float>) : Result<num_complex_Complex<float>, pyo3_PyErr> =
    let v3 : string = $"import sys"
    let v4 : string = $"import traceback"
    let v5 : string = $"import re"
    let v6 : string = $"count = 0"
    let v7 : string = $"memory_address_pattern = re.compile(r' at 0x[0-9a-fA-F]+')"
    let v8 : string = $"def trace_calls(frame, event, arg):"
    let v9 : string = $"  global count"
    let v10 : string = $"  count += 1"
    let v11 : string = $"  if count < 300:"
    let v12 : string = $"    try:"
    let v13 : string = $"      args = {{ k: v for k, v in frame.f_locals.items() if k not in ['ctx'] and not callable(v) }}"
    let v14 : string = $"      args_str = ', '.join([ f\"{{k}}={{re.sub(memory_address_pattern, ' at 0x<?>', repr(v))}}\" for k, v in args.items() ])"
    let v15 : string = "zeta_"
    let v16 : string = $"      print(f\"{{event}}({v15}) / f_code.co_name: {{frame.f_code.co_name}} / f_locals: {{args_str}} / f_lineno: {{frame.f_lineno}} / f_code.co_filename: {{frame.f_code.co_filename.split('site-packages')[-1]}} / f_back.f_lineno: {{ '' if frame.f_back is None else frame.f_back.f_lineno }} / f_back.f_code.co_filename: {{ '' if frame.f_back is None else frame.f_back.f_code.co_filename.split('site-packages')[-1] }}\", flush=True)"
    let v17 : string = $"    except ValueError as e:"
    let v18 : string = $"      print(f'{v15} / e: {{e}}', flush=True)"
    let v19 : string = $"import mpmath"
    let v20 : string = $"def fn(log, s):"
    let v21 : string = $"  global count"
    let v22 : string = $"  if log:"
    let v23 : string = $"    print(f'{v15} / s: {{s}} / count: {{count}}', flush=True)"
    let v24 : string = $"  s = complex(*s)"
    let v25 : string = $"  try:"
    let v26 : string = $"    if log: sys.settrace(trace_calls)"
    let v27 : string = $"    if log:"
    let v28 : string = $"      sys.settrace(None)"
    let v29 : string = $"      print(f'{v15} / result: {{s}} / count: {{count}}', flush=True)"
    let v30 : string = $"  except ValueError as e:"
    let v31 : string = $"    if s.real == 1:"
    let v32 : string = $"      s = complex(float('inf'), 0)"
    let v33 : string = $"  return (s.real, s.imag)"
    let v34 : (string []) = [|v3; v4; v5; v6; v7; v8; v9; v10; v11; v12; v13; v14; v16; v17; v18; v19; v20; v21; v22; v23; v24; v25; v26; v1; v27; v28; v29; v30; v31; v32; v33|]
    let v35 : (string []) = method10(v34)
    let v36 : string = method11(v35)
    let v37 : num_complex_Complex<float> = method13(v2)
    let v38 : string = "v37.re"
    let v39 : float = Fable.Core.RustInterop.emitRustExpr () v38
    let v40 : num_complex_Complex<float> = method14(v2)
    let v41 : string = "v40.im"
    let v42 : float = Fable.Core.RustInterop.emitRustExpr () v41
    let v43 : (float * float) = v39, v42
    let v44 : (bool * (float * float)) = false, v43
    let v45 : pyo3_Python = method15(v0)
    let v46 : string = method16(v36)
    let v47 : string = $"fable_library_rust::String_::LrcStr::as_str(&v46)"
    let v48 : Ref<Str> = Fable.Core.RustInterop.emitRustExpr () v47
    let v49 : string = "pyo3::types::PyModule::from_code_bound(v45, v48, \"\", \"\")"
    let v50 : Result<pyo3_Bound<pyo3_types_PyModule>, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v49
    let v51 : Result<pyo3_Bound<pyo3_types_PyModule>, pyo3_PyErr> = method17(v50)
    let v52 : string = "v51.unwrap()"
    let v53 : pyo3_Bound<pyo3_types_PyModule> = Fable.Core.RustInterop.emitRustExpr () v52
    let v54 : string = method18()
    let v55 : string = $"fable_library_rust::String_::LrcStr::as_str(&v54)"
    let v56 : Ref<Str> = Fable.Core.RustInterop.emitRustExpr () v55
    let v57 : pyo3_Bound<pyo3_types_PyModule> = method19(v53)
    let v58 : string = "v57.getattr(v56)"
    let v59 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v58
    let v60 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> = method20(v59)
    let v61 : string = "v60.unwrap()"
    let v62 : pyo3_Bound<pyo3_PyAny> = Fable.Core.RustInterop.emitRustExpr () v61
    let v63 : (bool * (float * float)) = method21(v44)
    let v64 : pyo3_Bound<pyo3_PyAny> = method22(v62)
    let v65 : string = "pyo3::prelude::PyAnyMethods::call(&v64, ((*v63).0, *(*v63).1), None)"
    let v66 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v65
    let v67 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> = method20(v66)
    let v68 : string = "v67.unwrap()"
    let v69 : pyo3_Bound<pyo3_PyAny> = Fable.Core.RustInterop.emitRustExpr () v68
    let v70 : pyo3_Bound<pyo3_PyAny> = method23(v69)
    let v71 : string = "v70.extract()"
    let v72 : Result<struct (float * float), pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v71
    let v73 : Result<struct (float * float), pyo3_PyErr> = method24(v72)
    let v74 : string = "v73.unwrap()"
    let struct (v75 : float, v76 : float) = Fable.Core.RustInterop.emitRustExpr () v74
    let v77 : float = method25(v75)
    let v78 : float = method3(v77)
    let v79 : float = method26(v76)
    let v80 : string = "num_complex::Complex::new(v78, v79)"
    let v81 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v80
    let v82 : Result<num_complex_Complex<float>, pyo3_PyErr> = Ok v81
    v82
and method27 (v0 : Result<num_complex_Complex<float>, pyo3_PyErr>) : Result<num_complex_Complex<float>, pyo3_PyErr> =
    v0
and method29 (v0 : num_complex_Complex<float>) : num_complex_Complex<float> =
    v0
and method30 () : float =
    0.0
and method31 (v0 : Mut0) : bool =
    let v1 : int32 = v0.l0
    let v2 : bool = v1 < 10000
    v2
and method32 (v0 : int32, v1 : Mut2) : bool =
    let v2 : int32 = v1.l0
    let v3 : bool = v2 < v0
    v3
and method33 () : float =
    1.0
and method34 (v0 : num_complex_Complex<float>) : num_complex_Complex<float> =
    v0
and method35 (v0 : num_complex_Complex<float>) : num_complex_Complex<float> =
    v0
and method36 (v0 : pyo3_Python, v1 : string, v2 : num_complex_Complex<float>) : Result<num_complex_Complex<float>, pyo3_PyErr> =
    let v3 : string = $"import sys"
    let v4 : string = $"import traceback"
    let v5 : string = $"import re"
    let v6 : string = $"count = 0"
    let v7 : string = $"memory_address_pattern = re.compile(r' at 0x[0-9a-fA-F]+')"
    let v8 : string = $"def trace_calls(frame, event, arg):"
    let v9 : string = $"  global count"
    let v10 : string = $"  count += 1"
    let v11 : string = $"  if count < 300:"
    let v12 : string = $"    try:"
    let v13 : string = $"      args = {{ k: v for k, v in frame.f_locals.items() if k not in ['ctx'] and not callable(v) }}"
    let v14 : string = $"      args_str = ', '.join([ f\"{{k}}={{re.sub(memory_address_pattern, ' at 0x<?>', repr(v))}}\" for k, v in args.items() ])"
    let v15 : string = "gamma_"
    let v16 : string = $"      print(f\"{{event}}({v15}) / f_code.co_name: {{frame.f_code.co_name}} / f_locals: {{args_str}} / f_lineno: {{frame.f_lineno}} / f_code.co_filename: {{frame.f_code.co_filename.split('site-packages')[-1]}} / f_back.f_lineno: {{ '' if frame.f_back is None else frame.f_back.f_lineno }} / f_back.f_code.co_filename: {{ '' if frame.f_back is None else frame.f_back.f_code.co_filename.split('site-packages')[-1] }}\", flush=True)"
    let v17 : string = $"    except ValueError as e:"
    let v18 : string = $"      print(f'{v15} / e: {{e}}', flush=True)"
    let v19 : string = $"import mpmath"
    let v20 : string = $"def fn(log, s):"
    let v21 : string = $"  global count"
    let v22 : string = $"  if log:"
    let v23 : string = $"    print(f'{v15} / s: {{s}} / count: {{count}}', flush=True)"
    let v24 : string = $"  s = complex(*s)"
    let v25 : string = $"  try:"
    let v26 : string = $"    if log: sys.settrace(trace_calls)"
    let v27 : string = $"    if log:"
    let v28 : string = $"      sys.settrace(None)"
    let v29 : string = $"      print(f'{v15} / result: {{s}} / count: {{count}}', flush=True)"
    let v30 : string = $"  except ValueError as e:"
    let v31 : string = $"    if s.real == 1:"
    let v32 : string = $"      s = complex(float('inf'), 0)"
    let v33 : string = $"  return (s.real, s.imag)"
    let v34 : (string []) = [|v3; v4; v5; v6; v7; v8; v9; v10; v11; v12; v13; v14; v16; v17; v18; v19; v20; v21; v22; v23; v24; v25; v26; v1; v27; v28; v29; v30; v31; v32; v33|]
    let v35 : (string []) = method10(v34)
    let v36 : string = method11(v35)
    let v37 : num_complex_Complex<float> = method13(v2)
    let v38 : string = "v37.re"
    let v39 : float = Fable.Core.RustInterop.emitRustExpr () v38
    let v40 : num_complex_Complex<float> = method14(v2)
    let v41 : string = "v40.im"
    let v42 : float = Fable.Core.RustInterop.emitRustExpr () v41
    let v43 : (float * float) = v39, v42
    let v44 : (bool * (float * float)) = false, v43
    let v45 : pyo3_Python = method15(v0)
    let v46 : string = method16(v36)
    let v47 : string = $"fable_library_rust::String_::LrcStr::as_str(&v46)"
    let v48 : Ref<Str> = Fable.Core.RustInterop.emitRustExpr () v47
    let v49 : string = "pyo3::types::PyModule::from_code_bound(v45, v48, \"\", \"\")"
    let v50 : Result<pyo3_Bound<pyo3_types_PyModule>, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v49
    let v51 : Result<pyo3_Bound<pyo3_types_PyModule>, pyo3_PyErr> = method17(v50)
    let v52 : string = "v51.unwrap()"
    let v53 : pyo3_Bound<pyo3_types_PyModule> = Fable.Core.RustInterop.emitRustExpr () v52
    let v54 : string = method18()
    let v55 : string = $"fable_library_rust::String_::LrcStr::as_str(&v54)"
    let v56 : Ref<Str> = Fable.Core.RustInterop.emitRustExpr () v55
    let v57 : pyo3_Bound<pyo3_types_PyModule> = method19(v53)
    let v58 : string = "v57.getattr(v56)"
    let v59 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v58
    let v60 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> = method20(v59)
    let v61 : string = "v60.unwrap()"
    let v62 : pyo3_Bound<pyo3_PyAny> = Fable.Core.RustInterop.emitRustExpr () v61
    let v63 : (bool * (float * float)) = method21(v44)
    let v64 : pyo3_Bound<pyo3_PyAny> = method22(v62)
    let v65 : string = "pyo3::prelude::PyAnyMethods::call(&v64, ((*v63).0, *(*v63).1), None)"
    let v66 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v65
    let v67 : Result<pyo3_Bound<pyo3_PyAny>, pyo3_PyErr> = method20(v66)
    let v68 : string = "v67.unwrap()"
    let v69 : pyo3_Bound<pyo3_PyAny> = Fable.Core.RustInterop.emitRustExpr () v68
    let v70 : pyo3_Bound<pyo3_PyAny> = method23(v69)
    let v71 : string = "v70.extract()"
    let v72 : Result<struct (float * float), pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v71
    let v73 : Result<struct (float * float), pyo3_PyErr> = method24(v72)
    let v74 : string = "v73.unwrap()"
    let struct (v75 : float, v76 : float) = Fable.Core.RustInterop.emitRustExpr () v74
    let v77 : float = method25(v75)
    let v78 : float = method3(v77)
    let v79 : float = method26(v76)
    let v80 : string = "num_complex::Complex::new(v78, v79)"
    let v81 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v80
    let v82 : Result<num_complex_Complex<float>, pyo3_PyErr> = Ok v81
    v82
and method37 () : float =
    3.141592653589793
and method28 (v0 : pyo3_Python, v1 : num_complex_Complex<float>) : num_complex_Complex<float> =
    let v2 : num_complex_Complex<float> = method29(v1)
    let v3 : string = "println!(\"zeta / count: {:?} / s: {:?}\", 0, v2)"
    Fable.Core.RustInterop.emitRustExpr () v3
    let v4 : num_complex_Complex<float> = method13(v2)
    let v5 : string = "v4.re"
    let v6 : float = Fable.Core.RustInterop.emitRustExpr () v5
    let v7 : bool = v6 > 1.0
    if v7 then
        let v8 : float = method30()
        let v9 : float = method3(v8)
        let v10 : float = method4()
        let v11 : string = "num_complex::Complex::new(v9, v10)"
        let v12 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v11
        let v13 : (int32 []) = Array.zeroCreate<int32> (10000)
        let v14 : Mut0 = {l0 = 0} : Mut0
        while method31(v14) do
            let v16 : int32 = v14.l0
            v13.[int v16] <- v16
            let v17 : int32 = v16 + 1
            v14.l0 <- v17
            ()
        let v18 : int32 = v13.Length
        let v19 : Mut2 = {l0 = 0; l1 = v12} : Mut2
        while method32(v18, v19) do
            let v21 : int32 = v19.l0
            let v22 : num_complex_Complex<float> = v19.l1
            let v23 : int32 = v13.[int v21]
            let v24 : float = method33()
            let v25 : float = method3(v24)
            let v26 : float = method4()
            let v27 : string = "num_complex::Complex::new(v25, v26)"
            let v28 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v27
            let v29 : float = float v23
            let v30 : float = method25(v29)
            let v31 : float = method3(v30)
            let v32 : float = method4()
            let v33 : string = "num_complex::Complex::new(v31, v32)"
            let v34 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v33
            let v35 : num_complex_Complex<float> = method34(v34)
            let v36 : num_complex_Complex<float> = method35(v2)
            let v37 : string = "num_complex::Complex::powc(v35, v36)"
            let v38 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v37
            let v39 : string = "v28 / v38"
            let v40 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v39
            let v41 : string = "v22 + v40"
            let v42 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v41
            let v43 : int32 = v21 + 1
            v19.l0 <- v43
            v19.l1 <- v42
            ()
        let v44 : num_complex_Complex<float> = v19.l1
        v44
    else
        let v45 : float = method33()
        let v46 : float = method3(v45)
        let v47 : float = method4()
        let v48 : string = "num_complex::Complex::new(v46, v47)"
        let v49 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v48
        let v50 : string = "v49 - v2"
        let v51 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v50
        let v52 : string = $"    s = mpmath.gamma(s)"
        let v53 : num_complex_Complex<float> = method8(v51)
        let v54 : Result<num_complex_Complex<float>, pyo3_PyErr> = method36(v0, v52, v53)
        let v55 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v54)
        let v56 : string = "v55.unwrap()"
        let v57 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v56
        let v58 : float = method37()
        let v59 : float = method3(v58)
        let v60 : float = method4()
        let v61 : string = "num_complex::Complex::new(v59, v60)"
        let v62 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v61
        let v63 : string = "v62 * v2"
        let v64 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v63
        let v65 : float = method2()
        let v66 : float = method3(v65)
        let v67 : float = method4()
        let v68 : string = "num_complex::Complex::new(v66, v67)"
        let v69 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v68
        let v70 : string = "v64 / v69"
        let v71 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v70
        let v72 : string = "v71.sin()"
        let v73 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v72
        let v74 : num_complex_Complex<float> = method13(v2)
        let v75 : string = "v74.re"
        let v76 : float = Fable.Core.RustInterop.emitRustExpr () v75
        let v77 : float = 1.0 - v76
        let v78 : num_complex_Complex<float> = method14(v2)
        let v79 : string = "v78.im"
        let v80 : float = Fable.Core.RustInterop.emitRustExpr () v79
        let v81 : float =  -v80
        let v82 : float = method25(v77)
        let v83 : float = method3(v82)
        let v84 : float = method26(v81)
        let v85 : string = "num_complex::Complex::new(v83, v84)"
        let v86 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v85
        let v87 : num_complex_Complex<float> = method13(v86)
        let v88 : string = "v87.re"
        let v89 : float = Fable.Core.RustInterop.emitRustExpr () v88
        let v90 : bool = v89 <= 1.0
        let v568 : num_complex_Complex<float> =
            if v90 then
                let v91 : float = method30()
                let v92 : float = method3(v91)
                let v93 : float = method4()
                let v94 : string = "num_complex::Complex::new(v92, v93)"
                let v95 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v94
                v95
            else
                let v96 : num_complex_Complex<float> = method29(v86)
                let v97 : string = "println!(\"zeta / count: {:?} / s: {:?}\", 1, v96)"
                Fable.Core.RustInterop.emitRustExpr () v97
                let v98 : num_complex_Complex<float> = method13(v96)
                let v99 : string = "v98.re"
                let v100 : float = Fable.Core.RustInterop.emitRustExpr () v99
                let v101 : bool = v100 > 1.0
                if v101 then
                    let v102 : float = method30()
                    let v103 : float = method3(v102)
                    let v104 : float = method4()
                    let v105 : string = "num_complex::Complex::new(v103, v104)"
                    let v106 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v105
                    let v107 : (int32 []) = Array.zeroCreate<int32> (10000)
                    let v108 : Mut0 = {l0 = 0} : Mut0
                    while method31(v108) do
                        let v110 : int32 = v108.l0
                        v107.[int v110] <- v110
                        let v111 : int32 = v110 + 1
                        v108.l0 <- v111
                        ()
                    let v112 : int32 = v107.Length
                    let v113 : Mut2 = {l0 = 0; l1 = v106} : Mut2
                    while method32(v112, v113) do
                        let v115 : int32 = v113.l0
                        let v116 : num_complex_Complex<float> = v113.l1
                        let v117 : int32 = v107.[int v115]
                        let v118 : float = method33()
                        let v119 : float = method3(v118)
                        let v120 : float = method4()
                        let v121 : string = "num_complex::Complex::new(v119, v120)"
                        let v122 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v121
                        let v123 : float = float v117
                        let v124 : float = method25(v123)
                        let v125 : float = method3(v124)
                        let v126 : float = method4()
                        let v127 : string = "num_complex::Complex::new(v125, v126)"
                        let v128 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v127
                        let v129 : num_complex_Complex<float> = method34(v128)
                        let v130 : num_complex_Complex<float> = method35(v96)
                        let v131 : string = "num_complex::Complex::powc(v129, v130)"
                        let v132 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v131
                        let v133 : string = "v122 / v132"
                        let v134 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v133
                        let v135 : string = "v116 + v134"
                        let v136 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v135
                        let v137 : int32 = v115 + 1
                        v113.l0 <- v137
                        v113.l1 <- v136
                        ()
                    let v138 : num_complex_Complex<float> = v113.l1
                    v138
                else
                    let v139 : float = method33()
                    let v140 : float = method3(v139)
                    let v141 : float = method4()
                    let v142 : string = "num_complex::Complex::new(v140, v141)"
                    let v143 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v142
                    let v144 : string = "v143 - v96"
                    let v145 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v144
                    let v146 : string = $"    s = mpmath.gamma(s)"
                    let v147 : num_complex_Complex<float> = method8(v145)
                    let v148 : Result<num_complex_Complex<float>, pyo3_PyErr> = method36(v0, v146, v147)
                    let v149 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v148)
                    let v150 : string = "v149.unwrap()"
                    let v151 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v150
                    let v152 : float = method37()
                    let v153 : float = method3(v152)
                    let v154 : float = method4()
                    let v155 : string = "num_complex::Complex::new(v153, v154)"
                    let v156 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v155
                    let v157 : string = "v156 * v96"
                    let v158 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v157
                    let v159 : float = method2()
                    let v160 : float = method3(v159)
                    let v161 : float = method4()
                    let v162 : string = "num_complex::Complex::new(v160, v161)"
                    let v163 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v162
                    let v164 : string = "v158 / v163"
                    let v165 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v164
                    let v166 : string = "v165.sin()"
                    let v167 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v166
                    let v168 : num_complex_Complex<float> = method13(v96)
                    let v169 : string = "v168.re"
                    let v170 : float = Fable.Core.RustInterop.emitRustExpr () v169
                    let v171 : float = 1.0 - v170
                    let v172 : num_complex_Complex<float> = method14(v96)
                    let v173 : string = "v172.im"
                    let v174 : float = Fable.Core.RustInterop.emitRustExpr () v173
                    let v175 : float =  -v174
                    let v176 : float = method25(v171)
                    let v177 : float = method3(v176)
                    let v178 : float = method26(v175)
                    let v179 : string = "num_complex::Complex::new(v177, v178)"
                    let v180 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v179
                    let v181 : num_complex_Complex<float> = method13(v180)
                    let v182 : string = "v181.re"
                    let v183 : float = Fable.Core.RustInterop.emitRustExpr () v182
                    let v184 : bool = v183 <= 1.0
                    let v544 : num_complex_Complex<float> =
                        if v184 then
                            let v185 : float = method30()
                            let v186 : float = method3(v185)
                            let v187 : float = method4()
                            let v188 : string = "num_complex::Complex::new(v186, v187)"
                            let v189 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v188
                            v189
                        else
                            let v190 : num_complex_Complex<float> = method29(v180)
                            let v191 : string = "println!(\"zeta / count: {:?} / s: {:?}\", 2, v190)"
                            Fable.Core.RustInterop.emitRustExpr () v191
                            let v192 : num_complex_Complex<float> = method13(v190)
                            let v193 : string = "v192.re"
                            let v194 : float = Fable.Core.RustInterop.emitRustExpr () v193
                            let v195 : bool = v194 > 1.0
                            if v195 then
                                let v196 : float = method30()
                                let v197 : float = method3(v196)
                                let v198 : float = method4()
                                let v199 : string = "num_complex::Complex::new(v197, v198)"
                                let v200 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v199
                                let v201 : (int32 []) = Array.zeroCreate<int32> (10000)
                                let v202 : Mut0 = {l0 = 0} : Mut0
                                while method31(v202) do
                                    let v204 : int32 = v202.l0
                                    v201.[int v204] <- v204
                                    let v205 : int32 = v204 + 1
                                    v202.l0 <- v205
                                    ()
                                let v206 : int32 = v201.Length
                                let v207 : Mut2 = {l0 = 0; l1 = v200} : Mut2
                                while method32(v206, v207) do
                                    let v209 : int32 = v207.l0
                                    let v210 : num_complex_Complex<float> = v207.l1
                                    let v211 : int32 = v201.[int v209]
                                    let v212 : float = method33()
                                    let v213 : float = method3(v212)
                                    let v214 : float = method4()
                                    let v215 : string = "num_complex::Complex::new(v213, v214)"
                                    let v216 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v215
                                    let v217 : float = float v211
                                    let v218 : float = method25(v217)
                                    let v219 : float = method3(v218)
                                    let v220 : float = method4()
                                    let v221 : string = "num_complex::Complex::new(v219, v220)"
                                    let v222 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v221
                                    let v223 : num_complex_Complex<float> = method34(v222)
                                    let v224 : num_complex_Complex<float> = method35(v190)
                                    let v225 : string = "num_complex::Complex::powc(v223, v224)"
                                    let v226 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v225
                                    let v227 : string = "v216 / v226"
                                    let v228 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v227
                                    let v229 : string = "v210 + v228"
                                    let v230 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v229
                                    let v231 : int32 = v209 + 1
                                    v207.l0 <- v231
                                    v207.l1 <- v230
                                    ()
                                let v232 : num_complex_Complex<float> = v207.l1
                                v232
                            else
                                let v233 : float = method33()
                                let v234 : float = method3(v233)
                                let v235 : float = method4()
                                let v236 : string = "num_complex::Complex::new(v234, v235)"
                                let v237 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v236
                                let v238 : string = "v237 - v190"
                                let v239 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v238
                                let v240 : string = $"    s = mpmath.gamma(s)"
                                let v241 : num_complex_Complex<float> = method8(v239)
                                let v242 : Result<num_complex_Complex<float>, pyo3_PyErr> = method36(v0, v240, v241)
                                let v243 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v242)
                                let v244 : string = "v243.unwrap()"
                                let v245 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v244
                                let v246 : float = method37()
                                let v247 : float = method3(v246)
                                let v248 : float = method4()
                                let v249 : string = "num_complex::Complex::new(v247, v248)"
                                let v250 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v249
                                let v251 : string = "v250 * v190"
                                let v252 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v251
                                let v253 : float = method2()
                                let v254 : float = method3(v253)
                                let v255 : float = method4()
                                let v256 : string = "num_complex::Complex::new(v254, v255)"
                                let v257 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v256
                                let v258 : string = "v252 / v257"
                                let v259 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v258
                                let v260 : string = "v259.sin()"
                                let v261 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v260
                                let v262 : num_complex_Complex<float> = method13(v190)
                                let v263 : string = "v262.re"
                                let v264 : float = Fable.Core.RustInterop.emitRustExpr () v263
                                let v265 : float = 1.0 - v264
                                let v266 : num_complex_Complex<float> = method14(v190)
                                let v267 : string = "v266.im"
                                let v268 : float = Fable.Core.RustInterop.emitRustExpr () v267
                                let v269 : float =  -v268
                                let v270 : float = method25(v265)
                                let v271 : float = method3(v270)
                                let v272 : float = method26(v269)
                                let v273 : string = "num_complex::Complex::new(v271, v272)"
                                let v274 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v273
                                let v275 : num_complex_Complex<float> = method13(v274)
                                let v276 : string = "v275.re"
                                let v277 : float = Fable.Core.RustInterop.emitRustExpr () v276
                                let v278 : bool = v277 <= 1.0
                                let v520 : num_complex_Complex<float> =
                                    if v278 then
                                        let v279 : float = method30()
                                        let v280 : float = method3(v279)
                                        let v281 : float = method4()
                                        let v282 : string = "num_complex::Complex::new(v280, v281)"
                                        let v283 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v282
                                        v283
                                    else
                                        let v284 : num_complex_Complex<float> = method29(v274)
                                        let v285 : string = "println!(\"zeta / count: {:?} / s: {:?}\", 3, v284)"
                                        Fable.Core.RustInterop.emitRustExpr () v285
                                        let v286 : num_complex_Complex<float> = method13(v284)
                                        let v287 : string = "v286.re"
                                        let v288 : float = Fable.Core.RustInterop.emitRustExpr () v287
                                        let v289 : bool = v288 > 1.0
                                        if v289 then
                                            let v290 : float = method30()
                                            let v291 : float = method3(v290)
                                            let v292 : float = method4()
                                            let v293 : string = "num_complex::Complex::new(v291, v292)"
                                            let v294 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v293
                                            let v295 : (int32 []) = Array.zeroCreate<int32> (10000)
                                            let v296 : Mut0 = {l0 = 0} : Mut0
                                            while method31(v296) do
                                                let v298 : int32 = v296.l0
                                                v295.[int v298] <- v298
                                                let v299 : int32 = v298 + 1
                                                v296.l0 <- v299
                                                ()
                                            let v300 : int32 = v295.Length
                                            let v301 : Mut2 = {l0 = 0; l1 = v294} : Mut2
                                            while method32(v300, v301) do
                                                let v303 : int32 = v301.l0
                                                let v304 : num_complex_Complex<float> = v301.l1
                                                let v305 : int32 = v295.[int v303]
                                                let v306 : float = method33()
                                                let v307 : float = method3(v306)
                                                let v308 : float = method4()
                                                let v309 : string = "num_complex::Complex::new(v307, v308)"
                                                let v310 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v309
                                                let v311 : float = float v305
                                                let v312 : float = method25(v311)
                                                let v313 : float = method3(v312)
                                                let v314 : float = method4()
                                                let v315 : string = "num_complex::Complex::new(v313, v314)"
                                                let v316 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v315
                                                let v317 : num_complex_Complex<float> = method34(v316)
                                                let v318 : num_complex_Complex<float> = method35(v284)
                                                let v319 : string = "num_complex::Complex::powc(v317, v318)"
                                                let v320 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v319
                                                let v321 : string = "v310 / v320"
                                                let v322 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v321
                                                let v323 : string = "v304 + v322"
                                                let v324 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v323
                                                let v325 : int32 = v303 + 1
                                                v301.l0 <- v325
                                                v301.l1 <- v324
                                                ()
                                            let v326 : num_complex_Complex<float> = v301.l1
                                            v326
                                        else
                                            let v327 : float = method33()
                                            let v328 : float = method3(v327)
                                            let v329 : float = method4()
                                            let v330 : string = "num_complex::Complex::new(v328, v329)"
                                            let v331 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v330
                                            let v332 : string = "v331 - v284"
                                            let v333 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v332
                                            let v334 : string = $"    s = mpmath.gamma(s)"
                                            let v335 : num_complex_Complex<float> = method8(v333)
                                            let v336 : Result<num_complex_Complex<float>, pyo3_PyErr> = method36(v0, v334, v335)
                                            let v337 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v336)
                                            let v338 : string = "v337.unwrap()"
                                            let v339 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v338
                                            let v340 : float = method37()
                                            let v341 : float = method3(v340)
                                            let v342 : float = method4()
                                            let v343 : string = "num_complex::Complex::new(v341, v342)"
                                            let v344 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v343
                                            let v345 : string = "v344 * v284"
                                            let v346 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v345
                                            let v347 : float = method2()
                                            let v348 : float = method3(v347)
                                            let v349 : float = method4()
                                            let v350 : string = "num_complex::Complex::new(v348, v349)"
                                            let v351 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v350
                                            let v352 : string = "v346 / v351"
                                            let v353 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v352
                                            let v354 : string = "v353.sin()"
                                            let v355 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v354
                                            let v356 : num_complex_Complex<float> = method13(v284)
                                            let v357 : string = "v356.re"
                                            let v358 : float = Fable.Core.RustInterop.emitRustExpr () v357
                                            let v359 : float = 1.0 - v358
                                            let v360 : num_complex_Complex<float> = method14(v284)
                                            let v361 : string = "v360.im"
                                            let v362 : float = Fable.Core.RustInterop.emitRustExpr () v361
                                            let v363 : float =  -v362
                                            let v364 : float = method25(v359)
                                            let v365 : float = method3(v364)
                                            let v366 : float = method26(v363)
                                            let v367 : string = "num_complex::Complex::new(v365, v366)"
                                            let v368 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v367
                                            let v369 : num_complex_Complex<float> = method13(v368)
                                            let v370 : string = "v369.re"
                                            let v371 : float = Fable.Core.RustInterop.emitRustExpr () v370
                                            let v372 : bool = v371 <= 1.0
                                            let v496 : num_complex_Complex<float> =
                                                if v372 then
                                                    let v373 : float = method30()
                                                    let v374 : float = method3(v373)
                                                    let v375 : float = method4()
                                                    let v376 : string = "num_complex::Complex::new(v374, v375)"
                                                    let v377 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v376
                                                    v377
                                                else
                                                    let v378 : num_complex_Complex<float> = method29(v368)
                                                    let v379 : string = "println!(\"zeta / count: {:?} / s: {:?}\", 4, v378)"
                                                    Fable.Core.RustInterop.emitRustExpr () v379
                                                    let v380 : num_complex_Complex<float> = method13(v378)
                                                    let v381 : string = "v380.re"
                                                    let v382 : float = Fable.Core.RustInterop.emitRustExpr () v381
                                                    let v383 : bool = v382 > 1.0
                                                    if v383 then
                                                        let v384 : float = method30()
                                                        let v385 : float = method3(v384)
                                                        let v386 : float = method4()
                                                        let v387 : string = "num_complex::Complex::new(v385, v386)"
                                                        let v388 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v387
                                                        let v389 : (int32 []) = Array.zeroCreate<int32> (10000)
                                                        let v390 : Mut0 = {l0 = 0} : Mut0
                                                        while method31(v390) do
                                                            let v392 : int32 = v390.l0
                                                            v389.[int v392] <- v392
                                                            let v393 : int32 = v392 + 1
                                                            v390.l0 <- v393
                                                            ()
                                                        let v394 : int32 = v389.Length
                                                        let v395 : Mut2 = {l0 = 0; l1 = v388} : Mut2
                                                        while method32(v394, v395) do
                                                            let v397 : int32 = v395.l0
                                                            let v398 : num_complex_Complex<float> = v395.l1
                                                            let v399 : int32 = v389.[int v397]
                                                            let v400 : float = method33()
                                                            let v401 : float = method3(v400)
                                                            let v402 : float = method4()
                                                            let v403 : string = "num_complex::Complex::new(v401, v402)"
                                                            let v404 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v403
                                                            let v405 : float = float v399
                                                            let v406 : float = method25(v405)
                                                            let v407 : float = method3(v406)
                                                            let v408 : float = method4()
                                                            let v409 : string = "num_complex::Complex::new(v407, v408)"
                                                            let v410 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v409
                                                            let v411 : num_complex_Complex<float> = method34(v410)
                                                            let v412 : num_complex_Complex<float> = method35(v378)
                                                            let v413 : string = "num_complex::Complex::powc(v411, v412)"
                                                            let v414 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v413
                                                            let v415 : string = "v404 / v414"
                                                            let v416 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v415
                                                            let v417 : string = "v398 + v416"
                                                            let v418 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v417
                                                            let v419 : int32 = v397 + 1
                                                            v395.l0 <- v419
                                                            v395.l1 <- v418
                                                            ()
                                                        let v420 : num_complex_Complex<float> = v395.l1
                                                        v420
                                                    else
                                                        let v421 : float = method33()
                                                        let v422 : float = method3(v421)
                                                        let v423 : float = method4()
                                                        let v424 : string = "num_complex::Complex::new(v422, v423)"
                                                        let v425 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v424
                                                        let v426 : string = "v425 - v378"
                                                        let v427 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v426
                                                        let v428 : string = $"    s = mpmath.gamma(s)"
                                                        let v429 : num_complex_Complex<float> = method8(v427)
                                                        let v430 : Result<num_complex_Complex<float>, pyo3_PyErr> = method36(v0, v428, v429)
                                                        let v431 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v430)
                                                        let v432 : string = "v431.unwrap()"
                                                        let v433 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v432
                                                        let v434 : float = method37()
                                                        let v435 : float = method3(v434)
                                                        let v436 : float = method4()
                                                        let v437 : string = "num_complex::Complex::new(v435, v436)"
                                                        let v438 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v437
                                                        let v439 : string = "v438 * v378"
                                                        let v440 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v439
                                                        let v441 : float = method2()
                                                        let v442 : float = method3(v441)
                                                        let v443 : float = method4()
                                                        let v444 : string = "num_complex::Complex::new(v442, v443)"
                                                        let v445 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v444
                                                        let v446 : string = "v440 / v445"
                                                        let v447 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v446
                                                        let v448 : string = "v447.sin()"
                                                        let v449 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v448
                                                        let v450 : num_complex_Complex<float> = method13(v378)
                                                        let v451 : string = "v450.re"
                                                        let v452 : float = Fable.Core.RustInterop.emitRustExpr () v451
                                                        let v453 : float = 1.0 - v452
                                                        let v454 : num_complex_Complex<float> = method14(v378)
                                                        let v455 : string = "v454.im"
                                                        let v456 : float = Fable.Core.RustInterop.emitRustExpr () v455
                                                        let v457 : float =  -v456
                                                        let v458 : float = method25(v453)
                                                        let v459 : float = method3(v458)
                                                        let v460 : float = method26(v457)
                                                        let v461 : string = "num_complex::Complex::new(v459, v460)"
                                                        let v462 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v461
                                                        let v463 : num_complex_Complex<float> = method13(v462)
                                                        let v464 : string = "v463.re"
                                                        let v465 : float = Fable.Core.RustInterop.emitRustExpr () v464
                                                        let v466 : bool = v465 <= 1.0
                                                        let v472 : num_complex_Complex<float> =
                                                            if v466 then
                                                                let v467 : float = method30()
                                                                let v468 : float = method3(v467)
                                                                let v469 : float = method4()
                                                                let v470 : string = "num_complex::Complex::new(v468, v469)"
                                                                let v471 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v470
                                                                v471
                                                            else
                                                                v462
                                                        let v473 : float = method2()
                                                        let v474 : float = method3(v473)
                                                        let v475 : float = method4()
                                                        let v476 : string = "num_complex::Complex::new(v474, v475)"
                                                        let v477 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v476
                                                        let v478 : float = method37()
                                                        let v479 : float = method3(v478)
                                                        let v480 : float = method4()
                                                        let v481 : string = "num_complex::Complex::new(v479, v480)"
                                                        let v482 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v481
                                                        let v483 : num_complex_Complex<float> = method34(v482)
                                                        let v484 : num_complex_Complex<float> = method35(v378)
                                                        let v485 : string = "num_complex::Complex::powc(v483, v484)"
                                                        let v486 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v485
                                                        let v487 : string = "v477 * v486"
                                                        let v488 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v487
                                                        let v489 : string = "v488 * v449"
                                                        let v490 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v489
                                                        let v491 : string = "v490 * v433"
                                                        let v492 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v491
                                                        let v493 : string = "v492 * v472"
                                                        let v494 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v493
                                                        v494
                                            let v497 : float = method2()
                                            let v498 : float = method3(v497)
                                            let v499 : float = method4()
                                            let v500 : string = "num_complex::Complex::new(v498, v499)"
                                            let v501 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v500
                                            let v502 : float = method37()
                                            let v503 : float = method3(v502)
                                            let v504 : float = method4()
                                            let v505 : string = "num_complex::Complex::new(v503, v504)"
                                            let v506 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v505
                                            let v507 : num_complex_Complex<float> = method34(v506)
                                            let v508 : num_complex_Complex<float> = method35(v284)
                                            let v509 : string = "num_complex::Complex::powc(v507, v508)"
                                            let v510 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v509
                                            let v511 : string = "v501 * v510"
                                            let v512 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v511
                                            let v513 : string = "v512 * v355"
                                            let v514 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v513
                                            let v515 : string = "v514 * v339"
                                            let v516 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v515
                                            let v517 : string = "v516 * v496"
                                            let v518 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v517
                                            v518
                                let v521 : float = method2()
                                let v522 : float = method3(v521)
                                let v523 : float = method4()
                                let v524 : string = "num_complex::Complex::new(v522, v523)"
                                let v525 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v524
                                let v526 : float = method37()
                                let v527 : float = method3(v526)
                                let v528 : float = method4()
                                let v529 : string = "num_complex::Complex::new(v527, v528)"
                                let v530 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v529
                                let v531 : num_complex_Complex<float> = method34(v530)
                                let v532 : num_complex_Complex<float> = method35(v190)
                                let v533 : string = "num_complex::Complex::powc(v531, v532)"
                                let v534 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v533
                                let v535 : string = "v525 * v534"
                                let v536 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v535
                                let v537 : string = "v536 * v261"
                                let v538 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v537
                                let v539 : string = "v538 * v245"
                                let v540 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v539
                                let v541 : string = "v540 * v520"
                                let v542 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v541
                                v542
                    let v545 : float = method2()
                    let v546 : float = method3(v545)
                    let v547 : float = method4()
                    let v548 : string = "num_complex::Complex::new(v546, v547)"
                    let v549 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v548
                    let v550 : float = method37()
                    let v551 : float = method3(v550)
                    let v552 : float = method4()
                    let v553 : string = "num_complex::Complex::new(v551, v552)"
                    let v554 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v553
                    let v555 : num_complex_Complex<float> = method34(v554)
                    let v556 : num_complex_Complex<float> = method35(v96)
                    let v557 : string = "num_complex::Complex::powc(v555, v556)"
                    let v558 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v557
                    let v559 : string = "v549 * v558"
                    let v560 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v559
                    let v561 : string = "v560 * v167"
                    let v562 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v561
                    let v563 : string = "v562 * v151"
                    let v564 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v563
                    let v565 : string = "v564 * v544"
                    let v566 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v565
                    v566
        let v569 : float = method2()
        let v570 : float = method3(v569)
        let v571 : float = method4()
        let v572 : string = "num_complex::Complex::new(v570, v571)"
        let v573 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v572
        let v574 : float = method37()
        let v575 : float = method3(v574)
        let v576 : float = method4()
        let v577 : string = "num_complex::Complex::new(v575, v576)"
        let v578 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v577
        let v579 : num_complex_Complex<float> = method34(v578)
        let v580 : num_complex_Complex<float> = method35(v2)
        let v581 : string = "num_complex::Complex::powc(v579, v580)"
        let v582 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v581
        let v583 : string = "v573 * v582"
        let v584 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v583
        let v585 : string = "v584 * v73"
        let v586 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v585
        let v587 : string = "v586 * v57"
        let v588 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v587
        let v589 : string = "v588 * v568"
        let v590 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v589
        v590
and method38 (v0 : bool) : bool =
    v0
and method1 (v0 : pyo3_Python) : unit =
    let v1 : float = method2()
    let v2 : float = method3(v1)
    let v3 : float = method4()
    let v4 : string = "num_complex::Complex::new(v2, v3)"
    let v5 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v4
    let v6 : float = method5()
    let v7 : float = method3(v6)
    let v8 : float = method4()
    let v9 : string = "num_complex::Complex::new(v7, v8)"
    let v10 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v9
    let v11 : (struct (num_complex_Complex<float> * float) []) = [|struct (v5, 1.6449340668482264); struct (v10, -0.08333333333333333)|]
    let v12 : (struct (num_complex_Complex<float> * float) []) = method6(v11)
    let v13 : int32 = v12.Length
    let v14 : Mut0 = {l0 = 0} : Mut0
    while method7(v13, v14) do
        let v16 : int32 = v14.l0
        let struct (v17 : num_complex_Complex<float>, v18 : float) = v12.[int v16]
        let v19 : string = $"    s = mpmath.zeta(s)"
        let v20 : num_complex_Complex<float> = method8(v17)
        let v21 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v19, v20)
        let v22 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v21)
        let v23 : string = "v22.unwrap()"
        let v24 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v23
        let v25 : num_complex_Complex<float> = method28(v0, v17)
        let v26 : num_complex_Complex<float> = method14(v24)
        let v27 : string = "v26.im"
        let v28 : float = Fable.Core.RustInterop.emitRustExpr () v27
        let v29 : bool = v28 = 0.0
        let v31 : bool =
            if v29 then
                true
            else
                method38(v29)
        let v32 : string = $"__expect / actual: %A{v28} / expected: %A{0.0}"
        let v33 : bool = v31 = false
        if v33 then
            failwith<unit> v32
        let v34 : num_complex_Complex<float> = method13(v24)
        let v35 : string = "v34.re"
        let v36 : float = Fable.Core.RustInterop.emitRustExpr () v35
        let v37 : float = v36 - v18
        let v38 : float =  -v37
        let v39 : bool = v37 >= v38
        let v40 : float =
            if v39 then
                v37
            else
                v38
        let v41 : bool = v40 < 0.0001
        let v43 : bool =
            if v41 then
                true
            else
                method38(v41)
        let v44 : string = $"__expect / actual: %A{v40} / expected: %A{0.0001}"
        let v45 : bool = v43 = false
        if v45 then
            failwith<unit> v44
        let v46 : int32 = v16 + 1
        v14.l0 <- v46
        ()
    ()
and method39 (v0 : Result<unit, pyo3_PyErr>) : Result<unit, pyo3_PyErr> =
    v0
and method40 (v0 : Result<unit, pyo3_PyErr>) : Result<unit, pyo3_PyErr> =
    v0
and method0 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method1(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method43 () : float =
    -2.0
and method42 (v0 : pyo3_Python) : unit =
    let v1 : float = method2()
    let v2 : float = method3(v1)
    let v3 : float = method43()
    let v4 : string = "num_complex::Complex::new(v2, v3)"
    let v5 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v4
    let v6 : string = $"    s = mpmath.zeta(s)"
    let v7 : num_complex_Complex<float> = method8(v5)
    let v8 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v6, v7)
    let v9 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v8)
    let v10 : string = "v9.unwrap()"
    let v11 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v10
    let v12 : num_complex_Complex<float> = method28(v0, v5)
    let v13 : num_complex_Complex<float> = method13(v11)
    let v14 : string = "v13.re"
    let v15 : float = Fable.Core.RustInterop.emitRustExpr () v14
    let v16 : float = v15 - 0.8673
    let v17 : float =  -v16
    let v18 : bool = v16 >= v17
    let v19 : float =
        if v18 then
            v16
        else
            v17
    let v20 : bool = v19 < 0.001
    let v22 : bool =
        if v20 then
            true
        else
            method38(v20)
    let v23 : string = $"__expect / actual: %A{v19} / expected: %A{0.001}"
    let v24 : bool = v22 = false
    if v24 then
        failwith<unit> v23
    let v25 : num_complex_Complex<float> = method14(v11)
    let v26 : string = "v25.im"
    let v27 : float = Fable.Core.RustInterop.emitRustExpr () v26
    let v28 : float = v27 - 0.275
    let v29 : float =  -v28
    let v30 : bool = v28 >= v29
    let v31 : float =
        if v30 then
            v28
        else
            v29
    let v32 : bool = v31 < 0.001
    let v34 : bool =
        if v32 then
            true
        else
            method38(v32)
    let v35 : string = $"__expect / actual: %A{v31} / expected: %A{0.001}"
    let v36 : bool = v34 = false
    if v36 then
        failwith<unit> v35
and method41 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method42(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method46 () : UH0 =
    let v0 : UH0 = UH0_1
    let v1 : UH0 = UH0_0(-40.0, v0)
    let v2 : UH0 = UH0_0(-38.0, v1)
    let v3 : UH0 = UH0_0(-36.0, v2)
    let v4 : UH0 = UH0_0(-34.0, v3)
    let v5 : UH0 = UH0_0(-32.0, v4)
    let v6 : UH0 = UH0_0(-30.0, v5)
    let v7 : UH0 = UH0_0(-28.0, v6)
    let v8 : UH0 = UH0_0(-26.0, v7)
    let v9 : UH0 = UH0_0(-24.0, v8)
    let v10 : UH0 = UH0_0(-22.0, v9)
    let v11 : UH0 = UH0_0(-20.0, v10)
    let v12 : UH0 = UH0_0(-18.0, v11)
    let v13 : UH0 = UH0_0(-16.0, v12)
    let v14 : UH0 = UH0_0(-14.0, v13)
    let v15 : UH0 = UH0_0(-12.0, v14)
    let v16 : UH0 = UH0_0(-10.0, v15)
    let v17 : UH0 = UH0_0(-8.0, v16)
    let v18 : UH0 = UH0_0(-6.0, v17)
    let v19 : UH0 = UH0_0(-4.0, v18)
    UH0_0(-2.0, v19)
and method47 (v0 : pyo3_Python, v1 : UH0) : unit =
    match v1 with
    | UH0_0(v2, v3) -> (* Cons *)
        let v4 : float = method25(v2)
        let v5 : float = method3(v4)
        let v6 : float = method4()
        let v7 : string = "num_complex::Complex::new(v5, v6)"
        let v8 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v7
        let v9 : string = $"    s = mpmath.zeta(s)"
        let v10 : num_complex_Complex<float> = method8(v8)
        let v11 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v9, v10)
        let v12 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v11)
        let v13 : string = "v12.unwrap()"
        let v14 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v13
        let v15 : num_complex_Complex<float> = method28(v0, v8)
        let v16 : num_complex_Complex<float> = method13(v14)
        let v17 : string = "v16.re"
        let v18 : float = Fable.Core.RustInterop.emitRustExpr () v17
        let v19 : bool = v18 = 0.0
        let v21 : bool =
            if v19 then
                true
            else
                method38(v19)
        let v22 : string = $"__expect / actual: %A{v18} / expected: %A{0.0}"
        let v23 : bool = v21 = false
        if v23 then
            failwith<unit> v22
        let v24 : num_complex_Complex<float> = method14(v14)
        let v25 : string = "v24.im"
        let v26 : float = Fable.Core.RustInterop.emitRustExpr () v25
        let v27 : bool = v26 = 0.0
        let v29 : bool =
            if v27 then
                true
            else
                method38(v27)
        let v30 : string = $"__expect / actual: %A{v26} / expected: %A{0.0}"
        let v31 : bool = v29 = false
        if v31 then
            failwith<unit> v30
        method47(v0, v3)
    | UH0_1 -> (* Nil *)
        ()
and method45 (v0 : pyo3_Python) : unit =
    let v1 : UH0 = method46()
    method47(v0, v1)
and method44 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method45(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method50 () : float =
    0.5
and method51 () : float =
    14.134725
and method52 () : float =
    21.02204
and method53 () : float =
    25.010857
and method54 () : float =
    30.424876
and method55 () : float =
    32.935062
and method56 () : float =
    37.586178
and method57 (v0 : (num_complex_Complex<float> [])) : (num_complex_Complex<float> []) =
    v0
and method49 (v0 : pyo3_Python) : unit =
    let v1 : float = method50()
    let v2 : float = method3(v1)
    let v3 : float = method51()
    let v4 : string = "num_complex::Complex::new(v2, v3)"
    let v5 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v4
    let v6 : float = method50()
    let v7 : float = method3(v6)
    let v8 : float = method52()
    let v9 : string = "num_complex::Complex::new(v7, v8)"
    let v10 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v9
    let v11 : float = method50()
    let v12 : float = method3(v11)
    let v13 : float = method53()
    let v14 : string = "num_complex::Complex::new(v12, v13)"
    let v15 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v14
    let v16 : float = method50()
    let v17 : float = method3(v16)
    let v18 : float = method54()
    let v19 : string = "num_complex::Complex::new(v17, v18)"
    let v20 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v19
    let v21 : float = method50()
    let v22 : float = method3(v21)
    let v23 : float = method55()
    let v24 : string = "num_complex::Complex::new(v22, v23)"
    let v25 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v24
    let v26 : float = method50()
    let v27 : float = method3(v26)
    let v28 : float = method56()
    let v29 : string = "num_complex::Complex::new(v27, v28)"
    let v30 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v29
    let v31 : (num_complex_Complex<float> []) = [|v5; v10; v15; v20; v25; v30|]
    let v32 : (num_complex_Complex<float> []) = method57(v31)
    let v33 : int32 = v32.Length
    let v34 : Mut0 = {l0 = 0} : Mut0
    while method7(v33, v34) do
        let v36 : int32 = v34.l0
        let v37 : num_complex_Complex<float> = v32.[int v36]
        let v38 : string = $"    s = mpmath.zeta(s)"
        let v39 : num_complex_Complex<float> = method8(v37)
        let v40 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v38, v39)
        let v41 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v40)
        let v42 : string = "v41.unwrap()"
        let v43 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v42
        let v44 : num_complex_Complex<float> = method28(v0, v37)
        let v45 : num_complex_Complex<float> = method13(v43)
        let v46 : string = "v45.re"
        let v47 : float = Fable.Core.RustInterop.emitRustExpr () v46
        let v48 : float =  -v47
        let v49 : bool = v47 >= v48
        let v50 : float =
            if v49 then
                v47
            else
                v48
        let v51 : bool = v50 < 0.0001
        let v53 : bool =
            if v51 then
                true
            else
                method38(v51)
        let v54 : string = $"__expect / actual: %A{v50} / expected: %A{0.0001}"
        let v55 : bool = v53 = false
        if v55 then
            failwith<unit> v54
        let v56 : num_complex_Complex<float> = method14(v43)
        let v57 : string = "v56.im"
        let v58 : float = Fable.Core.RustInterop.emitRustExpr () v57
        let v59 : float =  -v58
        let v60 : bool = v58 >= v59
        let v61 : float =
            if v60 then
                v58
            else
                v59
        let v62 : bool = v61 < 0.0001
        let v64 : bool =
            if v62 then
                true
            else
                method38(v62)
        let v65 : string = $"__expect / actual: %A{v61} / expected: %A{0.0001}"
        let v66 : bool = v64 = false
        if v66 then
            failwith<unit> v65
        let v67 : int32 = v36 + 1
        v34.l0 <- v67
        ()
    ()
and method48 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method49(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method60 (v0 : (float [])) : (float []) =
    v0
and method59 (v0 : pyo3_Python) : unit =
    let v1 : (float []) = [|2.0; 3.0; 4.0; 5.0; 10.0; 20.0; 50.0|]
    let v2 : (float []) = method60(v1)
    let v3 : int32 = v2.Length
    let v4 : Mut0 = {l0 = 0} : Mut0
    while method7(v3, v4) do
        let v6 : int32 = v4.l0
        let v7 : float = v2.[int v6]
        let v8 : float = method25(v7)
        let v9 : float = method3(v8)
        let v10 : float = method4()
        let v11 : string = "num_complex::Complex::new(v9, v10)"
        let v12 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v11
        let v13 : string = $"    s = mpmath.zeta(s)"
        let v14 : num_complex_Complex<float> = method8(v12)
        let v15 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v13, v14)
        let v16 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v15)
        let v17 : string = "v16.unwrap()"
        let v18 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v17
        let v19 : num_complex_Complex<float> = method28(v0, v12)
        let v20 : num_complex_Complex<float> = method13(v18)
        let v21 : string = "v20.re"
        let v22 : float = Fable.Core.RustInterop.emitRustExpr () v21
        let v23 : bool = v22 > 0.0
        let v25 : bool =
            if v23 then
                true
            else
                method38(v23)
        let v26 : string = $"__expect / actual: %A{v22} / expected: %A{0.0}"
        let v27 : bool = v25 = false
        if v27 then
            failwith<unit> v26
        let v28 : num_complex_Complex<float> = method14(v18)
        let v29 : string = "v28.im"
        let v30 : float = Fable.Core.RustInterop.emitRustExpr () v29
        let v31 : bool = v30 = 0.0
        let v33 : bool =
            if v31 then
                true
            else
                method38(v31)
        let v34 : string = $"__expect / actual: %A{v30} / expected: %A{0.0}"
        let v35 : bool = v33 = false
        if v35 then
            failwith<unit> v34
        let v36 : int32 = v6 + 1
        v4.l0 <- v36
        ()
    ()
and method58 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method59(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method62 (v0 : pyo3_Python) : unit =
    let v1 : float = method33()
    let v2 : float = method3(v1)
    let v3 : float = method4()
    let v4 : string = "num_complex::Complex::new(v2, v3)"
    let v5 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v4
    let v6 : string = $"    s = mpmath.zeta(s)"
    let v7 : num_complex_Complex<float> = method8(v5)
    let v8 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v6, v7)
    let v9 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v8)
    let v10 : string = "v9.unwrap()"
    let v11 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v10
    let v12 : num_complex_Complex<float> = method28(v0, v5)
    let v13 : num_complex_Complex<float> = method13(v11)
    let v14 : string = "v13.re"
    let v15 : float = Fable.Core.RustInterop.emitRustExpr () v14
    let v16 : bool = v15 = infinity
    let v18 : bool =
        if v16 then
            true
        else
            method38(v16)
    let v19 : string = $"__expect / actual: %A{v15} / expected: %A{infinity}"
    let v20 : bool = v18 = false
    if v20 then
        failwith<unit> v19
    let v21 : num_complex_Complex<float> = method14(v11)
    let v22 : string = "v21.im"
    let v23 : float = Fable.Core.RustInterop.emitRustExpr () v22
    let v24 : bool = v23 = 0.0
    let v26 : bool =
        if v24 then
            true
        else
            method38(v24)
    let v27 : string = $"__expect / actual: %A{v23} / expected: %A{0.0}"
    let v28 : bool = v26 = false
    if v28 then
        failwith<unit> v27
and method61 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method62(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method65 () : float =
    10.0
and method64 (v0 : pyo3_Python) : unit =
    let v1 : float = method2()
    let v2 : float = method3(v1)
    let v3 : float = method65()
    let v4 : string = "num_complex::Complex::new(v2, v3)"
    let v5 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v4
    let v6 : string = $"    s = mpmath.zeta(s)"
    let v7 : num_complex_Complex<float> = method8(v5)
    let v8 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v6, v7)
    let v9 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v8)
    let v10 : string = "v9.unwrap()"
    let v11 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v10
    let v12 : num_complex_Complex<float> = method28(v0, v5)
    let v13 : num_complex_Complex<float> = method13(v5)
    let v14 : string = "v13.re"
    let v15 : float = Fable.Core.RustInterop.emitRustExpr () v14
    let v16 : num_complex_Complex<float> = method14(v5)
    let v17 : string = "v16.im"
    let v18 : float = Fable.Core.RustInterop.emitRustExpr () v17
    let v19 : float =  -v18
    let v20 : float = method25(v15)
    let v21 : float = method3(v20)
    let v22 : float = method26(v19)
    let v23 : string = "num_complex::Complex::new(v21, v22)"
    let v24 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v23
    let v25 : string = $"    s = mpmath.zeta(s)"
    let v26 : num_complex_Complex<float> = method8(v24)
    let v27 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v25, v26)
    let v28 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v27)
    let v29 : string = "v28.unwrap()"
    let v30 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v29
    let v31 : num_complex_Complex<float> = method28(v0, v24)
    let v32 : string = "v30.conj()"
    let v33 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v32
    let v34 : num_complex_Complex<float> = method13(v11)
    let v35 : string = "v34.re"
    let v36 : float = Fable.Core.RustInterop.emitRustExpr () v35
    let v37 : num_complex_Complex<float> = method13(v33)
    let v38 : string = "v37.re"
    let v39 : float = Fable.Core.RustInterop.emitRustExpr () v38
    let v40 : bool = v36 = v39
    let v42 : bool =
        if v40 then
            true
        else
            method38(v40)
    let v43 : string = $"__expect / actual: %A{v36} / expected: %A{v39}"
    let v44 : bool = v42 = false
    if v44 then
        failwith<unit> v43
    let v45 : num_complex_Complex<float> = method14(v11)
    let v46 : string = "v45.im"
    let v47 : float = Fable.Core.RustInterop.emitRustExpr () v46
    let v48 : num_complex_Complex<float> = method14(v33)
    let v49 : string = "v48.im"
    let v50 : float = Fable.Core.RustInterop.emitRustExpr () v49
    let v51 : bool = v47 = v50
    let v53 : bool =
        if v51 then
            true
        else
            method38(v51)
    let v54 : string = $"__expect / actual: %A{v47} / expected: %A{v50}"
    let v55 : bool = v53 = false
    if v55 then
        failwith<unit> v54
and method63 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method64(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method68 () : float =
    0.01
and method69 () : float =
    0.01
and method67 (v0 : pyo3_Python) : unit =
    let v1 : float = method68()
    let v2 : float = method3(v1)
    let v3 : float = method69()
    let v4 : string = "num_complex::Complex::new(v2, v3)"
    let v5 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v4
    let v6 : string = $"    s = mpmath.zeta(s)"
    let v7 : num_complex_Complex<float> = method8(v5)
    let v8 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v6, v7)
    let v9 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v8)
    let v10 : string = "v9.unwrap()"
    let v11 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v10
    let v12 : num_complex_Complex<float> = method28(v0, v5)
    let v13 : num_complex_Complex<float> = method13(v11)
    let v14 : string = "v13.re"
    let v15 : float = Fable.Core.RustInterop.emitRustExpr () v14
    let v16 : bool = v15 < infinity
    let v18 : bool =
        if v16 then
            true
        else
            method38(v16)
    let v19 : string = $"__expect / actual: %A{v15} / expected: %A{infinity}"
    let v20 : bool = v18 = false
    if v20 then
        failwith<unit> v19
    let v21 : num_complex_Complex<float> = method14(v11)
    let v22 : string = "v21.im"
    let v23 : float = Fable.Core.RustInterop.emitRustExpr () v22
    let v24 : bool = v23 < infinity
    let v26 : bool =
        if v24 then
            true
        else
            method38(v24)
    let v27 : string = $"__expect / actual: %A{v23} / expected: %A{infinity}"
    let v28 : bool = v26 = false
    if v28 then
        failwith<unit> v27
and method66 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method67(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method72 () : (float []) =
    let v0 : (float []) = [|10.0; 20.0; 30.0; 40.0; 50.0; 60.0; 70.0; 80.0; 90.0; 100.0|]
    let v1 : (float []) = method60(v0)
    v1
and method73 (v0 : bool) : bool =
    let v1 : bool = v0 = false
    v1
and method71 (v0 : pyo3_Python) : unit =
    let v1 : (float []) = method72()
    let v2 : int32 = v1.Length
    let v3 : Mut0 = {l0 = 0} : Mut0
    while method7(v2, v3) do
        let v5 : int32 = v3.l0
        let v6 : float = v1.[int v5]
        let v7 : float = method30()
        let v8 : float = method3(v7)
        let v9 : float = method26(v6)
        let v10 : string = "num_complex::Complex::new(v8, v9)"
        let v11 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v10
        let v12 : string = $"    s = mpmath.zeta(s)"
        let v13 : num_complex_Complex<float> = method8(v11)
        let v14 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v12, v13)
        let v15 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v14)
        let v16 : string = "v15.unwrap()"
        let v17 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v16
        let v18 : num_complex_Complex<float> = method28(v0, v11)
        let v19 : num_complex_Complex<float> = method13(v17)
        let v20 : string = "v19.re"
        let v21 : float = Fable.Core.RustInterop.emitRustExpr () v20
        let v22 : bool = v21 = 0.0
        let v23 : bool = method73(v22)
        let v25 : bool =
            if v23 then
                true
            else
                method38(v23)
        let v26 : string = $"__expect / actual: %A{v21} / expected: %A{0.0}"
        let v27 : bool = v25 = false
        if v27 then
            failwith<unit> v26
        let v28 : num_complex_Complex<float> = method14(v17)
        let v29 : string = "v28.im"
        let v30 : float = Fable.Core.RustInterop.emitRustExpr () v29
        let v31 : bool = v30 = 0.0
        let v32 : bool = method73(v31)
        let v34 : bool =
            if v32 then
                true
            else
                method38(v32)
        let v35 : string = $"__expect / actual: %A{v30} / expected: %A{0.0}"
        let v36 : bool = v34 = false
        if v36 then
            failwith<unit> v35
        let v37 : int32 = v5 + 1
        v3.l0 <- v37
        ()
    ()
and method70 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method71(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method76 () : float =
    0.75
and method77 () : float =
    20.5
and method78 () : float =
    1.25
and method79 () : float =
    30.1
and method80 () : float =
    0.25
and method81 () : float =
    40.0
and method82 () : float =
    50.0
and method75 (v0 : pyo3_Python) : unit =
    let v1 : float = method50()
    let v2 : float = method3(v1)
    let v3 : float = method51()
    let v4 : string = "num_complex::Complex::new(v2, v3)"
    let v5 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v4
    let v6 : float = method76()
    let v7 : float = method3(v6)
    let v8 : float = method77()
    let v9 : string = "num_complex::Complex::new(v7, v8)"
    let v10 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v9
    let v11 : float = method78()
    let v12 : float = method3(v11)
    let v13 : float = method79()
    let v14 : string = "num_complex::Complex::new(v12, v13)"
    let v15 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v14
    let v16 : float = method80()
    let v17 : float = method3(v16)
    let v18 : float = method81()
    let v19 : string = "num_complex::Complex::new(v17, v18)"
    let v20 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v19
    let v21 : float = method33()
    let v22 : float = method3(v21)
    let v23 : float = method82()
    let v24 : string = "num_complex::Complex::new(v22, v23)"
    let v25 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v24
    let v26 : (num_complex_Complex<float> []) = [|v5; v10; v15; v20; v25|]
    let v27 : (num_complex_Complex<float> []) = method57(v26)
    let v28 : int32 = v27.Length
    let v29 : Mut0 = {l0 = 0} : Mut0
    while method7(v28, v29) do
        let v31 : int32 = v29.l0
        let v32 : num_complex_Complex<float> = v27.[int v31]
        let v33 : string = $"    s = mpmath.zeta(s)"
        let v34 : num_complex_Complex<float> = method8(v32)
        let v35 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v33, v34)
        let v36 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v35)
        let v37 : string = "v36.unwrap()"
        let v38 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v37
        let v39 : num_complex_Complex<float> = method28(v0, v32)
        let v40 : num_complex_Complex<float> = method13(v38)
        let v41 : string = "v40.re"
        let v42 : float = Fable.Core.RustInterop.emitRustExpr () v41
        let v43 : bool = v42 = 0.0
        let v44 : bool = method73(v43)
        let v46 : bool =
            if v44 then
                true
            else
                method38(v44)
        let v47 : string = $"__expect / actual: %A{v42} / expected: %A{0.0}"
        let v48 : bool = v46 = false
        if v48 then
            failwith<unit> v47
        let v49 : num_complex_Complex<float> = method14(v38)
        let v50 : string = "v49.im"
        let v51 : float = Fable.Core.RustInterop.emitRustExpr () v50
        let v52 : bool = v51 = 0.0
        let v53 : bool = method73(v52)
        let v55 : bool =
            if v53 then
                true
            else
                method38(v53)
        let v56 : string = $"__expect / actual: %A{v51} / expected: %A{0.0}"
        let v57 : bool = v55 = false
        if v57 then
            failwith<unit> v56
        let v58 : int32 = v31 + 1
        v29.l0 <- v58
        ()
    ()
and method74 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method75(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method85 () : float =
    3.0
and method86 () : float =
    4.0
and method87 () : float =
    2.5
and method88 () : float =
    -3.5
and method89 () : float =
    1.5
and method90 () : float =
    2.5
and method84 (v0 : pyo3_Python) : unit =
    let v1 : float = method85()
    let v2 : float = method3(v1)
    let v3 : float = method86()
    let v4 : string = "num_complex::Complex::new(v2, v3)"
    let v5 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v4
    let v6 : float = method87()
    let v7 : float = method3(v6)
    let v8 : float = method88()
    let v9 : string = "num_complex::Complex::new(v7, v8)"
    let v10 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v9
    let v11 : float = method89()
    let v12 : float = method3(v11)
    let v13 : float = method90()
    let v14 : string = "num_complex::Complex::new(v12, v13)"
    let v15 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v14
    let v16 : float = method50()
    let v17 : float = method3(v16)
    let v18 : float = method51()
    let v19 : string = "num_complex::Complex::new(v17, v18)"
    let v20 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v19
    let v21 : (num_complex_Complex<float> []) = [|v5; v10; v15; v20|]
    let v22 : (num_complex_Complex<float> []) = method57(v21)
    let v23 : int32 = v22.Length
    let v24 : Mut0 = {l0 = 0} : Mut0
    while method7(v23, v24) do
        let v26 : int32 = v24.l0
        let v27 : num_complex_Complex<float> = v22.[int v26]
        let v28 : string = $"    s = mpmath.zeta(s)"
        let v29 : num_complex_Complex<float> = method8(v27)
        let v30 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v28, v29)
        let v31 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v30)
        let v32 : string = "v31.unwrap()"
        let v33 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v32
        let v34 : num_complex_Complex<float> = method28(v0, v27)
        let v35 : float = method2()
        let v36 : float = method3(v35)
        let v37 : float = method4()
        let v38 : string = "num_complex::Complex::new(v36, v37)"
        let v39 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v38
        let v40 : num_complex_Complex<float> = method34(v39)
        let v41 : num_complex_Complex<float> = method35(v27)
        let v42 : string = "num_complex::Complex::powc(v40, v41)"
        let v43 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v42
        let v44 : float = method37()
        let v45 : float = method3(v44)
        let v46 : float = method4()
        let v47 : string = "num_complex::Complex::new(v45, v46)"
        let v48 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v47
        let v49 : float = method33()
        let v50 : float = method3(v49)
        let v51 : float = method4()
        let v52 : string = "num_complex::Complex::new(v50, v51)"
        let v53 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v52
        let v54 : string = "v27 - v53"
        let v55 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v54
        let v56 : num_complex_Complex<float> = method34(v48)
        let v57 : num_complex_Complex<float> = method35(v55)
        let v58 : string = "num_complex::Complex::powc(v56, v57)"
        let v59 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v58
        let v60 : string = "v43 * v59"
        let v61 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v60
        let v62 : float = method37()
        let v63 : float = method3(v62)
        let v64 : float = method4()
        let v65 : string = "num_complex::Complex::new(v63, v64)"
        let v66 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v65
        let v67 : string = "v66 * v27"
        let v68 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v67
        let v69 : float = method2()
        let v70 : float = method3(v69)
        let v71 : float = method4()
        let v72 : string = "num_complex::Complex::new(v70, v71)"
        let v73 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v72
        let v74 : string = "v68 / v73"
        let v75 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v74
        let v76 : string = "v75.sin()"
        let v77 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v76
        let v78 : string = "v61 * v77"
        let v79 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v78
        let v80 : float = method33()
        let v81 : float = method3(v80)
        let v82 : float = method4()
        let v83 : string = "num_complex::Complex::new(v81, v82)"
        let v84 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v83
        let v85 : string = "v84 - v27"
        let v86 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v85
        let v87 : string = $"    s = mpmath.gamma(s)"
        let v88 : num_complex_Complex<float> = method8(v86)
        let v89 : Result<num_complex_Complex<float>, pyo3_PyErr> = method36(v0, v87, v88)
        let v90 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v89)
        let v91 : string = "v90.unwrap()"
        let v92 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v91
        let v93 : string = "v79 * v92"
        let v94 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v93
        let v95 : num_complex_Complex<float> = method13(v27)
        let v96 : string = "v95.re"
        let v97 : float = Fable.Core.RustInterop.emitRustExpr () v96
        let v98 : float = 1.0 - v97
        let v99 : num_complex_Complex<float> = method14(v27)
        let v100 : string = "v99.im"
        let v101 : float = Fable.Core.RustInterop.emitRustExpr () v100
        let v102 : float =  -v101
        let v103 : float = method25(v98)
        let v104 : float = method3(v103)
        let v105 : float = method26(v102)
        let v106 : string = "num_complex::Complex::new(v104, v105)"
        let v107 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v106
        let v108 : string = $"    s = mpmath.zeta(s)"
        let v109 : num_complex_Complex<float> = method8(v107)
        let v110 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v108, v109)
        let v111 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v110)
        let v112 : string = "v111.unwrap()"
        let v113 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v112
        let v114 : num_complex_Complex<float> = method28(v0, v107)
        let v115 : string = "v94 * v113"
        let v116 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v115
        let v117 : num_complex_Complex<float> = method13(v33)
        let v118 : string = "v117.re"
        let v119 : float = Fable.Core.RustInterop.emitRustExpr () v118
        let v120 : num_complex_Complex<float> = method13(v116)
        let v121 : string = "v120.re"
        let v122 : float = Fable.Core.RustInterop.emitRustExpr () v121
        let v123 : float = v119 - v122
        let v124 : float =  -v123
        let v125 : bool = v123 >= v124
        let v126 : float =
            if v125 then
                v123
            else
                v124
        let v127 : bool = v126 < 0.0001
        let v129 : bool =
            if v127 then
                true
            else
                method38(v127)
        let v130 : string = $"__expect / actual: %A{v126} / expected: %A{0.0001}"
        let v131 : bool = v129 = false
        if v131 then
            failwith<unit> v130
        let v132 : num_complex_Complex<float> = method14(v33)
        let v133 : string = "v132.im"
        let v134 : float = Fable.Core.RustInterop.emitRustExpr () v133
        let v135 : num_complex_Complex<float> = method14(v116)
        let v136 : string = "v135.im"
        let v137 : float = Fable.Core.RustInterop.emitRustExpr () v136
        let v138 : float = v134 - v137
        let v139 : float =  -v138
        let v140 : bool = v138 >= v139
        let v141 : float =
            if v140 then
                v138
            else
                v139
        let v142 : bool = v141 < 0.0001
        let v144 : bool =
            if v142 then
                true
            else
                method38(v142)
        let v145 : string = $"__expect / actual: %A{v141} / expected: %A{0.0001}"
        let v146 : bool = v144 = false
        if v146 then
            failwith<unit> v145
        let v147 : int32 = v26 + 1
        v24.l0 <- v147
        ()
    ()
and method83 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method84(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and method93 (v0 : int32, v1 : Mut3) : bool =
    let v2 : int32 = v1.l0
    let v3 : bool = v2 < v0
    v3
and method92 (v0 : pyo3_Python) : unit =
    let v1 : (float []) = [|2.0; 2.5; 3.0; 3.5; 4.0; 4.5; 5.0|]
    let v2 : (float []) = method60(v1)
    let v3 : (float []) = [|2.0; 3.0; 5.0; 7.0; 11.0; 13.0; 17.0; 19.0; 23.0; 29.0; 31.0; 37.0; 41.0; 43.0; 47.0; 53.0; 59.0; 61.0; 67.0; 71.0|]
    let v4 : (float []) = method60(v3)
    let v5 : int32 = v2.Length
    let v6 : Mut0 = {l0 = 0} : Mut0
    while method7(v5, v6) do
        let v8 : int32 = v6.l0
        let v9 : float = v2.[int v8]
        let v10 : float = method25(v9)
        let v11 : float = method3(v10)
        let v12 : float = method4()
        let v13 : string = "num_complex::Complex::new(v11, v12)"
        let v14 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v13
        let v15 : int32 = v4.Length
        let v16 : Mut3 = {l0 = 0; l1 = 1.0} : Mut3
        while method93(v15, v16) do
            let v18 : int32 = v16.l0
            let v19 : float = v16.l1
            let v20 : float = v4.[int v18]
            let v21 : float =  -v9
            let v22 : float = v20 ** v21
            let v23 : float = 1.0 - v22
            let v24 : float = v19 / v23
            let v25 : int32 = v18 + 1
            v16.l0 <- v25
            v16.l1 <- v24
            ()
        let v26 : float = v16.l1
        let v27 : string = $"    s = mpmath.zeta(s)"
        let v28 : num_complex_Complex<float> = method8(v14)
        let v29 : Result<num_complex_Complex<float>, pyo3_PyErr> = method9(v0, v27, v28)
        let v30 : Result<num_complex_Complex<float>, pyo3_PyErr> = method27(v29)
        let v31 : string = "v30.unwrap()"
        let v32 : num_complex_Complex<float> = Fable.Core.RustInterop.emitRustExpr () v31
        let v33 : num_complex_Complex<float> = method28(v0, v14)
        let v34 : num_complex_Complex<float> = method13(v32)
        let v35 : string = "v34.re"
        let v36 : float = Fable.Core.RustInterop.emitRustExpr () v35
        let v37 : float = v36 - v26
        let v38 : float =  -v37
        let v39 : bool = v37 >= v38
        let v40 : float =
            if v39 then
                v37
            else
                v38
        let v41 : bool = v40 < 0.01
        let v43 : bool =
            if v41 then
                true
            else
                method38(v41)
        let v44 : string = $"__expect / actual: %A{v40} / expected: %A{0.01}"
        let v45 : bool = v43 = false
        if v45 then
            failwith<unit> v44
        let v46 : num_complex_Complex<float> = method14(v32)
        let v47 : string = "v46.im"
        let v48 : float = Fable.Core.RustInterop.emitRustExpr () v47
        let v49 : bool = v48 < 0.01
        let v51 : bool =
            if v49 then
                true
            else
                method38(v49)
        let v52 : string = $"__expect / actual: %A{v48} / expected: %A{0.01}"
        let v53 : bool = v51 = false
        if v53 then
            failwith<unit> v52
        let v54 : int32 = v8 + 1
        v6.l0 <- v54
        ()
    ()
and method91 () : unit =
    let v0 : string = "pyo3::prepare_freethreaded_python()"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "let __result = pyo3::Python::with_gil(|py| -> pyo3::PyResult<()> { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    let v2 : string = "py"
    let v3 : pyo3_Python = Fable.Core.RustInterop.emitRustExpr () v2
    method92(v3)
    let v4 : Result<unit, pyo3_PyErr> = Ok ()
    let v5 : Result<unit, pyo3_PyErr> = method39(v4)
    let v6 : string = "v5 }})"
    Fable.Core.RustInterop.emitRustExpr () v6
    let v7 : string = "{ //"
    Fable.Core.RustInterop.emitRustExpr () v7
    let v8 : string = "__result"
    let v9 : Result<unit, pyo3_PyErr> = Fable.Core.RustInterop.emitRustExpr () v8
    let v10 : Result<unit, pyo3_PyErr> = method40(v9)
    let v11 : string = "v10.unwrap()"
    Fable.Core.RustInterop.emitRustExpr () v11
    ()
and closure0 () () : unit =
    let v0 : string = "}//"
    Fable.Core.RustInterop.emitRustExpr () v0
    let v1 : string = "#[test] fn test_zeta_at_known_values_() { //"
    Fable.Core.RustInterop.emitRustExpr () v1
    method0()
    let v2 : string = "} #[test] fn test_zeta_at_2_minus2() { //"
    Fable.Core.RustInterop.emitRustExpr () v2
    method41()
    let v3 : string = "} #[test] fn test_trivial_zero_at_negative_even___() { //"
    Fable.Core.RustInterop.emitRustExpr () v3
    method44()
    let v4 : string = "} #[test] fn test_non_trivial_zero___() { //"
    Fable.Core.RustInterop.emitRustExpr () v4
    method48()
    let v5 : string = "} #[test] fn test_real_part_greater_than_one___() { //"
    Fable.Core.RustInterop.emitRustExpr () v5
    method58()
    let v6 : string = "} #[test] fn test_zeta_at_1___() { //"
    Fable.Core.RustInterop.emitRustExpr () v6
    method61()
    let v7 : string = "} #[test] fn test_symmetry_across_real_axis___() { //"
    Fable.Core.RustInterop.emitRustExpr () v7
    method63()
    let v8 : string = "} #[test] fn test_behavior_near_origin___() { //"
    Fable.Core.RustInterop.emitRustExpr () v8
    method66()
    let v9 : string = "} #[test] fn test_imaginary_axis() { //"
    Fable.Core.RustInterop.emitRustExpr () v9
    method70()
    let v10 : string = "} #[test] fn test_critical_strip() { //"
    Fable.Core.RustInterop.emitRustExpr () v10
    method74()
    let v11 : string = "} #[test] fn test_reflection_formula_for_specific_value() { //"
    Fable.Core.RustInterop.emitRustExpr () v11
    method83()
    let v12 : string = "} #[test] fn test_euler_product_formula() { //"
    Fable.Core.RustInterop.emitRustExpr () v12
    method91()
and closure1 () (v0 : (string [])) : int32 =
    let v1 : string = $"value: {1}"
    System.Console.WriteLine v1
    0
let v0 : (unit -> unit) = closure0()
let tests () = v0 ()
let v1 : ((string []) -> int32) = closure1()
let main args = v1 args
()